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BLM分析

2026-02-26T06:03:11Z

油手就行：创建页面，内容为“BLM（Bashicu Large Matrix）是Bashicu创造的记号，文字规则不详，其展开器可参考[https://hypcos.github.io/notation-explorer/ NE]。BLM是目前NE上最小的记号，因为其奇特的行为引起了gggist的广泛兴趣。<ref> [https://zhuanlan.zhihu.com/p/2009657886595388394 BLM vs BMS - 知乎]</ref>此分析出自梅天狸。 {|class="wikitable" |BLM |BMS |- |<math>\varnothing</math> |<math>\varnothing</math> |- |(0) |(0) |- |(0)(1) |(0)…”

BLM（Bashicu Large Matrix）是Bashicu创造的记号，文字规则不详，其展开器可参考[https://hypcos.github.io/notation-explorer/ NE]。BLM是目前NE上最小的记号，因为其奇特的行为引起了gggist的广泛兴趣。<ref> [https://zhuanlan.zhihu.com/p/2009657886595388394 BLM vs BMS - 知乎]</ref>此分析出自梅天狸。
{|class="wikitable"
|BLM
|BMS
|-
|<math>\varnothing</math>
|<math>\varnothing</math>
|-
|(0)
|(0)
|-
|(0)(1)
|(0)(1)
|-
|(0,0)(1,1)
|(0,0)(1,1)
|-
|(0,0)(1,1)(0,0)(1,1)
|(0,0)(1,1)(0,0)(1,1)
|-
|(0,0)(1,1)(1,0)
|(0,0)(1,1)(1,0)
|-
|(0,0)(1,1)(1,0)(1,0)
|(0,0)(1,1)(1,0)(1,0)
|-
|(0,0)(1,1)(1,0)(2,1)
|(0,0)(1,1)(1,0)(2,0)
|-
|(0,0)(1,1)(1,0)(2,1)(1,0)(2,1)
|(0,0)(1,1)(1,0)(2,0)(1,0)(2,0)
|-
|(0,0)(1,1)(1,0)(2,1)(1,0)(2,1)(2,0)
|(0,0)(1,1)(1,0)(2,0)(2,0)
|-
|(0,0)(1,1)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)
|(0,0)(1,1)(1,0)(2,0)(3,0)
|-
|(0,0)(1,1)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)(2,0)(3,1)(3,0)(4,1)
|(0,0)(1,1)(1,0)(2,0)(3,0)(4,0)
|-
|(0,0)(1,1)(1,0)(2,1)(1,1)
|(0,0)(1,1)(1,0)(2,1)
|-
|(0,0)(1,1)(1,0)(2,1)(1,1)(1,0)(2,1)
|(0,0)(1,1)(1,0)(2,1)(1,0)(2,0)
|-
|(0,0)(1,1)(1,0)(2,1)(1,1)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)
|(0,0)(1,1)(1,0)(2,1)(1,0)(2,0)(3,0)
|-
|(0,0)(1,1)(1,0)(2,1)(1,1)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,1)
|(0,0)(1,1)(1,0)(2,1)(1,0)(2,0)(3,0)(1,0)(2,0)(3,0)
|-
|(0,0)(1,1)(1,0)(2,1)(1,1)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)(2,1)
|(0,0)(1,1)(1,0)(2,1)(1,0)(2,0)(3,0)(2,0)
|-
|(0,0)(1,1)(1,0)(2,1)(1,1)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)(2,1)(2,0)(3,1)
|(0,0)(1,1)(1,0)(2,1)(1,0)(2,0)(3,0)(2,0)(3,0)
|-
|(0,0)(1,1)(1,0)(2,1)(1,1)(1,0)(2,1)(1,1)
|(0,0)(1,1)(1,0)(2,1)(1,0)(2,1)
|-
|(0,0)(1,1)(1,0)(2,1)(2,0)
|(0,0)(1,1)(1,0)(2,1)(2,0)
|-
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,0)
|-
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(2,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,0)(2,0)
|-
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(2,1)(2,0)(3,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,0)(2,0)(3,0)
|-
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,0)(3,0)
|-
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(4,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,0)(4,0)
|-
|(0,0)(1,1)(1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)
|}
{|class="wikitable"
|BLM
|BMS
|-
|(0,0)(1,1)(1,1)(1,0)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(1,0)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,0)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,0)(2,0)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(1,1)(1,0)(2,1)(2,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)(1,0)(2,0)(2,0)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(1,1)(1,0)(2,1)(2,1)(1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)(1,0)(2,1)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(1,1)(1,0)(2,1)(2,1)(2,0)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,0)(3,0)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(2,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,0)(3,0)(2,0)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(2,1)(2,0)(3,1)(3,1)(3,0)(4,1)(4,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,0)(4,0)(4,0)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(1,1)(1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,1)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(2,0)
|-
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(2,0)(3,0)(3,0)
|-
|(0,0)(1,1)(1,1)(1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(2,0)(3,1)
|-
|(0,0)(1,1)(2,2)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)
|-
|(0,0)(1,1)(2,2)(1,0)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)
|-
|(0,0)(1,1)(2,2)(1,0)(2,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,0)
|-
|(0,0)(1,1)(2,2)(1,0)(2,1)(3,2)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,0)(3,0)
|-
|(0,0)(1,1)(2,2)(1,0)(2,1)(3,2)(2,0)(3,1)(4,2)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,0)(3,0)(4,0)
|-
|(0,0)(1,1)(2,2)(1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)
|-
|(0,0)(1,1)(2,2)(1,1)(1,0)(2,1)(3,2)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,0)(3,0)
|-
|(0,0)(1,1)(2,2)(1,1)(1,0)(2,1)(3,2)(2,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,0)(3,0)(2,0)
|-
|(0,0)(1,1)(2,2)(1,1)(1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)
|-
|(0,0)(1,1)(2,2)(1,1)(2,2)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)(2,0)
|-
|(0,0)(1,1)(2,2)(3,3)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)(2,0)(3,0)
|-
|(0,0)(1,1)(2,2)(3,3)(4,4)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)(2,0)(3,0)(4,0)
|-
|(0,0,0)(1,1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)
|}
{|class="wikitable"
|BLM
|BMS
|-
|(0,0,0)(1,1,1)(1,0,0)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)(1,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,0)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,0)(3,2,0)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,0,0)(2,1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)(1,0)(2,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,0,0)(2,1,1)(2,0,0)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(1,0)(2,1)(1,0)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,0,0)(3,1,1)(3,0,0)(4,1,1)
|(0,0)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(4,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)
|(0,0)(1,1)(1,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(1,0,0)(2,1,1)(2,0,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,0)(3,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(2,0,0)(3,1,1)(2,0,0)(3,1,1)(3,0,0)(4,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,0)(3,1)(3,0)(4,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(1,0)(2,1)(2,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(1,1,0)(1,0,0)(2,1,1)(1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,1)(1,0)(2,1)(2,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(1,1,0)(1,0,0)(2,1,1)(2,0,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(2,0,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(2,0,0)(3,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(2,0,0)(3,1,1)(3,0,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(2,0,0)(3,1,1)(3,0,0)(4,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,0)(4,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,0)(3,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(3,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,0)(3,1)(2,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(3,2,1)(2,0,0)(3,1,1)(3,0,0)(4,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,0)(3,1)(3,0)(4,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(1,1,0)(2,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,0,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,0,0)(3,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,0,0)(3,1,1)(3,0,0)(4,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,0)(4,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,0,0)(3,1,1)(3,0,0)(4,1,1)(3,1,0)(4,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,0)(4,1)(3,0)(4,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,1,0)(2,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(2,0)(3,1)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,1,0)(3,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,1,0)(3,2,1)(2,2,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,1,0)(3,2,1)(2,2,0)(3,3,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,1,0)(3,2,1)(2,2,0)(3,3,1)(1,1,0)(2,2,1)(2,1,0)(3,2,1)(2,2,0)(3,3,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,1,0)(3,2,1)(2,2,0)(3,3,1)(3,2,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,0)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,1,0)(3,2,1)(2,2,0)(3,3,1)(3,2,0)(4,3,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,0)(2,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,1,0)(3,2,1)(2,2,0)(3,3,1)(3,2,0)(4,3,1)(3,3,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,1,0)(3,2,1)(2,2,0)(3,3,1)(3,2,0)(4,3,1)(3,3,0)(4,4,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,0)(4,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,0)(2,2,1)(2,1,0)(3,2,1)(2,2,0)(3,3,1)(3,2,0)(4,3,1)(3,3,0)(4,4,1)(4,3,0)(5,4,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,0)(4,0)(3,0)(4,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(1,1,1)(1,0,0)(2,1,1)(1,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(2,0,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,0)(3,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(2,0)(3,1)(2,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(2,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(2,0)(3,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(3,0,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,0)
|-
|(0,0,0)(1,1,1)(1,0,0)(2,1,1)(2,0,0)(3,1,1)(3,0,0)(4,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,0)(4,1)
|-
|(0,0,0)(1,1,1)(1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)
|-
|(0,0,0)(1,1,1)(1,1,0)(2,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)
|-
|(0,0,0)(1,1,1)(1,1,0)(2,2,1)(1,0,0)(2,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)
|-
|(0,0,0)(1,1,1)(1,1,0)(2,2,1)(1,0,0)(2,2,1)(2,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,1,0)(2,2,1)(1,0,0)(2,2,1)(2,1,0)(3,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,1,0)(2,2,1)(1,0,0)(2,2,1)(2,1,0)(3,2,1)(2,0,0)(3,1,1)(3,1,0)(4,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,0)(3,1)(3,0)(4,0)
|-
|(0,0,0)(1,1,1)(1,1,0)(2,2,1)(1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)
|-
|(0,0,0)(1,1,1)(1,1,0)(2,2,1)(1,1,0)(2,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)
|-
|(0,0,0)(1,1,1)(1,1,0)(2,2,1)(2,2,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(2,0)
|-
|(0,0,0)(1,1,1)(1,1,0)(2,2,1)(2,2,0)(3,3,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,1,0)(2,2,1)(2,2,0)(3,3,1)(3,3,0)(4,4,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,0)(4,0)
|-
|(0,0,0)(1,1,1)(1,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,1,1)(1,0,0)(2,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)
|-
|(0,0,0)(1,1,1)(1,1,1)(1,0,0)(2,1,1)(2,1,0)(3,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,1,1)(1,0,0)(2,1,1)(2,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(1,1,1)(1,0,0)(2,1,1)(2,1,1)(2,0,0)(3,1,1)(3,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,1)(3,0)(4,1)
|-
|(0,0,0)(1,1,1)(1,1,1)(1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,1)
|-
|(0,0,0)(1,1,1)(1,1,1)(1,1,0)(2,2,1)(2,2,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,1)(2,0)(2,0)
|-
|(0,0,0)(1,1,1)(1,1,1)(1,1,0)(2,2,1)(2,2,1)(2,2,0)(3,3,1)(3,3,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,1)(2,0)(3,0)(3,0)
|-
|(0,0,0)(1,1,1)(1,1,1)(1,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(1,0)(2,1)(2,1)(2,0)(3,1)
|-
|(0,0,0)(1,1,1)(2,2,2)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)
|-
|(0,0,0)(1,1,1)(2,2,2)(3,3,3)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)(3,0)
|-
|(0,0,0,0)(1,1,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)(3,1)
|}
{|class="wikitable"
|BLM|BMS
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,0)(2,1,0,0)(3,2,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,0)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,0)(2,1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,0)(3,2,2,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,1)(3,0)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,1)(3,0)(4,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,0,0,0)(2,1,1,1)(2,0,0,0)(3,1,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)(3,1)(1,0)(2,1)(2,0)(3,1)(3,0)(4,1)(4,0)(5,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,0,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)(3,1)(1,0)(2,1)(2,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,0,0)(2,2,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)(3,1)(1,0)(2,1)(2,1)(2,0)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,0,0)(2,2,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(2,0)(3,1)(1,0)(2,1)(2,1)(2,0)(3,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,0,0)(2,2,1,1)(2,1,0,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,0,0)(2,2,1,1)(2,1,0,0)(3,2,1,1)(2,2,0,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(2,0)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,0,0)(2,2,1,1)(2,1,0,0)(3,2,1,1)(2,2,0,0)(3,3,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(2,0)(3,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,0,0)(2,2,1,1)(2,1,0,0)(3,2,1,1)(2,2,0,0)(3,3,1,1)(3,2,0,0)(4,3,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(2,0)(3,1)(2,0)(3,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(2,0)(3,1)(3,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,1,0)(1,0,0,0)(2,1,1,1)(2,0,0,0)(3,1,1,1)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(2,0)(3,1)(3,1)(1,0)(2,1)(2,0)(3,1)(3,0)(4,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,1,0)(1,0,0,0)(2,1,1,1)(2,0,0,0)(3,1,1,1)(2,1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(2,0)(3,1)(3,1)(1,0)(2,1)(2,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,1,0)(1,0,0,0)(2,1,1,1)(2,0,0,0)(3,1,1,1)(2,1,1,0)(1,0,0,0)(2,1,1,1)(2,0,0,0)(3,1,1,1)(2,1,1,0)(2,0,0,0)(3,1,1,1)(3,0,0,0)(4,1,1,1)(3,1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(2,0)(3,1)(3,1)(3,0)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(2,0)(3,1)(3,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,1,0)(1,0,0,0)(2,1,1,1)(2,0,0,0)(3,1,1,1)(2,1,1,0)(1,0,0,0)(2,1,1,1)(2,0,0,0)(3,1,1,1)(2,1,1,0)(2,0,0,0)(3,1,1,1)(3,0,0,0)(4,1,1,1)(3,1,1,0)(2,0,0,0)(3,1,1,1)(3,0,0,0)(4,1,1,1)(3,1,1,0)(3,0,0,0)(4,1,1,1)(4,0,0,0)(5,1,1,1)(4,1,1,0)
|(0,0)(1,1)(1,1)(1,0)(2,1)(2,1)(2,0)(3,1)(3,1)(3,0)(4,1)(4,1)
|-
|(0,0,0,0)(1,1,1,1)(1,0,0,0)(2,1,1,1)(1,1,1,0)(1,0,0,0)(2,1,1,1)(2,0,0,0)(3,1,1,1)(2,1,1,0)(1,1,0,0)
|(0,0)(1,1)(1,1)
|-
|(0,0,0,0,0)(1,1,1,1,1)(1,0,0,0,0)(2,1,1,1,1)(1,1,1,1,0)(1,0,0,0,0)(2,1,1,1,1)(2,0,0,0,0)(3,1,1,1,1)(2,1,1,1,0)(1,1,1,0,0)(1,0,0,0,0)(2,1,1,1,1)(2,0,0,0,0)(3,1,1,1,1)(2,1,1,1,0)(2,0,0,0,0)(3,1,1,1,1)(3,0,0,0,0)(4,1,1,1,1)(3,1,1,1,0)(2,1,1,0,0)(1,1,0,0,0)
|(0,0)(1,1)(1,1)(1,1)
|-
|limit
|(0,0)(1,1)(2,0)
|}
[[分类:分析]]

iBLP

2026-02-22T07:59:12Z

油手就行：

== 记号简介 ==
无限基本Laver图案(Infinite Basic Laver Pattern)是由test_alpha0的记号Basic Laver Pattren改造而来。IBLP目前尚不理想，还存在许多的坏图案。test_alpha0规定其极限表达式为(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2)1(5,4,3,2)2(6,5,4)1，因为现在认为在该图案下方不存在坏图案，而其上方不远处就出现了很多坏图案。尽管如此，IBLP仍然被认为是目前最强的记号。本页面介绍的规则对应[https://hypcos.github.io/notation-explorer/ NE]上的DEN2。

== 定义 ==

=== 定义1 （IBLP） ===
一个IBLP是一个四元组<math>A=(n,(A_1,\dots,A_n),(l_1,\dots,l_n),(M_1,\dots,M_n))</math>，

其中：

<math>(1)n\in\N</math>。

<math>(2)</math>对每个<math>i\in\{1,\dots,n\}</math>，<math>A_i</math>是严格递增的非负整数序列，满足<math>\mathrm{len}(A_i)\geq2\text{且}\max(A_i)=i</math>。

<math>(3)</math>对每个<math>i\in\{1,\dots,n\}</math>，步长<math>l_i\in \N</math>。

<math>(4)</math>对每个<math>i\in\{1,\dots,n\}</math>，标记集合<math>M_i\subseteq A_i</math>

约定所有编号从 1 开始；<math>A_i[k]</math> 表示第 ''k'' 个元素，<math>A_i[-j]=A_i[\mathrm{len}(A_i)-j+1]</math>表示倒数第 ''j'' 个元素。

=== 定义2 （长行、中等行、短行） ===
行 <math>i</math> 称为长行若<math>\mathrm{len}(A_i)>2l_i</math>，称为中等行若<math>\mathrm{len}(A_i)=2l_i</math>，称为短行若 <math>\mathrm{len}(A_i)<2l_i</math>。

=== 定义3 （零图案、后继图案、极限图案） ===
若 ''n'' = 0，称 ''A'' 为零图案。若 <math>n>0\text{且}\mathrm{len}(A_n)=2\text{且}\min(A_n)=0</math>，称 ''A'' 为后继图案。否则称 ''A'' 为极限图案。

=== 定义4 （行比较键） ===
令<math>A_i=(A_1<a_2<\dots<a_m)\text{且}L=l_i</math>。定义保留序列

<math>K_i=\begin{cases}(a_1,a_2,\dots,a_m),&L\leq1;\\(a_1,a_{L+1},a_{L+2},\dots,a_m),&2\leq L\leq m;\\(a_1,a_2,\dots,a_m),&L\geq2\text{且}m<L.\end{cases}</math>

定义行键为<math>\overleftarrow{K_i}</math>（即<math>K_i
</math>逆序，从大到小）。

=== 定义5 （IBLP的大小比较） ===
给定两个 ''IBLP'' <math>A\text{、}B</math>，从 <math>i=1</math> 起逐行比较其

行键<math>\overleftarrow{K_i(A)}\text{与}\overleftarrow{K_i(B)}</math> 的字典序；第一处不同决定大小。若前<math>\min(n_a,n_b)</math>行都相等，则行数较小者更小。

=== 定义6 （一行的根<math>p(i)</math>） ===
对<math>i\in\{1,\dots,n\}</math>，定义<math>p(i)=A_i[-(l_i+1)]</math>.

=== 定义7 （传递序列<math>tr_i(j)</math>） ===
固定行 ''i''。若<math>j=A_i[k](1\leq k\leq\mathrm{len}(A_i))\text{且}k\geq l_i</math>，定义阈值 <math>\theta=A_i[k-l_i]</math>。令 <math>t_0=j</math>，并在<math>t_m>\theta\text{且}p(t_m)\text{有定义}</math>时令 <math>t_{m+1}=p(t_m)</math>。若存在最小 <math>m>0</math>使<math>t_m=\theta</math>，则定义<math>tr_i(j)=(t_0,t_1,\dots,t_m)</math>''，''否则称 <math>tr_i(j)</math> 无定义。若 <math>k\leq l_i</math>，亦称无定义。

=== 定义8 （部分函数<math>f_A</math>） ===
设 ''A'' 非零且有至少1行。令 <math>a_1=A_n[1]=\min(A_n)\text{，}L=l_n\text{，}p=p(n)=A_n[-(L+1)]</math>。定义部分函数 <math>f_A:\N\rightharpoonup\N</math>：

<math>(1)</math>若<math>x<a_1</math>，则<math>f_A(x)=x</math>；

<math>(2)</math>若<math>x=A_n[k]\text{且}x<p\text{且}k+L\leq\mathrm{len}(A_n)</math>，则<math>f_A(x)=A_n[k+L]</math>；

<math>(3)</math>若<math>x\geq p</math>，则<math>f_A(x)=x+n-p</math>；

<math>(4)</math>其余情形 <math>f_A(x)</math> 无定义。

=== 定义9 （copy 的行与步长） ===
设 ''A'' 行数为<math>n\geq1</math>，令 <math>p=p(n)</math>。若 copy 过程中出现 <math>f_A(x)</math> 无定义，则<math>copy(A)</math>无定义。否则定义 <math>A'=copy(A)</math> 行数为 <math>n'=2n-p</math>，满足：

<math>(1)</math>对<math>1\leq i\leq n-1\text{：}A_i'=A_i\text{，}l_i'=l_i\text{，}M_i'=M_i</math>；

<math>(2)</math>对每个<math>i\in\{1,\dots,n-p+1\}</math>，令源行<math>\sigma=p+i-1</math>，目标行<math>\tau=n-1+i</math>''i''，定义<math>A_\tau'=\mathrm{sort}(\{f_A(x)|x\in A_\sigma\})\text{，}l_\tau'=l_\sigma</math>，要求<math>\forall x\in A_\sigma\text{，}f_A(x)\text{有定义}</math>。

=== 定义10 （copy的标记过滤） ===
延续上一定义。对目标行<math>\tau</math>中元素<math>x\in A_\tau'</math>，令

<math>y\in A_\sigma</math>为其唯一来源（即 <math>f_A(y)=x</math>）。则 <math>x\in M_\tau'</math> 当且仅当：

<math>y\in M_\sigma</math>，并且满足下列之一：

* <math>tr_\sigma(y)</math>有定义且<math>tr_\sigma(y)[-2]\geq p</math>；
* 令<math>y_0</math>为<math>tr_\sigma(y)</math>中首次出现的<math><p</math>的元素（等价于“最大的
<math><p</math>的元素”）。要么<math>y_0<a_1</math>；要么存在 ''k'' 使<math>y_0=A_n[k]\text{且}k+L\leq\mathrm{len}(A_n)\text{且}A_n[k+L]\in M_n</math>，并且若 ''x'' 在 <math>A_\tau'</math>中的位置为 ''q''（从 1 开始），则当 <math>q+1-l_\sigma\geq1</math> 时需满足<math>A_\tau'[q+1-l_\sigma]\leq a_1.</math>

=== 定义11 （E(A,0)） ===
若 ''A'' 非零且 ''n ≥'' 1，则 ''E''(''A,'' 0) 为删除最后一行后的图案（行数变为 ''n −'' 1，其余行、步长、标记保持不变）。

=== 定义12 （''E''(''A, m'')的copy阶段 (''m≥1)''） ===
设A是极限图案。令<math>A^{(0)}=A</math>。若第一次<math>copy(A^{(0)})</math> 无定义，则称 ''A'' 为坏图案并定义<math>E(A,m)=E(A,0)</math>。否则定义

<math>A^{(1)}=copy(A^{(0)}),A^{(2)}=copy(A^{(1)}),\dots,A^{(m)}=copy(A^{(m-1)})</math>,

并令<math>B=E(A^{(m)},0)</math>

接下来对B做补全，初始行号 <math>r=n</math>（这里 ''n'' 为原始 ''A'' 的行数）。补全过程允许使用临时记录映射 <math>\rm Rec</math>（行号 <math>\mapsto</math> 有限序列），结束后丢弃。

=== 定义13 （标记补全） ===
固定当前行 ''r''。令<math>\mathcal{B}=\{b\in M_r|b\in A_r\}</math>并按升序枚举其元素<math>b_1<b_2<\dots<b_k</math>（该集合在本轮开始时冻结，新产生标记不加入本轮）。对每个 <math>b_i</math>依次：

<math>(1)</math>若 <math>tr_i(b_i)</math>无定义则跳过；

<math>(2)</math>令<math>t=tr_r(b_i)[-2]</math>。若<math>\mathrm{Rec}(t)</math>不存在或为空则跳过，否则记 <math>s=\mathrm{Rec}(t)</math>；

<math>(3)</math>若对所有<math>j=3,4,\dots,\mathrm{len}(tr_r(b_i))</math>都有<math>tr_r(b_i)[-j+1]+1\in A_{tr_r(b_i)[-j]}</math>，那么把s 及<math>b_i+1,b_i+2,\dots,b_i+\mathrm{len}(s)</math> 加入 <math>A_r</math>，并重新排序去重使

之严格递增。更新标记：''s'' 中元素不标记，<math>b_i+1,b_i+2,\dots,b_i+\mathrm{len}(s)</math> 全标

记，其余标记保留（按上述规则修正）。更新步长：<math>l_r=l_r+len(s)</math>。

=== 定义14 （原生补全） ===
固定当前行 ''r''。若<math>A_r</math>为长行，则原生补全不执行并返回 0。否则令<math>p_r=p(r)=A_r[-(l_r+1)]\text{，}a=A_r[-l_r]</math>.

构造序列 ''s''：令 <math>u_0=a</math>，并在<math>A_{u_m}[-2]</math> 存在且 <math>>p_r</math> 时令 <math>u_{m+1}=A_{u_m}[-2]</math>并把 <math>u_{m+1}</math> 追加到 ''s''，直至无法继续。令 <math>t=\mathrm{len}(s)</math>。若 <math>t=0</math> 返回 0；若<math>t>0</math>，令 <math>\mathrm{Rec}(r)=s</math> 并继续：

<math>(1)</math>在 ''r'' 后插入 ''t'' 行，使原本行号 <math>>r</math> 的行号整体加 ''t''；

<math>(2)</math> 仅对原本行号 <math>>r</math>的那些行，在其中把所有 <math>>r</math> 的元素加 ''t''，并同步

标记集合，步长不变；

<math>(3)</math>令旧行及旧步长为 <math>A_r^{old},l_r^{old}</math>。将旧行替换为 ''t'' + 1 行：

<math>A_{r+t}=\mathrm{sort}(A_r^{old}\cup s\cup\{r+1,r+2,\dots,r+t\})\text{，}l_{r+t}=l_r^{old}+t</math>.

标记规则：除s和r+t外均标记。

<math>(4)</math>对<math>i=t,t-1,\dots,1</math>，由<math>A_{r+i}</math>构造 <math>A_{r+i-1}</math>：删除元素<math>r+i</math>，并删除元素 <math>A_{r+i}[-l_{r+i}]</math>，去除<math>r+i-1</math> 的标记，并令 <math>l_{r+i-1}=l_{r+i}-1</math>。

<math>(5)</math>'''中等行例外：'''若<math>i=t</math> 且 ''<math>A_r^{old}</math>''为中等行，则在构造 <math>A_{r+i-1}</math> 时不删除 <math>A_{r+i}[-l_{r+i}]</math>且不减步长（令 <math>l_{r+i-1}=l_{r+i}</math>），但仍删除 <math>r+i</math> 并去除<math>r+i-1</math> 的标记。

原生补全返回t。

=== 定义15 （补全主循环(用于 ''E''(''A, m''))） ===
令初始<math>r=n</math>（''n'' 为原始 ''A'' 的行数）。当 ''r'' 不超过当前 ''B'' 的行数时循环：先对行 ''r'' 执行标记补全，再执行原生补全得到 ''t''，然后更新 <math>r=r+t+1</math>。当 ''r'' 越界时补全结束，丢弃 <math>\rm Rec</math>，所得 ''B'' 即为<math>E(A,m)</math>。

== 展开器 ==
iblp的展开器在[https://hypcos.github.io/notation-explorer/ NE]上可以找到，同时也可以使用如下Python代码直观地看到每个图案的行为。<syntaxhighlight lang="python3">
import bisect

def _clone_rows(rows):
return [row[:] for row in rows]

def _clone_mask(mask):
return [set(s) for s in mask]

def _find_index(sorted_row, val):
i = bisect.bisect_left(sorted_row, val)
if i < len(sorted_row) and sorted_row[i] == val:
return i
return None

def _shift_sorted_row_inplace(sorted_row, threshold, delta):
if delta == 0:
return
i = bisect.bisect_left(sorted_row, threshold)
for j in range(i, len(sorted_row)):
sorted_row[j] += delta

def _shift_mark_set(mark_set, threshold, delta):
if delta == 0 or not mark_set:
return mark_set
new = set()
for x in mark_set:
new.add(x + delta if x >= threshold else x)
return new

class ModifyUnpleasant(Exception):
pass

MSG_UNPLEASANT = (
"Something unpleasant happened. Please contact the author (E-mail: qwerasdfyh@126.com) "
"about the previous pattern so he can improve the rule design."
)

class BasicLaverPattern:
def __init__(self, rows, mask=None):
self.rows = _clone_rows(rows)
if mask is None:
self.mask = [set() for _ in self.rows]
else:
self.mask = _clone_mask(mask)
if self.mask:
self.mask[0] = set()
self._normalize_rows_inplace()

def _normalize_rows_inplace(self, start_row=1):
for r in range(max(1, start_row), len(self.rows)):
row = self.rows[r]
if row and row[-1] == r + 1:
row.pop()
self.mask[r].discard(r + 1)

def clone(self):
return BasicLaverPattern(self.rows, self.mask)

def is_zero(self):
return len(self.rows) == 1 and len(self.rows[0]) == 0

def is_successor(self):
if self.is_zero():
return False
last = self.rows[-1]
return len(last) == 2 and last[0] == 0

def draw(self):
if self.is_zero():
return
base_list = self.rows[0]
other_lists = self.rows[1:]
if not other_lists:
return
max_len = max((seq[-1] for seq in other_lists if seq), default=0) + 1
result = []
for i, seq in enumerate(other_lists, start=1):
line = [' '] * max_len
mset = self.mask[i]
for num in seq:
if 0 <= num < max_len:
line[num] = 'a' if num in mset else 'o'
if i <= len(base_list) and seq:
last_circle_index = seq[-1]
result.append(''.join(line[:last_circle_index + 1]) + f" {base_list[i-1]}")
for line in result:
print(line)

def to_string(self):
if self.is_zero():
return ""
base_list = self.rows[0]
out = []
for i in range(1, len(self.rows)):
seq = self.rows[i]
mset = self.mask[i]
parts = []
for x in reversed(seq):
parts.append(f"*{x}" if x in mset else str(x))
step = base_list[i - 1] if i - 1 < len(base_list) else 0
out.append("(" + ",".join(parts) + ")" + str(step))
return "".join(out)

def cut(self):
if self.is_zero():
return False
if len(self.rows) <= 1:
return False
if len(self.rows[0]) == 0:
self.rows = [[]]
self.mask = [set()]
return False
self.rows[0].pop()
self.rows.pop()
self.mask.pop()
if len(self.rows) == 1 and len(self.rows[0]) == 0:
self.mask = [set()]
self._normalize_rows_inplace()
return True

def _transmission_penultimate_and_terminal_checked(self, row_idx, n_value):
rows = self.rows
base = rows[0]
if n_value <= 0 or n_value >= len(rows):
return None
row = rows[row_idx]
l_m = base[row_idx - 1]
k = _find_index(row, n_value)
if k is None or k - l_m < 0:
return None
threshold = row[k - l_m]

cur = n_value
visited = {cur}
while True:
if cur <= 0 or cur >= len(rows):
return None
l_s = base[cur - 1]
if len(rows[cur]) < l_s + 1:
return None
nxt = rows[cur][-l_s - 1]
if nxt > threshold:
if nxt + 1 != cur + 1:
if _find_index(rows[cur], nxt + 1) is None:
return None
prev, cur = cur, nxt
if cur <= threshold:
return (prev, cur)
if cur in visited:
return None
visited.add(cur)

def _first_not_copied_in_transmission(self, orig_rows, orig_base, copied_set, row_idx, n_value):
row = orig_rows[row_idx]
l_m = orig_base[row_idx - 1]
k = _find_index(row, n_value)
if k is None or k - l_m < 0:
raise RuntimeError("Unpleasant.")
threshold = row[k - l_m]
cur = n_value
seq = [cur]
visited = {cur}
while True:
l_s = orig_base[cur - 1]
if len(orig_rows[cur]) < l_s + 1:
raise RuntimeError("Unpleasant.")
nxt = orig_rows[cur][-l_s - 1]
seq.append(nxt)
cur = nxt
if cur <= threshold:
break
if cur in visited:
raise RuntimeError("Unpleasant.")
visited.add(cur)
t = seq[-2]
terminal = seq[-1]
tprime = None
for x in seq:
if x not in copied_set:
tprime = x
break
return tprime, t, terminal

def _slice_right_block(self, row_idx, anchor, q):
row = self.rows[row_idx]
pos = _find_index(row, anchor)
if pos is None:
raise RuntimeError("Unpleasant.")
block = row[pos + 1: pos + 1 + q]
if len(block) != q:
raise RuntimeError("Unpleasant.")
return block

def _mark_completion_for_row(self, r, meta, native_done):
base = self.rows[0]
row0 = self.rows[r]
initial_marks = [x for x in row0 if x in self.mask[r]]
before = set(row0)
added_total = 0

for n in initial_marks:
if _find_index(self.rows[r], n) is None:
continue
if n <= 0 or n >= len(meta):
continue
info = meta[n]
if not info or not info.get("native_generated", False):
continue

tn = self._transmission_penultimate_and_terminal_checked(r, n)
if tn is None:
continue
t, n_terminal = tn
q = native_done.get(t, 0)
if q <= 0:
continue

target_row = t + q
left_block = self._slice_right_block(target_row, n_terminal, q)
right_block = list(range(n + 1, n + q + 1))

new_vals = set(left_block) | set(right_block)
truly_new = new_vals - before
if truly_new:
added_total += len(truly_new)
before |= truly_new

row_set = set(self.rows[r])
row_set.update(new_vals)
self.rows[r] = sorted(row_set)

self.mask[r].difference_update(left_block)
self.mask[r].update(right_block)

if added_total > 0:
base[r - 1] += (added_total // 2)

def _shift_values_ge(self, start_row_idx, threshold, delta):
for i in range(start_row_idx, len(self.rows)):
_shift_sorted_row_inplace(self.rows[i], threshold, delta)
self.mask[i] = _shift_mark_set(self.mask[i], threshold, delta)

def _native_completion_step(self, m, meta):
rows = self.rows
base = rows[0]
l = base[m - 1]
e = len(rows[m])

if e > 2 * l:
return False, 0

if l <= 0 or e < l:
return False, 0

s = [rows[m][-l]]
while True:
if s[-1] <= 0 or s[-1] >= len(rows):
return False, 0
if len(rows[s[-1]]) < 2:
return False, 0
s.append(rows[s[-1]][-2])
if len(rows[m]) < l + 1:
return False, 0
if s[-1] <= rows[m][-l - 1]:
break

k = len(s) - 1
if k == 1:
return False, 0
s.pop()
q = k - 1
if q <= 0:
return False, 0

marks_m_orig = set(self.mask[m])
self._shift_values_ge(m, m + 1, q)

if e == 2 * l:
c = rows[m][:]
else:
c = rows[m][:l - 1] + rows[m][l:]

ext = s[1:][::-1] + list(range(m + 1, m + q + 1))
rows[m].extend(ext)
rows[m].sort()
base[m - 1] += q

d = []
for i in range(q):
d_i = c + s[q - i:] + list(range(m + 1, m + i + 2))
d.append(sorted(d_i))

old_e = e + 1
base[:] = base[:m - 1] + list(range(old_e - l, old_e - l + q)) + base[m - 1:]
rows[:] = rows[:m] + d + rows[m:]
self.mask[:] = self.mask[:m] + [set() for _ in range(q)] + self.mask[m:]

meta_insert = [{"native_generated": True, "native_q": q} for _ in range(q)]
meta[:] = meta[:m] + meta_insert + meta[m:]

marks_to_propagate = {x + q if x >= m + 1 else x for x in marks_m_orig}
for row_idx in range(m, m + q + 1):
self.mask[row_idx].update(marks_to_propagate)
for j in range(1, q + 1):
self.mask[m + j].update(range(m, m + j))

self.mask[m + q].discard(m + 1 + q)
self._normalize_rows_inplace(start_row=m)
return True, q

def modify(self, copy_only=False, silent=False):
try:
orig_rows = _clone_rows(self.rows)
orig_mask = _clone_mask(self.mask)
orig_base = orig_rows[0][:]
orig_last_mask = set(orig_mask[-1]) if orig_mask else set()

rows = self.rows
base0 = rows[0]
n_before_cut = len(base0)
l_last = base0[n_before_cut - 1]
b = rows[-1][:]
b0 = b[0]
p_leftmost = b[0]

self.cut()
rows = self.rows
base0 = rows[0]

u = b[-l_last - 1]
v_copy = n_before_cut
base0.extend(orig_base[u - 1: v_copy])

b_map = {}
limit = len(b) - l_last
for i in range(limit):
key = b[i]
if key not in b_map:
b_map[key] = b[i + l_last]

def map_elem(x):
if x < b0:
return x
if x > u:
return x - u + n_before_cut
return b_map.get(x, -1)

copied_set = set(range(u, v_copy + 1))

for row_idx in range(u, v_copy + 1):
src_row = orig_rows[row_idx]
new_seq = []
for elem in src_row:
new_val = map_elem(elem)
if new_val == -1:
if not silent:
print(MSG_UNPLEASANT)
raise ModifyUnpleasant
new_seq.append(new_val)
new_seq.sort()
rows.append(new_seq)

new_marks = set()
src_marks = orig_mask[row_idx]
if src_marks:
l_m = orig_base[row_idx - 1]
for marked_val in src_marks:
if _find_index(orig_rows[row_idx], marked_val) is None:
continue
tprime, t, _terminal = self._first_not_copied_in_transmission(
orig_rows, orig_base, copied_set, row_idx, marked_val
)
keep = False
if t in copied_set:
keep = True
else:
if tprime is not None and tprime < p_leftmost:
keep = True
elif tprime is not None:
u_img = b_map.get(tprime, None)
if u_img is not None and u_img in orig_last_mask:
mv_img = map_elem(marked_val)
if mv_img != -1:
pos_u = _find_index(new_seq, mv_img)
if pos_u is not None:
idx_check = pos_u - l_m + 1
if idx_check >= 0 and new_seq[idx_check] <= p_leftmost:
keep = True
if keep:
new_marks.add(map_elem(marked_val))
self.mask.append(new_marks)

if copy_only:
self._normalize_rows_inplace()
return self.clone()

meta = [None] * len(self.rows)
native_done = {}

m = n_before_cut
while True:
base0 = self.rows[0]
if m > len(base0):
break
self._mark_completion_for_row(m, meta, native_done)
did, q = self._native_completion_step(m, meta)
if did:
native_done[m] = q
m += q + 1
else:
m += 1

self._normalize_rows_inplace()
return self.clone()

except ModifyUnpleasant:
raise
except RuntimeError as e:
if str(e) == "Unpleasant.":
if not silent:
print(MSG_UNPLEASANT)
raise ModifyUnpleasant
raise

initial_rows = [
[1, 1, 2, 2, 2],
[0, 1],
[0, 1, 2],
[0, 1, 2, 3],
[0, 1, 2, 3, 4],
[2, 3, 4, 5]
]
initial_mask = [set() for _ in initial_rows]
initial_mask[4] = {3}

def _encode_expr(pat: BasicLaverPattern):
base = pat.rows[0]
expr = []
for i in range(1, len(pat.rows)):
L = base[i - 1] if (i - 1) < len(base) else 0
vals_desc = list(reversed(pat.rows[i]))
mset = pat.mask[i]
row = [L] + [[v, (v in mset)] for v in vals_desc]
expr.append(row)
return expr

def _decode_expr(expr):
base = [row[0] for row in expr]
rows = [base]
mask = [set()]
for row in expr:
vals = [x[0] for x in row[1:]]
vals = sorted(set(vals))
rows.append(vals)
mask.append({x[0] for x in row[1:] if x[1]})
return BasicLaverPattern(rows, mask)

def _deepcopy_expr(expr):
return [[row[0]] + [[x[0], bool(x[1])] for x in row[1:]] for row in expr]

def _values(row):
return [row[0]] + [x[0] for x in row[1:]]

def _cut_expr(expr):
return _deepcopy_expr(expr[:-1])

def _pleasant_until(rows, t):
tv = _values(t)
L = t[0]
tcheck = tv[1 + L:]
if not tcheck:
return -1

tmax = tcheck[0]
tmin = tcheck[-1]
tset = set(tcheck)

for n, s in enumerate(rows):
scheck = _values(s)[1:]
i1 = -1
for idx, x in enumerate(scheck):
if x < tmax:
i1 = idx
break
i2 = -1
for idx in range(len(scheck) - 1, -1, -1):
if scheck[idx] > tmin:
i2 = idx
break

if i1 != -1 and i2 != -1 and i1 <= i2:
mid = scheck[i1:i2 + 1]
if any(x not in tset for x in mid):
return n
return -1

def _seq_from(expr, i, j):
row = expr[i]
val = row[j][0]
L = row[0]
threshold = row[j + L][0] if (j + L) < len(row) else 0

record = [[i + 1, j], [val]]
while val > threshold:
row = expr[val - 1]
idx = 1 + row[0]
record[-1].append(idx)
val = row[idx][0] if idx < len(row) else 0
record.append([val])

record.pop()
return record

def _apv(s_vals, t_vals):
L = t_vals[0]
t_last = t_vals[-1]
t_1 = t_vals[1]
t_1L = t_vals[1 + L] if (1 + L) < len(t_vals) else 0

out = []
for x in s_vals:
if x < t_last:
out.append(x)
elif x >= t_1L:
out.append(x - t_1L + t_1)
else:
k = -1
for idx in range(len(t_vals) - 1, -1, -1):
if t_vals[idx] == x:
k = idx
break
out.append(None if k == -1 else t_vals[k - L])
return out

def _ap(row_s, row_t):
svals = _values(row_s)[1:]
tvals = _values(row_t)
mapped = _apv(svals, tvals)
return [row_s[0]] + [[x, False] for x in mapped]

def _copy_block(raw, flag):
active = raw[-1]
expr = _cut_expr(raw)

begin = active[1 + active[0]][0]
end = (begin + flag) if (flag != -1) else (len(raw) + 1)
offset = len(raw) - begin

expr.extend([_ap(row, active) for row in raw[begin - 1:end - 1]])

active_min = active[-1][0]
begin_rowno = begin

for i in range(begin - 1, end - 1):
row = raw[i]
target_row = expr[i + offset]
for j in range(1, len(row)):
if not row[j][1]:
continue

seq = _seq_from(raw, i, j)

nomove = -1
for k, item in enumerate(seq):
if item[0] < begin_rowno:
nomove = k
break

if nomove == -1:
target_row[j][1] = True
continue

if seq[nomove][0] < active_min:
target_row[j][1] = True
continue

c = seq[nomove - 1][0] + offset
rowc = expr[c - 1]
b = rowc[seq[nomove - 1][1]][0]

idx_check = j + target_row[0] - 1
left_ok = (idx_check < len(target_row)) and (target_row[idx_check][0] <= active_min)
active_has_b_mark = any((x[0] == b and x[1]) for x in active[1:])

if left_ok and active_has_b_mark:
target_row[j][1] = True

return expr

def _comp_to(raw, r, already):
expr = _deepcopy_expr(raw)
for j in range(len(raw[r]) - 1, 0, -1):
if not raw[r][j][1]:
continue
n = raw[r][j][0]
seq = _seq_from(raw, r, j)
t = seq[-1][0]
T = already[t - 1] if (t - 1) < len(already) else None
if not T:
continue
q = len(T)
entries = (
[[x[0], bool(x[1])] for x in expr[r][1:]] +
[[x, False] for x in T] +
[[n + 1 + uu, True] for uu in range(q)]
)
entries.sort(key=lambda z: z[0], reverse=True)
expr[r] = [expr[r][0] + q] + entries
return expr

def _comp_from(raw, r, T):
q = len(T)

expr = [[row[0]] + [[x[0], bool(x[1])] for x in row[1:]] for row in raw[:r]]

if len(raw[r]) < raw[r][0] * 2 + 1:
lr = raw[r][0]
cr = raw[r][1:-raw[r][0]] + raw[r][1 + raw[r][0]:]
else:
lr = raw[r][0] + 1
cr = raw[r][1:]

need_len = r + q + 1
if len(expr) < need_len:
expr.extend([None] * (need_len - len(expr)))

for qq in range(q):
entries = (
[[x[0], bool(x[1])] for x in cr] +
[[x, False] for x in T[:1 + qq]] +
[[raw[r][1][0] + 1 + uu, False] for uu in range(qq)]
)
entries.sort(key=lambda z: z[0], reverse=True)
expr[r + qq] = [lr + qq] + entries

entries = (
[[x[0], bool(x[1])] for x in raw[r][1:]] +
[[x, False] for x in T] +
[[raw[r][1][0] + 1 + uu, False] for uu in range(q)]
)
entries.sort(key=lambda z: z[0], reverse=True)
expr[r + q] = [raw[r][0] + q] + entries

for qq in range(1, q + 1):
for uu in range(2, 1 + qq + 1):
expr[r + qq][uu][1] = True

threshold = raw[r][1][0]

def m(entry, idx):
if idx == 0:
return entry
vv = entry[0]
if vv <= threshold:
return [vv, bool(entry[1])]
return [vv + q, bool(entry[1])]

for row in raw[r + 1:]:
new_row = []
for idx, entry in enumerate(row):
new_row.append(m(entry, idx))
expr.append(new_row)

return expr

def _expand_pleasant_only(raw, FSterm, longer=False):
if FSterm < 0:
FSterm = 0

active = raw[-1]
L = active[0]
if (1 + L) >= len(active) or (active[1 + L][0] == 0):
return _cut_expr(raw)

begin = active[1 + L][0]
flag = _pleasant_until(raw[begin - 1:-1], active)
if flag != -1:
raise ModifyUnpleasant

expr = _deepcopy_expr(raw)
for _ in range(FSterm):
expr = _copy_block(expr, -1)

expr = _copy_block(expr, 1) if longer else _cut_expr(expr)

already = []
r = len(raw) - 1
while r < len(expr):
expr = _comp_to(expr, r, already)

if not (len(expr[r]) <= expr[r][0] * 2 + 1):
r += 1
continue

idx0 = expr[r][expr[r][0]][0]
T = [idx0]
bound = expr[r][expr[r][0] + 1][0]

while T[0] > bound:
rr = T[0] - 1
T.insert(0, expr[rr][2][0])

T = T[1:-1]
if len(T) < 1:
r += 1
continue

expr = _comp_from(expr, r, T)

while len(already) <= r:
already.append(None)
already[r] = T

r += len(T) + 1

return expr

def _expand_like_model(pattern: BasicLaverPattern, FSterm: int, longer: bool, silent: bool):
if pattern.is_zero():
return pattern.clone(), 0
if pattern.is_successor():
q = pattern.clone()
q.cut()
return q, 0

base0 = pattern.rows[0]
if not base0:
q = pattern.clone()
q.cut()
return q, 0

if FSterm <= 0:
q = pattern.clone()
q.cut()
return q, 0

try:
raw = _encode_expr(pattern)
res = _expand_pleasant_only(raw, FSterm=FSterm, longer=longer)
p2 = _decode_expr(res)
return p2.clone(), 1
except ModifyUnpleasant:
if not silent:
print(MSG_UNPLEASANT)
q = pattern.clone()
q.cut()
return q, 0

def _apply_special_one(pattern: BasicLaverPattern, silent=False):
if pattern.is_zero():
return pattern.clone(), 0
if pattern.is_successor():
p = pattern.clone()
p.cut()
return p, 0

p = pattern.clone()
try:
orig_rows = _clone_rows(p.rows)
orig_mask = _clone_mask(p.mask)
orig_base = orig_rows[0][:]
orig_last_mask = set(orig_mask[-1]) if orig_mask else set()

rows = p.rows
base0 = rows[0]
n_before_cut = len(base0)
if n_before_cut <= 0:
p2 = p.clone()
p2.cut()
return p2, 0

original_total_rows = len(rows)

l_last = base0[n_before_cut - 1]
b = rows[-1][:]
if not b:
p2 = p.clone()
p2.cut()
return p2, 0
b0 = b[0]
p_leftmost = b[0]

p.cut()
rows = p.rows
base0 = rows[0]

if l_last < 0 or len(b) < l_last + 1:
if not silent:
print(MSG_UNPLEASANT)
raise ModifyUnpleasant
u = b[-l_last - 1]

if u - 1 < 0 or u - 1 >= len(orig_base):
if not silent:
print(MSG_UNPLEASANT)
raise ModifyUnpleasant
base0.append(orig_base[u - 1])

b_map = {}
limit = len(b) - l_last
for i in range(limit):
key = b[i]
if key not in b_map:
b_map[key] = b[i + l_last]

def map_elem(x):
if x < b0:
return x
if x > u:
return x - u + n_before_cut
return b_map.get(x, -1)

copied_set = {u}

if u <= 0 or u >= len(orig_rows):
if not silent:
print(MSG_UNPLEASANT)
raise ModifyUnpleasant

src_row = orig_rows[u]
new_seq = []
for elem in src_row:
new_val = map_elem(elem)
if new_val == -1:
if not silent:
print(MSG_UNPLEASANT)
raise ModifyUnpleasant
new_seq.append(new_val)
new_seq.sort()
rows.append(new_seq)

new_marks = set()
src_marks = orig_mask[u]
if src_marks:
l_m = orig_base[u - 1]
for marked_val in src_marks:
if _find_index(orig_rows[u], marked_val) is None:
continue
tprime, t, _terminal = p._first_not_copied_in_transmission(
orig_rows, orig_base, copied_set, u, marked_val
)
keep = False
if t in copied_set:
keep = True
else:
if tprime is not None and tprime < p_leftmost:
keep = True
elif tprime is not None:
u_img = b_map.get(tprime, None)
if u_img is not None and u_img in orig_last_mask:
mv_img = map_elem(marked_val)
if mv_img != -1:
pos_u = _find_index(new_seq, mv_img)
if pos_u is not None:
idx_check = pos_u - l_m + 1
if idx_check >= 0 and new_seq[idx_check] <= p_leftmost:
keep = True
if keep:
mv = map_elem(marked_val)
if mv != -1:
new_marks.add(mv)

p.mask.append(new_marks)
p._normalize_rows_inplace(start_row=len(p.rows) - 1)

meta = [None] * len(p.rows)
m = len(p.rows[0])
did, q = p._native_completion_step(m, meta)

if did and q > 0:
for _ in range(q):
p.cut()

while len(p.rows) > original_total_rows:
p.cut()

p._normalize_rows_inplace()
return p.clone(), 1

except ModifyUnpleasant:
q = pattern.clone()
q.cut()
return q, 0
except RuntimeError as e:
if str(e) == "Unpleasant.":
if not silent:
print(MSG_UNPLEASANT)
q = pattern.clone()
q.cut()
return q, 0
raise

def _apply_number(pattern, n, silent=False):
if pattern.is_zero():
return pattern.clone(), 0

if n == 0:
p = pattern.clone()
p.cut()
return p, 0

if pattern.is_successor():
p = pattern.clone()
p.cut()
return p, 0

if n == 1:
return _apply_special_one(pattern, silent=silent)

FSterm = n - 1
nxt, ok = _expand_like_model(pattern, FSterm=FSterm, longer=False, silent=silent)
if ok == 0:
return nxt, 0
return nxt, n

def reconstruct_pattern_list(op_numbers, silent=False):
pattern_list = [BasicLaverPattern(initial_rows, initial_mask)]
executed = []
for n in op_numbers:
cur = pattern_list[-1]
nxt, actual = _apply_number(cur, n, silent=silent)
executed.append(actual)
pattern_list.append(nxt)
return executed, pattern_list, None

def _cmp_lists(a, b):
la, lb = len(a), len(b)
m = la if la < lb else lb
for i in range(m):
if a[i] < b[i]:
return -1
if a[i] > b[i]:
return 1
if la < lb:
return -1
if la > lb:
return 1
return 0

def _row_key_for_compare(pat, row_idx):
base = pat.rows[0]
row = pat.rows[row_idx]
l = base[row_idx - 1] if row_idx - 1 < len(base) else 0
if l <= 1:
keep = row[:]
else:
if len(row) < l:
keep = row[:]
else:
keep = [row[0]] + row[l:]
keep = keep[::-1]
return keep

def compare_patterns(a, b):
ra = len(a.rows) - 1
rb = len(b.rows) - 1
m = ra if ra < rb else rb
for i in range(1, m + 1):
ka = _row_key_for_compare(a, i)
kb = _row_key_for_compare(b, i)
c = _cmp_lists(ka, kb)
if c != 0:
return c
if ra < rb:
return -1
if ra > rb:
return 1
return 0

def _is_prefix(seg, full):
if len(seg.rows) > len(full.rows):
return False
if seg.rows[0] != full.rows[0][:len(seg.rows[0])]:
return False
for i in range(1, len(seg.rows)):
if seg.rows[i] != full.rows[i]:
return False
return True

def _is_proper_prefix(seg, full):
return _is_prefix(seg, full) and (len(seg.rows) < len(full.rows))

def _pattern_equal(a: BasicLaverPattern, b: BasicLaverPattern):
return a.rows == b.rows and a.mask == b.mask

def _pattern_signature(p: BasicLaverPattern):
rows_sig = tuple(tuple(r) for r in p.rows)
mask_sig = tuple(tuple(sorted(s)) for s in p.mask)
return rows_sig, mask_sig

_EXPAND_COUNTS_CACHE = {}

def _expand_row_counts_from(start_pat: BasicLaverPattern, n: int):
if n < 0:
n = 0
key = (_pattern_signature(start_pat), n)
if key in _EXPAND_COUNTS_CACHE:
return _EXPAND_COUNTS_CACHE[key][:]

counts = [len(start_pat.rows)]
for k in range(1, n + 1):
res, _act = _apply_number(start_pat, k, silent=True)
counts.append(len(res.rows))

_EXPAND_COUNTS_CACHE[key] = counts[:]
return counts

def _simplify(op_numbers, pattern_list):
target = pattern_list[-1].clone()

s = op_numbers[:]
executed, pats, _ = reconstruct_pattern_list(s, silent=True)
s = executed
pattern_list = pats

i = len(s) - 1
while i >= 0:
if i >= len(s):
i = len(s) - 1
if i < 0:
break
if s[i] == 0:
i -= 1
continue

while True:
if i >= len(s):
break
n = s[i]

z = 0
j = i + 1
while j < len(s) and s[j] == 0:
z += 1
j += 1

candidate = None
need = None

if n == 1:
if z >= 1:
candidate = s[:i] + s[i + 1:]
else:
break
else:
start_pat = pattern_list[i]
counts = _expand_row_counts_from(start_pat, n)
need = counts[n] - counts[n - 1]
if need < 0:
need = 0

if z < need:
break

candidate = s[:]
candidate[i] = n - 1
if need > 0:
del candidate[i + 1: i + 1 + need]

cand_exec, cand_pats, _ = reconstruct_pattern_list(candidate, silent=True)
if not cand_pats or not _pattern_equal(cand_pats[-1], target):
break

s = cand_exec
pattern_list = cand_pats

if i >= len(s):
break
if s[i] == 0:
break

i = min(i, len(s) - 1)
i -= 1
while i >= 0 and s[i] == 0:
i -= 1

executed, pattern_list, _ = reconstruct_pattern_list(s, silent=True)
return executed, pattern_list

def _seq_str(nums):
return ",".join(str(x) for x in nums)

def _parse_o_string(s):
s = s.strip()
if s == "":
return BasicLaverPattern([[]], [set()]), None

pos = 0
rows_desc = []
steps = []
n = len(s)

while pos < n:
if s[pos] != "(":
return None, "error"
pos += 1
close = s.find(")", pos)
if close == -1:
return None, "error"
inside = s[pos:close].strip()
pos = close + 1

nums = []
if inside != "":
parts = inside.split(",")
for part in parts:
part = part.strip()
if part.startswith("*"):
part = part[1:].strip()
if part == "" or (not part.isdigit()):
return None, "error"
nums.append(int(part))

nums_asc = sorted(nums)
for i in range(1, len(nums_asc)):
if nums_asc[i] == nums_asc[i - 1]:
return None, "error"

if pos >= n or (not s[pos].isdigit()):
return None, "error"
j = pos
while j < n and s[j].isdigit():
j += 1
step = int(s[pos:j])
pos = j

rows_desc.append(nums_asc)
steps.append(step)

rows = [steps[:]] + rows_desc
mask = [set()] + [set() for _ in rows_desc]
return BasicLaverPattern(rows, mask), None

def _read_find_pattern(I):
initial = BasicLaverPattern(initial_rows, initial_mask)
C = initial.clone()

ops = []
pats = [C.clone()]

if compare_patterns(C, I) <= 0:
return C, ops, pats

MAX_OUTER = 50000
MAX_N = 20000
outer = 0

while outer < MAX_OUTER:
outer += 1

if compare_patterns(C, I) == 0:
return C, ops, pats

n = 0
while n <= MAX_N:
Cn, actual = _apply_number(C, n, silent=True)

if _is_proper_prefix(Cn, I):
n += 1
continue

if (compare_patterns(Cn, I) < 0) and (not _is_prefix(Cn, I)):
return C, ops, pats

if compare_patterns(Cn, I) >= 0:
if Cn.rows == C.rows and Cn.mask == C.mask:
return C, ops, pats
C = Cn
ops.append(actual)
pats.append(C.clone())
break

n += 1

else:
return C, ops, pats

return C, ops, pats

def main_program():
op_numbers = []
executed, pattern_list, _ = reconstruct_pattern_list(op_numbers, silent=True)
op_numbers = executed

while True:
cur = pattern_list[-1]
print("\nCurrent pattern:")
if cur.is_zero():
print("(empty)")
else:
cur.draw()

print(f"Operation sequence: {_seq_str(op_numbers)}")

if cur.is_zero():
pattern_type = "Zero"
elif cur.is_successor():
pattern_type = "Successor"
else:
pattern_type = "Limit"

msg = f"This is a {pattern_type} pattern."
msg += " Natural Number: Operation."
msg += " O: Output."
msg += " R: Read."
if len(pattern_list) > 1:
msg += " U: Undo."
msg += " S: Simplify."
msg += " I: Input operations."
print(msg)

user_input = input("Enter your operation: ").strip().upper()

if user_input.isdigit():
n_in = int(user_input)
nxt, actual = _apply_number(cur, n_in, silent=False)
pattern_list.append(nxt)
op_numbers.append(actual)
if actual == 0:
print("Applied cut operation.")
else:
print(f"Applied operation {actual}.")
continue

if user_input == 'O':
print(cur.to_string())
continue

if user_input == 'R':
raw = input("Input pattern string (from O): ").strip()
pat, err = _parse_o_string(raw)
if err:
print("error")
continue
found, ops, pats = _read_find_pattern(pat)
op_numbers = ops
pattern_list = pats
print(found.to_string())
continue

if user_input == 'U' and len(pattern_list) > 1:
op_numbers = op_numbers[:-1]
executed, pattern_list, _ = reconstruct_pattern_list(op_numbers, silent=True)
op_numbers = executed
print("Undo the last operation.")
continue

if user_input == 'S':
new_ops, new_patterns = _simplify(op_numbers, pattern_list)
if new_ops != op_numbers:
op_numbers = new_ops
pattern_list = new_patterns
print(f"Simplified operation sequence: {_seq_str(op_numbers)}")
else:
print("No further simplifications possible.")
continue

if user_input == 'I':
raw = input("Input the operation sequence (comma-separated natural numbers, e.g., 3,0,2,1): ").strip()
if raw == "":
parsed = []
else:
parts = [p.strip() for p in raw.split(",")]
if any(p == "" or (not p.isdigit()) for p in parts):
print("error")
continue
parsed = [int(p) for p in parts]
executed, pattern_list, _ = reconstruct_pattern_list(parsed, silent=True)
op_numbers = executed
continue

print("Invalid operation. Please try again.")

if __name__ == "__main__":
main_program()

</syntaxhighlight>
[[分类:记号]]

iBLP

2026-02-21T15:39:10Z

油手就行：

== 记号简介 ==
无限基本Laver图案(Infinite Basic Laver Pattern)是由test_alpha0的记号Basic Laver Pattren改造而来。IBLP目前尚不理想，还存在许多的坏图案，test_alpha0规定其极限表达式为(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2)1(5,4,3,2)2(6,5,4)1。尽管如此，IBLP仍然被认为是目前最强的记号。本页面介绍的规则对应[https://hypcos.github.io/notation-explorer/ NE]上的DEN2。

== 定义 ==

=== 定义1 （IBLP） ===
一个IBLP是一个四元组<math>A=(n,(A_1,\dots,A_n),(l_1,\dots,l_n),(M_1,\dots,M_n))</math>，

其中：

<math>(1)n\in\N</math>。

<math>(2)</math>对每个<math>i\in\{1,\dots,n\}</math>，<math>A_i</math>是严格递增的非负整数序列，满足<math>\mathrm{len}(A_i)\geq2\text{且}\max(A_i)=i</math>。

<math>(3)</math>对每个<math>i\in\{1,\dots,n\}</math>，步长<math>l_i\in \N</math>。

<math>(4)</math>对每个<math>i\in\{1,\dots,n\}</math>，标记集合<math>M_i\subseteq A_i</math>

约定所有编号从 1 开始；<math>A_i[k]</math> 表示第 ''k'' 个元素，<math>A_i[-j]=A_i[\mathrm{len}(A_i)-j+1]</math>表示倒数第 ''j'' 个元素。

=== 定义2 （长行、中等行、短行） ===
行 <math>i</math> 称为长行若<math>\mathrm{len}(A_i)>2l_i</math>，称为中等行若<math>\mathrm{len}(A_i)=2l_i</math>，称为短行若 <math>\mathrm{len}(A_i)<2l_i</math>。

=== 定义3 （零图案、后继图案、极限图案） ===
若 ''n'' = 0，称 ''A'' 为零图案。若 <math>n>0\text{且}\mathrm{len}(A_n)=2\text{且}\min(A_n)=0</math>，称 ''A'' 为后继图案。否则称 ''A'' 为极限图案。

=== 定义4 （行比较键） ===
令<math>A_i=(A_1<a_2<\dots<a_m)\text{且}L=l_i</math>。定义保留序列

<math>K_i=\begin{cases}(a_1,a_2,\dots,a_m),&L\leq1;\\(a_1,a_{L+1},a_{L+2},\dots,a_m),&2\leq L\leq m;\\(a_1,a_2,\dots,a_m),&L\geq2\text{且}m<L.\end{cases}</math>

定义行键为<math>\overleftarrow{K_i}</math>（即<math>K_i
</math>逆序，从大到小）。

=== 定义5 （IBLP的大小比较） ===
给定两个 ''IBLP'' <math>A\text{、}B</math>，从 <math>i=1</math> 起逐行比较其

行键<math>\overleftarrow{K_i(A)}\text{与}\overleftarrow{K_i(B)}</math> 的字典序；第一处不同决定大小。若前<math>\min(n_a,n_b)</math>行都相等，则行数较小者更小。

=== 定义6 （一行的根<math>p(i)</math>） ===
对<math>i\in\{1,\dots,n\}</math>，定义<math>p(i)=A_i[-(l_i+1)]</math>.

=== 定义7 （传递序列<math>tr_i(j)</math>） ===
固定行 ''i''。若<math>j=A_i[k](1\leq k\leq\mathrm{len}(A_i))\text{且}k\geq l_i</math>，定义阈值 <math>\theta=A_i[k-l_i]</math>。令 <math>t_0=j</math>，并在<math>t_m>\theta\text{且}p(t_m)\text{有定义}</math>时令 <math>t_{m+1}=p(t_m)</math>。若存在最小 <math>m>0</math>使<math>t_m=\theta</math>，则定义<math>tr_i(j)=(t_0,t_1,\dots,t_m)</math>''，''否则称 <math>tr_i(j)</math> 无定义。若 <math>k\leq l_i</math>，亦称无定义。

=== 定义8 （部分函数<math>f_A</math>） ===
设 ''A'' 非零且有至少1行。令 <math>a_1=A_n[1]=\min(A_n)\text{，}L=l_n\text{，}p=p(n)=A_n[-(L+1)]</math>。定义部分函数 <math>f_A:\N\rightharpoonup\N</math>：

<math>(1)</math>若<math>x<a_1</math>，则<math>f_A(x)=x</math>；

<math>(2)</math>若<math>x=A_n[k]\text{且}x<p\text{且}k+L\leq\mathrm{len}(A_n)</math>，则<math>f_A(x)=A_n[k+L]</math>；

<math>(3)</math>若<math>x\geq p</math>，则<math>f_A(x)=x+n-p</math>；

<math>(4)</math>其余情形 <math>f_A(x)</math> 无定义。

=== 定义9 （copy 的行与步长） ===
设 ''A'' 行数为<math>n\geq1</math>，令 <math>p=p(n)</math>。若 copy 过程中出现 <math>f_A(x)</math> 无定义，则<math>copy(A)</math>无定义。否则定义 <math>A'=copy(A)</math> 行数为 <math>n'=2n-p</math>，满足：

<math>(1)</math>对<math>1\leq i\leq n-1\text{：}A_i'=A_i\text{，}l_i'=l_i\text{，}M_i'=M_i</math>；

<math>(2)</math>对每个<math>i\in\{1,\dots,n-p+1\}</math>，令源行<math>\sigma=p+i-1</math>，目标行<math>\tau=n-1+i</math>''i''，定义<math>A_\tau'=\mathrm{sort}(\{f_A(x)|x\in A_\sigma\})\text{，}l_\tau'=l_\sigma</math>，要求<math>\forall x\in A_\sigma\text{，}f_A(x)\text{有定义}</math>。

=== 定义10 （copy的标记过滤） ===
延续上一定义。对目标行<math>\tau</math>中元素<math>x\in A_\tau'</math>，令

<math>y\in A_\sigma</math>为其唯一来源（即 <math>f_A(y)=x</math>）。则 <math>x\in M_\tau'</math> 当且仅当：

<math>y\in M_\sigma</math>，并且满足下列之一：

* <math>tr_\sigma(y)</math>有定义且<math>tr_\sigma(y)[-2]\geq p</math>；
* 令<math>y_0</math>为<math>tr_\sigma(y)</math>中首次出现的<math><p</math>的元素（等价于“最大的
<math><p</math>的元素”）。要么<math>y_0<a_1</math>；要么存在 ''k'' 使<math>y_0=A_n[k]\text{且}k+L\leq\mathrm{len}(A_n)\text{且}A_n[k+L]\in M_n</math>，并且若 ''x'' 在 <math>A_\tau'</math>中的位置为 ''q''（从 1 开始），则当 <math>q+1-l_\sigma\geq1</math> 时需满足<math>A_\tau'[q+1-l_\sigma]\leq a_1.</math>

=== 定义11 （E(A,0)） ===
若 ''A'' 非零且 ''n ≥'' 1，则 ''E''(''A,'' 0) 为删除最后一行后的图案（行数变为 ''n −'' 1，其余行、步长、标记保持不变）。

=== 定义12 （''E''(''A, m'')的copy阶段 (''m≥1)''） ===
设A是极限图案。令<math>A^{(0)}=A</math>。若第一次<math>copy(A^{(0)})</math> 无定义，则称 ''A'' 为坏图案并定义<math>E(A,m)=E(A,0)</math>。否则定义

<math>A^{(1)}=copy(A^{(0)}),A^{(2)}=copy(A^{(1)}),\dots,A^{(m)}=copy(A^{(m-1)})</math>,

并令<math>B=E(A^{(m)},0)</math>

接下来对B做补全，初始行号 <math>r=n</math>（这里 ''n'' 为原始 ''A'' 的行数）。补全过程允许使用临时记录映射 <math>\rm Rec</math>（行号 <math>\mapsto</math> 有限序列），结束后丢弃。

=== 定义13 （标记补全） ===
固定当前行 ''r''。令<math>\mathcal{B}=\{b\in M_r|b\in A_r\}</math>并按升序枚举其元素<math>b_1<b_2<\dots<b_k</math>（该集合在本轮开始时冻结，新产生标记不加入本轮）。对每个 <math>b_i</math>依次：

<math>(1)</math>若 <math>tr_i(b_i)</math>无定义则跳过；

<math>(2)</math>令<math>t=tr_r(b_i)[-2]</math>。若<math>\mathrm{Rec}(t)</math>不存在或为空则跳过，否则记 <math>s=\mathrm{Rec}(t)</math>；

<math>(3)</math>若对所有<math>j=3,4,\dots,\mathrm{len}(tr_r(b_i))</math>都有<math>tr_r(b_i)[-j+1]+1\in A_{tr_r(b_i)[-j]}</math>，那么把s 及<math>b_i+1,b_i+2,\dots,b_i+\mathrm{len}(s)</math> 加入 <math>A_r</math>，并重新排序去重使

之严格递增。更新标记：''s'' 中元素不标记，<math>b_i+1,b_i+2,\dots,b_i+\mathrm{len}(s)</math> 全标

记，其余标记保留（按上述规则修正）。更新步长：<math>l_r=l_r+len(s)</math>。

=== 定义14 （原生补全） ===
固定当前行 ''r''。若<math>A_r</math>为长行，则原生补全不执行并返回 0。否则令<math>p_r=p(r)=A_r[-(l_r+1)]\text{，}a=A_r[-l_r]</math>.

构造序列 ''s''：令 <math>u_0=a</math>，并在<math>A_{u_m}[-2]</math> 存在且 <math>>p_r</math> 时令 <math>u_{m+1}=A_{u_m}[-2]</math>并把 <math>u_{m+1}</math> 追加到 ''s''，直至无法继续。令 <math>t=\mathrm{len}(s)</math>。若 <math>t=0</math> 返回 0；若<math>t>0</math>，令 <math>\mathrm{Rec}(r)=s</math> 并继续：

<math>(1)</math>在 ''r'' 后插入 ''t'' 行，使原本行号 <math>>r</math> 的行号整体加 ''t''；

<math>(2)</math> 仅对原本行号 <math>>r</math>的那些行，在其中把所有 <math>>r</math> 的元素加 ''t''，并同步

标记集合，步长不变；

<math>(3)</math>令旧行及旧步长为 <math>A_r^{old},l_r^{old}</math>。将旧行替换为 ''t'' + 1 行：

<math>A_{r+t}=\mathrm{sort}(A_r^{old}\cup s\cup\{r+1,r+2,\dots,r+t\})\text{，}l_{r+t}=l_r^{old}+t</math>.

标记规则：除s和r+t外均标记。

<math>(4)</math>对<math>i=t,t-1,\dots,1</math>，由<math>A_{r+i}</math>构造 <math>A_{r+i-1}</math>：删除元素<math>r+i</math>，并删除元素 <math>A_{r+i}[-l_{r+i}]</math>，去除<math>r+i-1</math> 的标记，并令 <math>l_{r+i-1}=l_{r+i}-1</math>。

<math>(5)</math>'''中等行例外：'''若<math>i=t</math> 且 ''<math>A_r^{old}</math>''为中等行，则在构造 <math>A_{r+i-1}</math> 时不删除 <math>A_{r+i}[-l_{r+i}]</math>且不减步长（令 <math>l_{r+i-1}=l_{r+i}</math>），但仍删除 <math>r+i</math> 并去除<math>r+i-1</math> 的标记。

原生补全返回t。

=== 定义15 （补全主循环(用于 ''E''(''A, m''))） ===
令初始<math>r=n</math>（''n'' 为原始 ''A'' 的行数）。当 ''r'' 不超过当前 ''B'' 的行数时循环：先对行 ''r'' 执行标记补全，再执行原生补全得到 ''t''，然后更新 <math>r=r+t+1</math>。当 ''r'' 越界时补全结束，丢弃 <math>\rm Rec</math>，所得 ''B'' 即为<math>E(A,m)</math>。
[[分类:记号]]

iBLP

2026-02-21T15:37:59Z

油手就行：创建页面，内容为“== 记号简介 == 无限基本Laver图案(Infinite Basic Laver Pattern)是由test_alpha0的记号Basic Laver Pattren改造而来。IBLP目前尚不理想，还存在许多的坏图案，test_alpha0规定其极限表达式为(1,0)1(2,1,0)1(3,2,1,0)2(4,3,2)1(5,4,3,2)2(6,5,4)1。尽管如此，IBLP仍然被认为是目前最强的记号。本页面介绍的规则对应[https://hypcos.github.io/notation-explorer/ NE]上的DEN2。 == 定义 == === 定义1 （IBLP…”

SSS 分析

2026-02-21T08:43:40Z

油手就行：修改了一处错误

本条目展示 SSS（单行 [[BSM]]）分析。

=== Part 1 ===
* <math>0=1</math>
* <math>0,0=2</math>
* <math>0,0,0=3</math>
* <math>0,1=\omega</math>
* <math>0,1,0=\omega+1</math>
* <math>0,1,0,0=\omega+2</math>
* <math>0,1,0,0,1=\omega\times2</math>
* <math>0,1,0,0,1,0,0,1=\omega\times3</math>
* <math>0,1,0,1=\omega^2</math>
* <math>0,1,0,1,0,0,1=\omega^2+\omega</math>
* <math>0,1,0,1,0,0,1,0,0,1=\omega^2+\omega\times2</math>
* <math>0,1,0,1,0,0,1,0,1=\omega^2\times2</math>
* <math>0,1,0,1,0,0,1,0,1,0,0,1,0,1=\omega^2\times3</math>
* <math>0,1,0,1,0,1=\omega^3</math>
* <math>0,1,0,1,0,1,0,1=\omega^4</math>
* <math>0,1,1=\omega^\omega</math>
* <math>0,1,1,0,0,1,0,1=\omega^\omega+\omega^2</math>
* <math>0,1,1,0,0,1,1=\omega^\omega\times2</math>
* <math>0,1,1,0,1=\omega^{\omega+1}</math>
* <math>0,1,1,0,1,0,0,1,1,0,1=\omega^{\omega+1}\times2</math>
* <math>0,1,1,0,1,0,1=\omega^{\omega+2}</math>
* <math>0,1,1,0,1,0,1,1=\omega^{\omega\times2}</math>
* <math>0,1,1,0,1,0,1,1,0,1=\omega^{\omega\times2+1}</math>
* <math>0,1,1,0,1,0,1,1,0,1,0,1,1=\omega^{\omega\times3}</math>
* <math>0,1,1,0,1,1=\omega^{\omega^2}</math>
* <math>0,1,1,0,1,1,0,1=\omega^{\omega^2+1}</math>
* <math>0,1,1,0,1,1,0,1,0,1,1,0,1,1=\omega^{\omega^2\times2}</math>
* <math>0,1,1,0,1,1,0,1,1=\omega^{\omega^3}</math>
* <math>0,1,1,1=\omega^{\omega^\omega}</math>
* <math>0,1,1,1,1=\omega^{\omega^{\omega^\omega}}</math>
* <math>0,1,1,2=\psi(0)</math>

=== Part 2 ===
* <math>0,1,1,2,0,0,1=\psi(0)+\omega</math>
* <math>0,1,1,2,0,0,1,0,1=\psi(0)+\omega^2</math>
* <math>0,1,1,2,0,0,1,1=\psi(0)+\omega^\omega</math>
* <math>0,1,1,2,0,0,1,1,2=\psi(0)\times2</math>
* <math>0,1,1,2,0,1=\psi(0)\times\omega</math>
* <math>0,1,1,2,0,1,0,0,1,1,2,0,1=\psi(0)\times\omega\times2</math>
* <math>0,1,1,2,0,1,0,1=\psi(0)\times\omega^2</math>
* <math>0,1,1,2,0,1,0,1,1=\psi(0)\times\omega^\omega</math>
* <math>0,1,1,2,0,1,0,1,1,2=\psi(0)^2</math>
* <math>0,1,1,2,0,1,0,1,1,2,0,1=\psi(0)^2\times\omega</math>
* <math>0,1,1,2,0,1,0,1,1,2,0,1,0,1,1,2=\psi(0)^3</math>
* <math>0,1,1,2,0,1,1=\psi(0)^\omega</math>
* <math>0,1,1,2,0,1,1,0,1,0,1,1,2=\psi(0)^{\omega+1}</math>
* <math>0,1,1,2,0,1,1,0,1,0,1,1,2,0,1,1=\psi(0)^{\omega\times2}</math>
* <math>0,1,1,2,0,1,1,0,1,1=\psi(0)^{\omega^2}</math>
* <math>0,1,1,2,0,1,1,0,1,1,1=\psi(0)^{\omega^\omega}</math>
* <math>0,1,1,2,0,1,1,0,1,1,2=\psi(0)^{\psi(0)}</math>
* <math>0,1,1,2,0,1,1,1=\psi(0)^{\psi(0)^\omega}</math>
* <math>0,1,1,2,0,1,1,2=\psi(1)</math>
* <math>0,1,1,2,0,1,1,2,0,1,1,2=\psi(2)</math>
* <math>0,1,1,2,1=\psi(\omega)</math>
* <math>0,1,1,2,1,0,1=\psi(\omega)\times\omega</math>
* <math>0,1,1,2,1,0,1,0,1,1,2=\psi(\omega)\times\psi(0)</math>
* <math>0,1,1,2,1,0,1,0,1,1,2,0,1,1,2=\psi(\omega)\times\psi(1)</math>
* <math>0,1,1,2,1,0,1,0,1,1,2,1=\psi(\omega)^2</math>
* <math>0,1,1,2,1,0,1,0,1,1,2,1,0,1,0,1,1,2,1=\psi(\omega)^3</math>
* <math>0,1,1,2,1,0,1,1=\psi(\omega)^\omega</math>
* <math>0,1,1,2,1,0,1,1,0,1,1,2=\psi(\omega)^{\psi(\omega)}</math>
* <math>0,1,1,2,1,0,1,1,1=\psi(\omega)^{\psi(\omega)^{\omega}}</math>
* <math>0,1,1,2,1,0,1,1,2=\psi(\omega+1)</math>
* <math>0,1,1,2,1,0,1,1,2,0,1,1,2=\psi(\omega+2)</math>
* <math>0,1,1,2,1,0,1,1,2,0,1,1,2,1=\psi(\omega\times2)</math>
* <math>0,1,1,2,1,0,1,1,2,1=\psi(\omega^2)</math>
* <math>0,1,1,2,1,0,1,1,2,1,0,1,1,2=\psi(\omega^2+1)</math>
* <math>0,1,1,2,1,0,1,1,2,1,0,1,1,2,0,1,1,2,1=\psi(\omega^2+\omega)</math>
* <math>0,1,1,2,1,0,1,1,2,1,0,1,1,2,0,1,1,2,1,0,1,1,2,1=\psi(\omega^2\times2)</math>
* <math>0,1,1,2,1,0,1,1,2,1,0,1,1,2,1=\psi(\omega^3)</math>
* <math>0,1,1,2,1,1=\psi(\omega^\omega)</math>
* <math>0,1,1,2,1,1,1=\psi(\omega^{\omega^\omega})</math>
* <math>0,1,1,2,1,1,2=\psi(\psi(0))</math>
* <math>0,1,1,2,1,1,2,0,1=\psi(\psi(0))\times\omega</math>
* <math>0,1,1,2,1,1,2,0,1,1,2=\psi(\psi(0)+1)</math>
* <math>0,1,1,2,1,1,2,0,1,1,2,0,1,1,2,1,1,2=\psi(\psi(0)\times2)</math>
* <math>0,1,1,2,1,1,2,0,1,1,2,1=\psi(\psi(0)\times\omega)</math>
* <math>0,1,1,2,1,1,2,0,1,1,2,1,1=\psi(\psi(0)^\omega)</math>
* <math>0,1,1,2,1,1,2,0,1,1,2,1,1,2=\psi(\psi(1))</math>
* <math>0,1,1,2,1,1,2,1=\psi(\psi(\omega))</math>
* <math>0,1,1,2,1,1,2,1,0,1,1,2,1,1,2,1=\psi(\psi(\omega^2))</math>
* <math>0,1,1,2,1,1,2,1,1=\psi(\psi(\omega^\omega))</math>
* <math>0,1,1,2,1,1,2,1,1,2=\psi(\psi(\psi(0)))</math>
* <math>0,1,1,2,1,2=\psi(\Omega)</math>

=== Part 3 ===
* <math>0,1,1,2,1,2,0,1,1,2=\psi(\Omega+1)</math>
* <math>0,1,1,2,1,2,0,1,1,2,0,1,1,2,1=\psi(\Omega+\omega)</math>
* <math>0,1,1,2,1,2,0,1,1,2,0,1,1,2,1,1,2=\psi(\Omega+\psi(0))</math>
* <math>0,1,1,2,1,2,0,1,1,2,0,1,1,2,1,1,2,1,1,2=\psi(\Omega+\psi(\psi(0)))</math>
* <math>0,1,1,2,1,2,0,1,1,2,0,1,1,2,1,2=\psi(\Omega+\psi(\Omega))</math>
* <math>0,1,1,2,1,2,0,1,1,2,0,1,1,2,1,2,0,1,1,2=\psi(\Omega+\psi(\Omega)+1)</math>
* <math>0,1,1,2,1,2,0,1,1,2,1=\psi(\Omega+\psi(\Omega)\times\omega)</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,0,1,1,2=\psi(\Omega+\psi(\Omega)\times\omega+1)</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,0,1,1,2,0,1,1,2,1,2,0,1,1,2,1=\psi(\Omega+\psi(\Omega)\times\omega\times2)</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,0,1,1,2,1=\psi(\Omega+\psi(\Omega)\times\omega^2)</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,0,1,1,2,1,1=\psi(\Omega+\psi(\Omega)\times\omega^\omega)</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,0,1,1,2,1,1,2=\psi(\Omega+\psi(\Omega)\times\psi(0))</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,0,1,1,2,1,1,2,1=\psi(\Omega+\psi(\Omega)\times\psi(\omega))</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,0,1,1,2,1,2=\psi(\Omega+\psi(\Omega)^2)</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,1=\psi(\Omega+\psi(\Omega)^\omega)</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,1,2=\psi(\Omega+\psi(\Omega+1))</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,1,2,1=\psi(\Omega+\psi(\Omega+\psi(\Omega)\times\omega))</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,1,2,1,1=\psi(\Omega+\psi(\Omega+\psi(\Omega)^\omega))</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,1,2,1,1,2=\psi(\Omega+\psi(\Omega+\psi(\Omega+1)))</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,2=\psi(\Omega\times2)</math>
* <math>0,1,1,2,1,2,0,1,1,2,1,2,0,1,1,2,1,2=\psi(\Omega\times3)</math>
* <math>0,1,1,2,1,2,1=\psi(\Omega\times\omega)</math>
* <math>0,1,1,2,1,2,1,0,1,1,2,1,2=\psi(\Omega\times\omega+\Omega)</math>
* <math>0,1,1,2,1,2,1,0,1,1,2,1,2,0,1,1,2,1,2,1=\psi(\Omega\times\omega\times2)</math>
* <math>0,1,1,2,1,2,1,0,1,1,2,1,2,1=\psi(\Omega\times\omega^2)</math>
* <math>0,1,1,2,1,2,1,1=\psi(\Omega\times\omega^\omega)</math>
* <math>0,1,1,2,1,2,1,1,2=\psi(\Omega\times\psi(0))</math>
* <math>0,1,1,2,1,2,1,1,2,0,1,1,2,1,2=\psi(\Omega\times\psi(0)+\Omega)</math>
* <math>0,1,1,2,1,2,1,1,2,0,1,1,2,1,2,1=\psi(\Omega\times\psi(0)\times\omega)</math>
* <math>0,1,1,2,1,2,1,1,2,0,1,1,2,1,2,1,0,1,1,2,1,2,1,1=\psi(\Omega\times\psi(0)\times\omega^2)</math>
* <math>0,1,1,2,1,2,1,1,2,0,1,1,2,1,2,1,0,1,1,2,1,2,1,1,2=\psi(\Omega\times\psi(0)^2)</math>
* <math>0,1,1,2,1,2,1,1,2,0,1,1,2,1,2,1,1=\psi(\Omega\times\psi(0)^\omega)</math>
* <math>0,1,1,2,1,2,1,1,2,0,1,1,2,1,2,1,1,2=\psi(\Omega\times\psi(1))</math>
* <math>0,1,1,2,1,2,1,1,2,1=\psi(\Omega\times\psi(\omega))</math>
* <math>0,1,1,2,1,2,1,1,2,1,1=\psi(\Omega\times\psi(\omega^\omega))</math>
* <math>0,1,1,2,1,2,1,1,2,1,1,2=\psi(\Omega\times\psi(\psi(0)))</math>
* <math>0,1,1,2,1,2,1,1,2,1,2=\psi(\Omega\times\psi(\Omega))</math>
* <math>0,1,1,2,1,2,1,1,2,1,2,0,1,1,2,1,2=\psi(\Omega\times\psi(\Omega)+\Omega)</math>
* <math>0,1,1,2,1,2,1,1,2,1,2,0,1,1,2,1,2,1=\psi(\Omega\times\psi(\Omega)\times\omega)</math>
* <math>0,1,1,2,1,2,1,1,2,1,2,0,1,1,2,1,2,1,1,2=\psi(\Omega\times\psi(\Omega+1))</math>
* <math>0,1,1,2,1,2,1,1,2,1,2,0,1,1,2,1,2,1,1,2,1,2=\psi(\Omega\times\psi(\Omega\times2))</math>
* <math>0,1,1,2,1,2,1,1,2,1,2,1=\psi(\Omega\times\psi(\Omega\times\omega))</math>
* <math>0,1,1,2,1,2,1,2=\psi(\Omega^2)</math>
* <math>0,1,1,2,1,2,1,2,0,1,1,2,1,2=\psi(\Omega^2+\Omega)</math>
* <math>0,1,1,2,1,2,1,2,0,1,1,2,1,2,1,2=\psi(\Omega^2\times2)</math>
* <math>0,1,1,2,1,2,1,2,1=\psi(\Omega^2\times\omega)</math>
* <math>0,1,1,2,1,2,1,2,1,1,2=\psi(\Omega^2\times\psi(0))</math>
* <math>0,1,1,2,1,2,1,2,1,1,2,1,2=\psi(\Omega^2\times\psi(\Omega))</math>
* <math>0,1,1,2,1,2,1,2,1,1,2,1,2,1,2=\psi(\Omega^2\times\psi(\Omega^2))</math>
* <math>0,1,1,2,1,2,1,2,1,1,2,1,2,1,2,1,1,2=\psi(\Omega^2\times\psi(\Omega^2\times\psi(0)))</math>
* <math>0,1,1,2,1,2,1,2,1,2=\psi(\Omega^3)</math>
* <math>0,1,1,2,1,2,1,2,1,2,1,2=\psi(\Omega^4)</math>
* <math>0,1,1,2,2=\psi(\Omega^\omega)</math>
* <math>0,1,1,2,2,0,1,1,2=\psi(\Omega^\omega+1)</math>
* <math>0,1,1,2,2,0,1,1,2,1,2=\psi(\Omega^\omega+\Omega^2)</math>
* <math>0,1,1,2,2,0,1,1,2,1,2,1,2=\psi(\Omega^\omega+\Omega^3)</math>
* <math>0,1,1,2,2,0,1,1,2,2=\psi(\Omega^\omega\times2)</math>
* <math>0,1,1,2,2,1=\psi(\Omega^\omega\times\omega)</math>
* <math>0,1,1,2,2,1,1,2=\psi(\Omega^\omega\times\psi(0))</math>
* <math>0,1,1,2,2,1,1,2,1,2=\psi(\Omega^\omega\times\psi(\Omega))</math>
* <math>0,1,1,2,2,1,1,2,1,2,1,2=\psi(\Omega^\omega\times\psi(\Omega^2))</math>
* <math>0,1,1,2,2,1,1,2,1,2,2=\psi(\Omega^\omega\times\psi(\Omega^\omega))</math>
* <math>0,1,1,2,2,1,2=\psi(\Omega^{\omega+1})</math>
* <math>0,1,1,2,2,1,2,1,2=\psi(\Omega^{\omega+2})</math>
* <math>0,1,1,2,2,1,2,1,2,2=\psi(\Omega^{\omega\times2})</math>
* <math>0,1,1,2,2,1,2,2=\psi(\Omega^{\omega^2})</math>
* <math>0,1,1,2,2,2=\psi(\Omega^{\omega^\omega})</math>
* <math>0,1,1,2,2,2,1,2,2=\psi(\Omega^{\omega^{\omega+1}})</math>
* <math>0,1,1,2,2,3=\psi(\Omega^{\psi(0)})</math>
* <math>0,1,1,2,2,3,1,2=\psi(\Omega^{\psi(0)+1})</math>
* <math>0,1,1,2,2,3,1,2,1,2,2,3=\psi(\Omega^{\psi(0)\times2})</math>
* <math>0,1,1,2,2,3,1,2,2=\psi(\Omega^{\psi(0)\times\omega})</math>
* <math>0,1,1,2,2,3,1,2,2,2=\psi(\Omega^{\psi(0)^\omega})</math>
* <math>0,1,1,2,2,3,1,2,2,3=\psi(\Omega^{\psi(1)})</math>
* <math>0,1,1,2,2,3,2=\psi(\Omega^{\psi(\omega)})</math>
* <math>0,1,1,2,2,3,2,2,3=\psi(\Omega^{\psi(\psi(0))})</math>
* <math>0,1,1,2,2,3,2,2,3,2,2,3=\psi(\Omega^{\psi(\psi(\psi(0)))})</math>
* <math>0,1,1,2,2,3,2,3=\psi(\Omega^{\psi(\Omega)})</math>
* <math>0,1,1,2,2,3,2,3,2,3=\psi(\Omega^{\psi(\Omega^2)})</math>
* <math>0,1,1,2,2,3,3=\psi(\Omega^{\psi(\Omega^\omega)})</math>
* <math>0,1,1,2,2,3,3,3=\psi(\Omega^{\psi(\Omega^{\omega^\omega})})</math>
* <math>0,1,1,2,2,3,3,4=\psi(\Omega^{\psi(\Omega^{\psi(0)})})</math>
* <math>0,1,2=\psi(\Omega^\Omega)</math>

=== Part 4 ===
* <math>0,1,2,0,0,1,1=\psi(\Omega^\Omega)+\omega^2</math>
* <math>0,1,2,0,0,1,1,2=\psi(\Omega^\Omega)+\psi(0)</math>
* <math>0,1,2,0,0,1,2=\psi(\Omega^\Omega)\times2</math>
* <math>0,1,2,0,1=\psi(\Omega^\Omega)\times\omega</math>
* <math>0,1,2,0,1,0,1,1,2=\psi(\Omega^\Omega)\times\psi(0)</math>
* <math>0,1,2,0,1,0,1,1,2,2,3=\psi(\Omega^\Omega)\times\psi(\Omega^{\psi(0)})</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3}=\psi(\Omega^\Omega)^2</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3,}0,1,0,1,1,2,3=\psi(\Omega^\Omega)^3</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3,}0,1,1=\psi(\Omega^\Omega)^\omega</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3,}0,1,1,0,1,0,1,1,2,3=\psi(\Omega^\Omega)^{\omega+1}</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3,}0,1,1,0,1,0,1,1,2,3,0,1,1=\psi(\Omega^\Omega)^{\omega\times2}</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3,}0,1,1,0,1,1=\psi(\Omega^\Omega)^{\omega^2}</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3,}0,1,1,0,1,1,2,3=\psi(\Omega^\Omega)^{\psi(\Omega^\Omega)}</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3,}0,1,1,1=\psi(\Omega^\Omega)^{\psi(\Omega^\Omega)^\omega}</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3,}0,1,1,2=\psi(\Omega^\Omega+1)</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,0,1,1,2=\psi(\Omega^\Omega+2)</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,0,1,1,2,1=\psi(\Omega^\Omega+\omega)</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,0,1,1,2,1,1,2=\psi(\Omega^\Omega+\psi(0))</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,0,1,1,2,3=\psi(\Omega^\Omega+\psi(\Omega^\Omega))</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,1=\psi(\Omega^\Omega+\psi(\Omega^\Omega)\times\omega)</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,1,0,1,1,2,3=\psi(\Omega^\Omega+\psi(\Omega^\Omega)^2)</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,1,1=\psi(\Omega^\Omega+\psi(\Omega^\Omega)^\omega)</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,1,1,2=\psi(\Omega^\Omega+\psi(\Omega^\Omega+1))</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,1,1,2,1=\psi(\Omega^\Omega+\psi(\Omega^\Omega+\psi(\Omega^\Omega)\times\omega))</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,1,2=\psi(\Omega^\Omega+\Omega)</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,1,2,0,1,1,2,1,2=\psi(\Omega^\Omega+\Omega\times2)</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,1,2,1=\psi(\Omega^\Omega+\Omega\times\omega)</math>
* <math>0,1,2,\color{green}{0,1,0,1,1,2,3},0,1,1,2,1,2,1,2=\psi(\Omega^\Omega+\Omega^2)</math>
* <math>0,1,2,0,1,0,1,1,2,3,0,1,1,2,3=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)})</math>
* <math>0,1,2,0,1,0,1,1,2,3,0,1,1,2,3,0,1,1,2,3=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times2)</math>
* <math>0,1,2,0,1,0,1,1,2,3,1=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\omega)</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,0,1,1,2,3,0,1,1,2,3,1=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\omega\times2)</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,0,1,1,2,3,1=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\omega^2)</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,1=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\omega^\omega)</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,1,2=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\psi(0))</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,1,2,0,1,1,2,3,0,1,1,2,3,1,1,2=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\psi(0)^2)</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,1,2,0,1,1,2,3,1=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\psi(0)^\omega)</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,1,2,1=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\psi(\omega))</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,1,2,1,2=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\psi(\Omega))</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,1,2,1,2,1,2=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\psi(\Omega^2))</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,1,2,2=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\psi(\Omega^\omega))</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,1,2,3=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\psi(\Omega^\Omega))</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)+1})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)+2})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)\times2})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4,1,2,2=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)\times\omega})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4,1,2,2,1,2,2=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)\times\omega^2})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4,1,2,2,1,2,2,3,4=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)^2})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4,1,2,2,2=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)^\omega})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4,1,2,2,3=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega+1)})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4,1,2,2,3,2,3=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega+\Omega)})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4,1,2,2,3,4=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)})})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4,2=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\omega)})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4,2,2,3=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\psi(0))})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4,2,3=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)+1}})</math>
* <math>0,1,2,0,1,0,1,1,2,3,1,2,1,2,2,3,4,2,3,2,3,3,4,5=\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)\times2})})</math>
* <math>0,1,2,0,1,0,1,2=\psi(\Omega^\Omega\times 2)</math>

=== Part 5 ===
* <math>0,1,2,0,1,0,1,2,0,1=\psi(\Omega^\Omega\times2)\times\omega</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1=\psi(\Omega^\Omega\times2)\times\omega^2</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1=\psi(\Omega^\Omega\times2)\times\omega^\omega</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2=\psi(\Omega^\Omega\times2)\times\psi(0)</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3=\psi(\Omega^\Omega\times2)^2</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3,0,1,1,2=\psi(\Omega^\Omega\times2+1)</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3,0,1,1,2,3,1,2,1,2,3=\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega\times2)})</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3,1=\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega\times2)}\times\omega)</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3,1,2=\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega\times2)+1})</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3,1,2,1,2,2=\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega\times2)+\omega})</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3,1,2,1,2,2,3,4=\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega\times2)\times2})</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3,1,2,1,2,2,3,4,1,2,2=\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega\times2)\times\omega})</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3,1,2,1,2,2,3,4,1,2,2,2=\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega\times2)^\omega})</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3,1,2,1,2,2,3,4,1,2,2,3=\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega\times2+1)})</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3,1,2,1,2,2,3,4,1,2,2,3,4=\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega)})})</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,1,2,3,1,2,1,2,3,1,2,1,2,2,3,4,2,3,2,3,4=\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega\times2+\Omega^{\psi(\Omega^\Omega\times2)})})</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,2=\psi(\Omega^\Omega\times3)</math>
* <math>0,1,2,0,1,0,1,2,0,1,0,1,2,0,1,0,1,2=\psi(\Omega^\Omega\times4)</math>
* <math>0,1,2,0,1,1=\psi(\Omega^\Omega\times\omega)</math>
* <math>0,1,2,0,1,1,0,1,0,1,2=\psi(\Omega^\Omega\times\omega+\Omega^\Omega)</math>
* <math>0,1,2,0,1,1,0,1,0,1,2,0,1,1=\psi(\Omega^\Omega\times\omega\times2)</math>
* <math>0,1,2,0,1,1,0,1,1=\psi(\Omega^\Omega\times\omega^2)</math>
* <math>0,1,2,0,1,1,0,1,1,2=\psi(\Omega^\Omega\times\psi(0))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3=\psi(\Omega^\Omega\times\psi(\Omega^\Omega))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega)\times\omega)</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,0,1,1,2,3,1,2,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega)^2)</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,1=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega)^\omega)</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+1))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,2,0,1,1,2,1=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\omega))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,2,0,1,1,2,3,1,2,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\psi(\Omega^\Omega\times\omega)))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,2,1=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\psi(\Omega^\Omega\times\omega)\times\omega))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,2,1,1,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\psi(\Omega^\Omega\times\omega+1)))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,2,1,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\Omega))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,2,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\Omega^\omega))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,2,3=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\Omega^{\psi(\Omega^\Omega)}))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,2,3,1,2,1,2,3=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\Omega^{\psi(\Omega^\Omega\times2)}))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,0,1,1,2,3,1,2,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\Omega^{\psi(\Omega^\Omega\times\omega)}))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,1=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\Omega^{\psi(\Omega^\Omega\times\omega)}\times\omega))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,1,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\Omega^{\psi(\Omega^\Omega\times\omega)+1}))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,1,2,1,2,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\Omega^{\psi(\Omega^\Omega\times\omega)+\omega}))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,1,2,1,2,3=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega+\Omega^\Omega))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,1,2,1,2,3,1,2,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega\times2))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,1,2,2=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\omega^2))</math>
* <math>0,1,2,0,1,1,0,1,1,2,3,1,2,2,1,2,2,3=\psi(\Omega^\Omega\times\psi(\Omega^\Omega\times\psi(0)))</math>
* <math>0,1,2,0,1,1,0,1,2=\psi(\Omega^{\Omega+1})</math>

=== Part 6 ===
* <math>0,1,2,0,1,1,0,1,2,0,1=\psi(\Omega^{\Omega+1})\times\omega</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,1,2,3=\psi(\Omega^{\Omega+1})\times\psi(\Omega^\Omega)</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,1,2,3,1,2,2,1,2,3=\psi(\Omega^{\Omega+1})^2</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,1,2,3,1,2,2,1,2,3,0,1,1=\psi(\Omega^{\Omega+1})^\omega</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,1,2,3,1,2,2,1,2,3,0,1,1,2=\psi(\Omega^{\Omega+1}+1)</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,1,2,3,1,2,2,1,2,3,0,1,1,2,1,2=\psi(\Omega^{\Omega+1}+\Omega)</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,1,2,3,1,2,2,1,2,3,0,1,1,2,1,2,1,2=\psi(\Omega^{\Omega+1}+\Omega^2)</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,1,2,3,1,2,2,1,2,3,0,1,1,2,3=\psi(\Omega^{\Omega+1}+\Omega^{\psi(\Omega^\Omega)})</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,1,2,3,1,2,2,1,2,3,0,1,1,2,3,1,2,2,1,2,3=\psi(\Omega^{\Omega+1}+\Omega^{\psi(\Omega^{\Omega+1})})</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,1,2,3,1,2,2,1,2,3,1=\psi(\Omega^{\Omega+1}+\Omega^{\psi(\Omega^{\Omega+1})}\times\omega)</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,1,2,3,1,2,2,1,2,3,1,2=\psi(\Omega^{\Omega+1}+\Omega^{\psi(\Omega^{\Omega+1})+1})</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,1,2,3,1,2,2,1,2,3,1,2,2,3,4,2,3,3,2,3,4=\psi(\Omega^{\Omega+1}+\Omega^{\psi(\Omega^{\Omega+1})\times2})</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,2=\psi(\Omega^{\Omega+1}+\Omega^\Omega)</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,2,0,1,0,1,2=\psi(\Omega^{\Omega+1}+\Omega^\Omega\times2)</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,2,0,1,1=\psi(\Omega^{\Omega+1}+\Omega^\Omega\times\omega)</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,0,1,2,0,1,1,0,1,2=\psi(\Omega^{\Omega+1}\times2)</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,1=\psi(\Omega^{\Omega+1}\times\omega)</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,1,0,1,1,2=\psi(\Omega^{\Omega+1}\times\psi(0))</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,1,0,1,1,2,3=\psi(\Omega^{\Omega+1}\times\psi(\Omega^\Omega))</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,1,0,1,1,2,3,1,2,2,1,2,3=\psi(\Omega^{\Omega+1}\times\psi(\Omega^{\Omega+1}))</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,1,0,1,1,2,3,1,2,2,1,2,3,1,2,2=\psi(\Omega^{\Omega+1}\times\psi(\Omega^{\Omega+1}\times\omega))</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,1,0,1,2=\psi(\Omega^{\Omega+2})</math>
* <math>0,1,2,0,1,1,0,1,2,0,1,1,0,1,2,0,1,1,0,1,2=\psi(\Omega^{\Omega+3})</math>
* <math>0,1,2,0,1,1,1=\psi(\Omega^{\Omega+\omega})</math>
* <math>0,1,2,0,1,1,1,0,1,1,0,1,2=\psi(\Omega^{\Omega+\omega+1})</math>
* <math>0,1,2,0,1,1,1,0,1,1,0,1,2,0,1,1,1=\psi(\Omega^{\Omega+\omega\times2})</math>
* <math>0,1,2,0,1,1,1,0,1,1,1=\psi(\Omega^{\Omega+\omega^2})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2=\psi(\Omega^{\Omega+\psi(0)})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,0,1,1,1,0,1,1,2,3,1,2,2,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega})\times2})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,0,1,1,1,1=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega})\times\omega})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,0,1,1,1,1,0,1,1,2,3,1,2,2,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega})^2})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,0,1,1,1,1,1=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega})^\omega})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,0,1,1,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+1)})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,0,1,1,2,1,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega)})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,0,1,1,2,3=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega^{\psi(\Omega^\Omega)})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,0,1,1,2,3,1,2,2,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega^{\psi(\Omega^{\Omega+\omega})})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega^{\psi(\Omega^{\Omega+\omega})}\times\omega)})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,1,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega^{\psi(\Omega^{\Omega+\omega})}\times\psi(0))})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega^{\psi(\Omega^{\Omega+\omega})+1})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,1,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega^{\psi(\Omega^{\Omega+\omega})+2})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,1,2,2,3,4=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega^{\psi(\Omega^{\Omega+\omega})+\psi(\Omega^\Omega)})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,1,2,2,3,4,2,3,3,3=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega^{\psi(\Omega^{\Omega+\omega})\times2})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,1,2,3=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega^\Omega)})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,1,2,3,1,2,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega^\Omega\times\omega)})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,1,2,3,1,2,2,1,2,3=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}+\Omega^{\Omega+1})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,1,2,3,1,2,2,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}\times2)})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega}\times\omega)})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,2,1,2,3=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega+1})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,2,1,2,3,1,2,2,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega\times2})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,2,2=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega\times\omega})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,2,3=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\psi(0)})})</math>
* <math>0,1,2,0,1,1,1,0,1,1,2,3,1,2,2,2,1,2,2,3,4,2,3,3,3=\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\psi(\Omega^{\Omega+\omega})})})</math>
* <math>0,1,2,0,1,1,1,0,1,2=\psi(\Omega^{\Omega\times2})</math>
* <math>0,1,2,0,1,1,1,0,1,2,0,1,0,1,2,0,1,1,1,0,1,2=\psi(\Omega^{\Omega\times2}\times2)</math>
* <math>0,1,2,0,1,1,1,0,1,2,0,1,1=\psi(\Omega^{\Omega\times2}\times\omega)</math>
* <math>0,1,2,0,1,1,1,0,1,2,0,1,1,0,1,2=\psi(\Omega^{\Omega\times2+1})</math>
* <math>0,1,2,0,1,1,1,0,1,2,0,1,1,0,1,2,0,1,1,1=\psi(\Omega^{\Omega\times2+\omega})</math>
* <math>0,1,2,0,1,1,1,0,1,2,0,1,1,0,1,2,0,1,1,1,0,1,1,1=\psi(\Omega^{\Omega\times2+\omega^2})</math>
* <math>0,1,2,0,1,1,1,0,1,2,0,1,1,0,1,2,0,1,1,1,0,1,2=\psi(\Omega^{\Omega\times3})</math>
* <math>0,1,2,0,1,1,1,0,1,2,0,1,1,1=\psi(\Omega^{\Omega\times\omega})</math>
* <math>0,1,2,0,1,1,1,0,1,2,0,1,1,1,0,1,2=\psi(\Omega^{\Omega^2})</math>
* <math>0,1,2,0,1,1,1,0,1,2,0,1,1,1,0,1,2,0,1,1,1=\psi(\Omega^{\Omega^2\times\omega})</math>
* <math>0,1,2,0,1,1,1,0,1,2,0,1,1,1,0,1,2,0,1,1,1,0,1,2=\psi(\Omega^{\Omega^3})</math>
* <math>0,1,2,0,1,1,1,1=\psi(\Omega^{\Omega^\omega})=\mathrm{SVO}</math>
* <math>0,1,2,0,1,1,1,1,0,1,2=\psi(\Omega^{\Omega^\Omega})=\mathrm{LVO}</math>

=== Part 7 ===
* <math>0,1,2,0,1,1,1,1,0,1,2,0,1,1,1=\psi(\Omega^{\Omega^\Omega\times\omega})</math>
* <math>0,1,2,0,1,1,1,1,0,1,2,0,1,1,1,0,1,2=\psi(\Omega^{\Omega^{\Omega+1}})</math>
* <math>0,1,2,0,1,1,1,1,0,1,2,0,1,1,1,0,1,2,0,1,1,1,1=\psi(\Omega^{\Omega^{\Omega+\omega}})</math>
* <math>0,1,2,0,1,1,1,1,0,1,2,0,1,1,1,0,1,2,0,1,1,1,1,0,1,2=\psi(\Omega^{\Omega^{\Omega\times2}})</math>
* <math>0,1,2,0,1,1,1,1,0,1,2,0,1,1,1,1=\psi(\Omega^{\Omega^{\Omega\times\omega}})</math>
* <math>0,1,2,0,1,1,1,1,0,1,2,0,1,1,1,1,0,1,2=\psi(\Omega^{\Omega^{\Omega^2}})</math>
* <math>0,1,2,0,1,1,1,1,1=\psi(\Omega^{\Omega^{\Omega^\omega}})
* <math>0,1,2,0,1,1,2=\psi(\psi_1(0))</math>
* <math>0,1,2,0,1,1,2,0,1,0,1,2=\psi(\psi_1(0)+\Omega^\Omega)</math>
* <math>0,1,2,0,1,1,2,0,1,0,1,2,0,1,0,1,2=\psi(\psi_1(0)+\Omega^\Omega\times2)</math>
* <math>0,1,2,0,1,1,2,0,1,0,1,2,0,1,1=\psi(\psi_1(0)+\Omega^\Omega\times\omega)</math>
* <math>0,1,2,0,1,1,2,0,1,0,1,2,0,1,1,0,1,2=\psi(\psi_1(0)+\Omega^{\Omega+1})</math>
* <math>0,1,2,0,1,1,2,0,1,0,1,2,0,1,1,0,1,2,0,1,0,1,2,0,1,1,0,1,2=\psi(\psi_1(0)+\Omega^{\Omega+1}\times2)</math>
* <math>0,1,2,0,1,1,2,0,1,0,1,2,0,1,1,0,1,2,0,1,1,0,1,2=\psi(\psi_1(0)+\Omega^{\Omega+2})</math>
* <math>0,1,2,0,1,1,2,0,1,0,1,2,0,1,1,1=\psi(\psi_1(0)+\Omega^{\Omega+\omega})</math>
* <math>0,1,2,0,1,1,2,0,1,0,1,2,0,1,1,1,0,1,2=\psi(\psi_1(0)+\Omega^{\Omega\times2})</math>
* <math>0,1,2,0,1,1,2,0,1,0,1,2,0,1,1,2=\psi(\psi_1(0)\times2)</math>
* <math>0,1,2,0,1,1,2,0,1,0,1,2,0,1,1,2,0,1,0,1,2,0,1,1,2=\psi(\psi_1(0)\times3)</math>
* <math>0,1,2,0,1,1,2,0,1,1=\psi(\psi_1(0)\times\omega)</math>
* <math>0,1,2,0,1,1,2,0,1,1,0,1,2=\psi(\psi_1(0)\times\Omega)</math>
* <math>0,1,2,0,1,1,2,0,1,1,0,1,2,0,1,1,1=\psi(\psi_1(0)\times\Omega^\omega)</math>
* <math>0,1,2,0,1,1,2,0,1,1,0,1,2,0,1,1,1,0,1,2=\psi(\psi_1(0)\times\Omega^\Omega)</math>
* <math>0,1,2,0,1,1,2,0,1,1,0,1,2,0,1,1,1,1=\psi(\psi_1(0)\times\Omega^{\Omega^\omega})</math>
* <math>0,1,2,0,1,1,2,0,1,1,0,1,2,0,1,1,2=\psi(\psi_1(0)^2)</math>
* <math>0,1,2,0,1,1,2,0,1,1,0,1,2,0,1,1,2,0,1,1,0,1,2=\psi(\psi_1(0)^2\times\Omega)</math>
* <math>0,1,2,0,1,1,2,0,1,1,0,1,2,0,1,1,2,0,1,1,0,1,2,0,1,1,2=\psi(\psi_1(0)^3)</math>
* <math>0,1,2,0,1,1,2,0,1,1,1=\psi(\psi_1(0)^\omega)</math>
* <math>0,1,2,0,1,1,2,0,1,1,1,0,1,1,0,1,2,0,1,1,2,0,1,1=\psi(\psi_1(0)^{\omega\times2})</math>
* <math>0,1,2,0,1,1,2,0,1,1,1,0,1,1,1=\psi(\psi_1(0)^{\omega^2})</math>
* <math>0,1,2,0,1,1,2,0,1,1,1,0,1,2=\psi(\psi_1(0)^{\Omega})</math>
* <math>0,1,2,0,1,1,2,0,1,1,1,0,1,2,0,1,1,2=\psi(\psi_1(0)^{\psi_1(0)})</math>
* <math>0,1,2,0,1,1,2,0,1,1,1,0,1,2,0,1,1,2,0,1,1,1=\psi(\psi_1(0)^{\psi_1(0)\times\omega})</math>
* <math>0,1,2,0,1,1,2,0,1,1,1,0,1,2,0,1,1,2,0,1,1,1,0,1,2,0,1,1,2=\psi(\psi_1(0)^{\psi_1(0)^2})</math>
* <math>0,1,2,0,1,1,2,0,1,1,1,1=\psi(\psi_1(0)^{\psi_1(0)^\omega})</math>
* <math>0,1,2,0,1,1,2,0,1,1,2=\psi(\psi_1(1))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,0,1,1,2=\psi(\psi_1(2))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,1=\psi(\psi_1(\omega))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3=\psi(\psi_1(\psi(\Omega^\Omega)))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,0,1,1,2=\psi(\psi_1(\psi(\Omega^\Omega)+1))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,0,1,1,2,0,1,1,2,3=\psi(\psi_1(\psi(\Omega^\Omega)\times2))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,0,1,1,2,1=\psi(\psi_1(\psi(\Omega^\Omega)\times\omega))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,0,1,1,2,1,0,1,1,2,1=\psi(\psi_1(\psi(\Omega^\Omega)\times\omega^2))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,0,1,1,2,1,0,1,1,2,3=\psi(\psi_1(\psi(\Omega^\Omega)^2))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,0,1,1,2,1,1=\psi(\psi_1(\psi(\Omega^\Omega)^\omega))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,0,1,1,2,1,1,2=\psi(\psi_1(\psi(\Omega^\Omega+1)))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,0,1,1,2,3=\psi(\psi_1(\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)})))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,1=\psi(\psi_1(\psi(\Omega^\Omega+\Omega^{\psi(\Omega^\Omega)}\times\omega)))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,1,2,1,2,3=\psi(\psi_1(\psi(\Omega^\Omega\times2)))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,1,2,2=\psi(\psi_1(\psi(\Omega^\Omega\times\omega)))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,1,2,2,1,2,3=\psi(\psi_1(\psi(\Omega^{\Omega+1})))</math>
* <math>0,1,2,0,1,1,2,0,1,1,2,3,1,2,2,3=\psi(\psi_1(\psi(\psi_1(0))))</math>
* <math>0,1,2,0,1,1,2,0,1,2=\psi(\psi_1(\Omega))</math>
* <math>0,1,2,0,1,1,2,0,1,2,0,1,1,2=\psi(\psi_1(\Omega+1))</math>
* <math>0,1,2,0,1,1,2,0,1,2,0,1,1,2,0,1,2=\psi(\psi_1(\Omega\times2))</math>
* <math>0,1,2,0,1,1,2,1=\psi(\psi_1(\Omega\times\omega))</math>
* <math>0,1,2,0,1,1,2,1,0,1,1,2,0,1,2=\psi(\psi_1(\Omega\times\omega+\Omega))</math>
* <math>0,1,2,0,1,1,2,1,0,1,1,2,0,1,2,0,1,1,2,1=\psi(\psi_1(\Omega\times\omega\times2))</math>
* <math>0,1,2,0,1,1,2,1,0,1,1,2,1=\psi(\psi_1(\Omega\times\omega^2))</math>
* <math>0,1,2,0,1,1,2,1,0,1,2=\psi(\psi_1(\Omega^2))</math>
* <math>0,1,2,0,1,1,2,1,0,1,2,0,1,1,2,0,1,2=\psi(\psi_1(\Omega^3))</math>
* <math>0,1,2,0,1,1,2,1,1=\psi(\psi_1(\Omega^\omega))</math>
* <math>0,1,2,0,1,1,2,1,1,1=\psi(\psi_1(\Omega^{\Omega^\omega}))</math>
* <math>0,1,2,0,1,1,2,1,1,2=\psi(\psi_1(\psi_1(0)))</math>
* <math>0,1,2,0,1,1,2,1,2=\psi(\Omega_2)</math>
* <math>0,1,2,0,1,1,2,1,2,0,1,1,2,1,2=\psi(\Omega_2\times2)</math>
* <math>0,1,2,0,1,1,2,1,2,0,1,2=\psi(\Omega_2\times\Omega)</math>
* <math>0,1,2,0,1,1,2,1,2,1=\psi(\Omega_2\times\Omega\times\omega)</math>
* <math>0,1,2,0,1,1,2,1,2,1,0,1,2=\psi(\Omega_2\times\Omega^2)</math>
* <math>0,1,2,0,1,1,2,1,2,1,1,2=\psi(\Omega_2\times\psi_1(0))</math>
* <math>0,1,2,0,1,1,2,1,2,1,2=\psi(\Omega_2^2)</math>
* <math>0,1,2,0,1,1,2,2=\psi(\Omega_2^\omega)</math>
* <math>0,1,2,0,1,1,2,2,0,1,1,2,2=\psi(\Omega_2^\omega\times2)</math>
* <math>0,1,2,0,1,1,2,2,0,1,2=\psi(\Omega_2^\omega\times\Omega)</math>
* <math>0,1,2,0,1,1,2,2,1=\psi(\Omega_2^\omega\times\Omega\times\omega)</math>
* <math>0,1,2,0,1,1,2,2,1,1,2=\psi(\Omega_2^\omega\times\psi_1(0))</math>
* <math>0,1,2,0,1,1,2,2,1,1,2,1,2=\psi(\Omega_2^\omega\times\psi_1(\Omega_2))</math>
* <math>0,1,2,0,1,1,2,2,1,1,2,2=\psi(\Omega_2^\omega\times\psi_1(\Omega_2\times\omega))</math>
* <math>0,1,2,0,1,1,2,2,1,2=\psi(\Omega_2^{\omega+1})</math>
* <math>0,1,2,0,1,1,2,2,1,2,1,2,2=\psi(\Omega_2^{\omega\times2})</math>
* <math>0,1,2,0,1,1,2,2,1,2,2=\psi(\Omega_2^{\omega^2})</math>
* <math>0,1,2,0,1,1,2,2,2=\psi(\Omega_2^{\omega^\omega})</math>
* <math>0,1,2,0,1,1,2,2,3=\psi(\Omega_2^{\psi(0)})</math>
* <math>0,1,2,0,1,1,2,3=\psi(\Omega_2^{\psi(\Omega_\Omega)})</math>
* <math>0,1,2,0,1,1,2,3,1,2,2,3=\psi(\Omega_2^{\psi(\psi_1(0))})</math>
* <math>0,1,2,0,1,1,2,3,1,2,2,3,1,2,2,3=\psi(\Omega_2^{\psi(\psi_1(1))})</math>
* <math>0,1,2,0,1,1,2,3,1,2,2,3,2,3=\psi(\Omega_2^{\psi(\Omega_2)})</math>
* <math>0,1,2,0,1,1,2,3,1,2,2,3,3=\psi(\Omega_2^{\psi(\Omega_2^\omega)})</math>
* <math>0,1,2,0,1,1,2,3,1,2,2,3,3,4=\psi(\Omega_2^{\psi(\Omega_2^{\psi(0)})})</math>
* <math>0,1,2,0,1,2=\psi(\Omega_2^\Omega)</math>

=== Part 8 ===
* <math>0,1,2,0,1,2,0,1=\psi(\Omega_2^\Omega)\times\omega</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3=\psi(\Omega_2^\Omega)\times\psi(\Omega^\Omega)</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3=\psi(\Omega_2^\Omega)^2</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,0,1,1,2,3,1,2,3=\psi(\Omega_2^\Omega)^3</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1=\psi(\Omega_2^\Omega)^\omega</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,0,1,1=\psi(\Omega_2^\Omega)^{\omega^2}</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,1=\psi(\Omega_2^\Omega)^{\psi(\Omega_2^\Omega)^\omega}</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,2=\psi(\Omega_2^\Omega+1)</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,2,0,1,1,2,3,1,2,3=\psi(\Omega_2^\Omega+\psi(\Omega_2^\Omega))</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,2,1=\psi(\Omega_2^\Omega+\psi(\Omega_2^\Omega)\times\omega)</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,2,1,1,2=\psi(\Omega_2^\Omega+\psi(\Omega_2^\Omega+1))</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,2,1,2=\psi(\Omega_2^\Omega+\Omega)</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,2,1,2,1,2=\psi(\Omega_2^\Omega+\Omega^2)</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,2,3=\psi(\Omega_2^\Omega+\Omega^{\psi(\Omega^\Omega)})</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,2,3,1,2,3=\psi(\Omega_2^\Omega+\Omega^{\psi(\Omega_2^\Omega)})</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,2,3,1,2,3,0,1,1,2=\psi(\Omega_2^\Omega+\Omega^{\psi(\Omega_2^\Omega)}+1)</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,0,1,1,2,3,1,2,3,0,1,1,2,3,1,2,3=\psi(\Omega_2^\Omega+\Omega^{\psi(\Omega_2^\Omega)}\times2)</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,1=\psi(\Omega_2^\Omega+\Omega^{\psi(\Omega_2^\Omega)}\times\omega)</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,1,1,2=\psi(\Omega_2^\Omega+\Omega^{\psi(\Omega_2^\Omega)}\times\psi(0))</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,1,2=\psi(\Omega_2^\Omega+\Omega^{\psi(\Omega_2^\Omega)+1})</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,1,2,1,2=\psi(\Omega_2^\Omega+\Omega^{\psi(\Omega_2^\Omega)+2})</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,1,2,1,2,2=\psi(\Omega_2^\Omega+\Omega^{\psi(\Omega_2^\Omega)+\omega})</math>
* <math>0,1,2,0,1,2,0,1,0,1,1,2,3,1,2,3,1,2,1,2,2,3,4,2,3,4=\psi(\Omega_2^\Omega+\Omega^{\psi(\Omega_2^\Omega)\times2})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2=\psi(\Omega_2^\Omega+\Omega^\Omega)</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,0,1,2=\psi(\Omega_2^\Omega+\Omega^\Omega\times2)</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1=\psi(\Omega_2^\Omega+\Omega^\Omega\times\omega)</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,0,1,0,1,2=\psi(\Omega_2^\Omega+\Omega^\Omega\times\omega+\Omega^\Omega)</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,0,1,0,1,2=\psi(\Omega_2^\Omega+\Omega^\Omega\times\omega+\Omega^\Omega)</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,0,1,0,1,2,0,1,1=\psi(\Omega_2^\Omega+\Omega^\Omega\times\omega\times2)</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,0,1,1=\psi(\Omega_2^\Omega+\Omega^\Omega\times\omega^2)</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,0,1,1,0,1,1,2,3,1,2,3=\psi(\Omega_2^\Omega+\Omega^\Omega\times\psi(\Omega_2^\Omega))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,0,1,2=\psi(\Omega_2^\Omega+\Omega^{\Omega+1})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,1=\psi(\Omega_2^\Omega+\Omega^{\Omega+\omega})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,1,0,1,2=\psi(\Omega_2^\Omega+\Omega^{\Omega\times2})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,1,0,1,2,0,1,1,0,1,2=\psi(\Omega_2^\Omega+\Omega^{\Omega\times2+1})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,1,0,1,2,0,1,1,0,1,2=\psi(\Omega_2^\Omega+\Omega^{\Omega\times2+1})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,1,0,1,2,0,1,1,0,1,2,0,1,1,1=\psi(\Omega_2^\Omega+\Omega^{\Omega\times2+\omega})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,1,0,1,2,0,1,1,0,1,2,0,1,1,1,0,1,2=\psi(\Omega_2^\Omega+\Omega^{\Omega\times3})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,1,0,1,2,0,1,1,1=\psi(\Omega_2^\Omega+\Omega^{\Omega\times\omega})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,1,0,1,2,0,1,1,1,0,1,2=\psi(\Omega_2^\Omega+\Omega^{\Omega^2})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,1,1=\psi(\Omega_2^\Omega+\Omega^{\Omega^\omega})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,2=\psi(\Omega_2^\Omega+\psi_1(0))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,2,0,1,1,2,1=\psi(\Omega_2^\Omega+\psi_1(\omega))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,2,0,1,1,2,3=\psi(\Omega_2^\Omega+\psi_1(\psi(\Omega^\Omega)))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,2,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,2,1=\psi(\Omega_2^\Omega+\psi_1(\Omega\times\omega))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,2,1,1=\psi(\Omega_2^\Omega+\psi_1(\Omega^\omega))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,2,1,1,2=\psi(\Omega_2^\Omega+\psi_1(\psi_1(0)))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,2,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,2,1,2,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^2))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,1,2,3=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^{\psi(\Omega^\Omega)}))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,2,0,1,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)+\Omega^\Omega)</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,2,0,1,0,1,2,0,1,1,1=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)+\Omega^{\Omega+\omega})</math>
* <math>0,1,2,0,1,2,0,1,0,1,2,0,1,2,0,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times2)</math>
* <math>0,1,2,0,1,2,0,1,1=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\omega)</math>
* <math>0,1,2,0,1,2,0,1,1,0,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\omega+\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,0,1,2,0,1,1,0,1,0,1,2,0,1,2,0,1,1=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\omega\times2)</math>
* <math>0,1,2,0,1,2,0,1,1,0,1,1=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\omega^2)</math>
* <math>0,1,2,0,1,2,0,1,1,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\Omega)</math>
* <math>0,1,2,0,1,2,0,1,1,0,1,2,0,1,1,1=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\Omega^\omega)</math>
* <math>0,1,2,0,1,2,0,1,1,0,1,2,0,1,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\psi_1(0))</math>
* <math>0,1,2,0,1,2,0,1,1,0,1,2,0,1,1,2,0,1,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\psi_1(1))</math>
* <math>0,1,2,0,1,2,0,1,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)^2)</math>

=== Part 9 ===
* <math>0,1,2,0,1,2,0,1,1,1=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)^\omega)</math>
* <math>0,1,2,0,1,2,0,1,1,1,0,1,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)^{\omega\times2})</math>
* <math>0,1,2,0,1,2,0,1,1,1,0,1,1,1=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)^{\omega^2})</math>
* <math>0,1,2,0,1,2,0,1,1,1,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)^{\Omega})</math>
* <math>0,1,2,0,1,2,0,1,1,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)^{\psi_1(\Omega_2^\Omega)})</math>
* <math>0,1,2,0,1,2,0,1,1,1,1=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)^{\psi_1(\Omega_2^\Omega)^\omega})</math>
* <math>0,1,2,0,1,2,0,1,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+1))</math>
* <math>0,1,2,0,1,2,0,1,1,2,0,1,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+2))</math>
* <math>0,1,2,0,1,2,0,1,1,2,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+\Omega))</math>
* <math>0,1,2,0,1,2,0,1,1,2,0,1,2,0,1,1,2,1=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+\Omega\times\omega))</math>
* <math>0,1,2,0,1,2,0,1,1,2,0,1,2,0,1,1,2,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2)))</math>
* <math>0,1,2,0,1,2,0,1,1,2,0,1,2,0,1,1,2,3=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^{\psi(\Omega^\Omega)})))</math>
* <math>0,1,2,0,1,2,0,1,1,2,0,1,2,0,1,1,2,3,1,2,3=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^{\psi(\Omega_2^\Omega)})))</math>
* <math>0,1,2,0,1,2,0,1,1,2,0,1,2,0,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)))</math>
* <math>0,1,2,0,1,2,0,1,1,2,0,1,2,0,1,2,0,1,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)+1))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\omega))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,1,2=\psi(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+1)))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2=\psi(\Omega_2^\Omega+\Omega_2)</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,0,1,2=\psi(\Omega_2^\Omega+\Omega_2+\Omega^\Omega)</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega+\Omega_2+\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,2=\psi(\Omega_2^\Omega+\Omega_2+\psi_1(\Omega_2^\Omega+1))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,2,1,2=\psi(\Omega_2^\Omega+\Omega_2+\psi_1(\Omega_2^\Omega+\Omega_2))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,1=\psi(\Omega_2^\Omega+\Omega_2+\psi_1(\Omega_2^\Omega+\Omega_2)\times\omega)</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,1,2=\psi(\Omega_2^\Omega+\Omega_2+\psi_1(\Omega_2^\Omega+\Omega_2+1))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,1,2,1,2=\psi(\Omega_2^\Omega+\Omega_2\times2)</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,2=\psi(\Omega_2^\Omega+\Omega_2\times\Omega)</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,2,0,1,1,2,1,2,0,1,2=\psi(\Omega_2^\Omega+\Omega_2\times\Omega\times2)</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,2,0,1,1,2,1,2,1=\psi(\Omega_2^\Omega+\Omega_2\times\Omega\times\omega)</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,2,0,1,1,2,1,2,1,1,2=\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(0))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,2,0,1,1,2,1,2,1,1,2,1,2,0,1,1,2,1,2,1,1,2,1,2=\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2\times2))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,2,0,1,1,2,1,2,1,1,2,1,2,0,1,2=\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2\times\Omega))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,2,0,1,1,2,1,2,1,1,2,1,2,1=\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2\times\Omega\times\omega))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,2,0,1,1,2,1,2,1,2=\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2^2))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,2,0,1,1,2,2=\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2^\omega))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,0,1,2,0,1,2=\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,1,1,2=\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2^\Omega+1))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,1,1,2,1,2=\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2^\Omega+\Omega_2))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,1,1,2,1,2,0,1,2=\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2^\Omega+\Omega_2\times\Omega))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,1,1,2,1,2,0,1,2,0,1,2=\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2^\Omega)))</math>
* <math>0,1,2,0,1,2,0,1,1,2,1,2,1,2=\psi(\Omega_2^\Omega+\Omega_2^2)</math>
* <math>0,1,2,0,1,2,0,1,1,2,2=\psi(\Omega_2^\Omega+\Omega_2^\omega)</math>
* <math>0,1,2,0,1,2,0,1,1,2,3,1,2,3=\psi(\Omega_2^\Omega+\Omega_2^{\psi(\Omega_2^\Omega)})</math>
* <math>0,1,2,0,1,2,0,1,2=\psi(\Omega_2^\Omega\times2)</math>
* <math>0,1,2,0,1,2,0,1,2,0,1,2=\psi(\Omega_2^\Omega\times3)</math>
* <math>0,1,2,1=\psi(\Omega_2^\Omega\times\omega)</math>

=== Part 10 ===
* <math>0,1,2,1,0,1,1,2=\psi(\Omega_2^\Omega\times\omega+\psi_1(\Omega_2^\Omega+1))</math>
* <math>0,1,2,1,0,1,1,2,1,2=\psi(\Omega_2^\Omega\times\omega+\Omega_2)</math>
* <math>0,1,2,1,0,1,1,2,1,2,1,2=\psi(\Omega_2^\Omega\times\omega+\Omega_2^2)</math>
* <math>0,1,2,1,0,1,1,2,1,2,1,2=\psi(\Omega_2^\Omega\times\omega+\Omega_2^2)</math>
* <math>0,1,2,1,0,1,1,2,2=\psi(\Omega_2^\Omega\times\omega+\Omega_2^\omega)</math>
* <math>0,1,2,1,0,1,1,2,3=\psi(\Omega_2^\Omega\times\omega+\Omega_2^{\psi(\Omega^\Omega)})</math>
* <math>0,1,2,1,0,1,1,2,3,2=\psi(\Omega_2^\Omega\times\omega+\Omega_2^{\psi(\Omega_2^\Omega\times\omega)})</math>
* <math>0,1,2,1,0,1,2=\psi(\Omega_2^\Omega\times\omega+\Omega_2^\Omega)</math>
* <math>0,1,2,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega\times\omega+\Omega_2^\Omega\times2)</math>
* <math>0,1,2,1,0,1,2,0,1,2,1=\psi(\Omega_2^\Omega\times\omega\times2)</math>
* <math>0,1,2,1,0,1,2,1=\psi(\Omega_2^\Omega\times\omega^2)</math>
* <math>0,1,2,1,1=\psi(\Omega_2^\Omega\times\omega^\omega)</math>
* <math>0,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi(0))</math>
* <math>0,1,2,1,1,2,=\psi(\Omega_2^\Omega\times\psi(0))</math>
* <math>0,1,2,1,1,2,0,1,2,0,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi(0)\times2)</math>
* <math>0,1,2,1,1,2,0,1,2,1=\psi(\Omega_2^\Omega\times\psi(0)\times\omega)</math>
* <math>0,1,2,1,1,2,0,1,2,1,0,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi(0)^2)</math>
* <math>0,1,2,1,1,2,0,1,2,1,1=\psi(\Omega_2^\Omega\times\psi(0)^\omega)</math>
* <math>0,1,2,1,1,2,1=\psi(\Omega_2^\Omega\times\psi(\omega))</math>
* <math>0,1,2,1,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi(\psi(0)))</math>
* <math>0,1,2,1,1,2,1,2=\psi(\Omega_2^\Omega\times\psi(\Omega))</math>
* <math>0,1,2,1,1,2,1,2,1,1,2,1,2=\psi(\Omega_2^\Omega\times\psi(\Omega\times\psi(\Omega)))</math>
* <math>0,1,2,1,1,2,1,2,1,2=\psi(\Omega_2^\Omega\times\psi(\Omega^2))</math>
* <math>0,1,2,1,1,2,2=\psi(\Omega_2^\Omega\times\psi(\Omega^\omega))</math>
* <math>0,1,2,1,1,2,3=\psi(\Omega_2^\Omega\times\psi(\Omega^\Omega))</math>
* <math>0,1,2,1,1,2,3,1,2,3=\psi(\Omega_2^\Omega\times\psi(\Omega_2^\Omega))</math>
* <math>0,1,2,1,1,2,3,2=\psi(\Omega_2^\Omega\times\psi(\Omega_2^\Omega\times\omega))</math>
* <math>0,1,2,1,1,2,3,2,1,2,3,2=\psi(\Omega_2^\Omega\times\psi(\Omega_2^\Omega\times\omega^2))</math>
* <math>0,1,2,1,1,2,3,2,2=\psi(\Omega_2^\Omega\times\psi(\Omega_2^\Omega\times\omega^\omega))</math>
* <math>0,1,2,1,1,2,3,2,2,3=\psi(\Omega_2^\Omega\times\psi(\Omega_2^\Omega\times\psi(0)))</math>
* <math>0,1,2,1,1,2,3,2,2,3,4,3=\psi(\Omega_2^\Omega\times\psi(\Omega_2^\Omega\times\psi(\Omega_2^\Omega)))</math>
* <math>0,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega)</math>

=== Part 11 ===
* <math>0,1,2,1,2,0,1=\psi(\Omega_2^\Omega\times\Omega)\times\omega</math>
* <math>0,1,2,1,2,0,1,0,1,1,2=\psi(\Omega_2^\Omega\times\Omega)\times\psi(0)</math>
* <math>0,1,2,1,2,0,1,0,1,1,2,3,2,3=\psi(\Omega_2^\Omega\times\Omega)^2</math>
* <math>0,1,2,1,2,0,1,0,1,1,2,3,2,3,0,1,1,2=\psi(\Omega_2^\Omega\times\Omega+1)</math>
* <math>0,1,2,1,2,0,1,0,1,1,2,3,2,3,0,1,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega+\Omega)</math>
* <math>0,1,2,1,2,0,1,0,1,1,2,3,2,3,0,1,1,2,2=\psi(\Omega_2^\Omega\times\Omega+\Omega^\omega)</math>
* <math>0,1,2,1,2,0,1,0,1,1,2,3,2,3,0,1,1,2,3,2,3=\psi(\Omega_2^\Omega\times\Omega+\Omega^{\psi(\Omega_2^\Omega\times\Omega)})</math>
* <math>0,1,2,1,2,0,1,0,1,1,2,3,2,3,1=\psi(\Omega_2^\Omega\times\Omega+\Omega^{\psi(\Omega_2^\Omega\times\Omega)}\times\omega)</math>
* <math>0,1,2,1,2,0,1,0,1,1,2,3,2,3,1,1,2=\psi(\Omega_2^\Omega\times\Omega+\Omega^{\psi(\Omega_2^\Omega\times\Omega)}\times\psi(0))</math>
* <math>0,1,2,1,2,0,1,0,1,1,2,3,2,3,1,2=\psi(\Omega_2^\Omega\times\Omega+\Omega^{\psi(\Omega_2^\Omega\times\Omega)+1})</math>
* <math>0,1,2,1,2,0,1,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\Omega^\Omega)</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\Omega^\Omega\times2)</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1=\psi(\Omega_2^\Omega\times\Omega+\Omega^\Omega\times\omega)</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1,0,1,1=\psi(\Omega_2^\Omega\times\Omega+\Omega^\Omega\times\omega^2)</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\Omega^{\Omega+1})</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1,1=\psi(\Omega_2^\Omega\times\Omega+\Omega^{\Omega+\omega})</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1,1,1=\psi(\Omega_2^\Omega\times\Omega+\Omega^{\Omega^\omega})</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(0))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1,2,0,1,1,2,1=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\omega))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1,2,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1,2,1=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega\times\omega))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1,2,1,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\psi_1(0)))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,1,2,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^2))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega)\times2)</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega)\times\omega)</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,0,1,1,2,3,2,3=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega)\times\psi(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega)\times\Omega)</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,0,1,2,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega)^2)</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,1=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega)^\omega)</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega+1))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,2,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega+\Omega))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,2,0,1,2,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,2,1=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\omega))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega+\Omega_2))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,2,1,2,1,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega+\Omega_2\times2))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,1,2,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega+\Omega_2^2))</math>
* <math>0,1,2,1,2,0,1,0,1,2,0,1,2,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega\times2))</math>
* <math>0,1,2,1,2,0,1,0,1,2,1=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega\times\omega))</math>
* <math>0,1,2,1,2,0,1,0,1,2,1,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega\times\psi(0)))</math>
* <math>0,1,2,1,2,0,1,0,1,2,1,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega\times\psi(\Omega)))</math>
* <math>0,1,2,1,2,0,1,0,1,2,1,1,2,3,1,2,3=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega\times\psi(\Omega_2^\Omega)))</math>
* <math>0,1,2,1,2,0,1,0,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega\times\Omega))</math>

=== Part 12 ===
* <math>0,1,2,1,2,0,1,1=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega)\times\omega)</math>
* <math>0,1,2,1,2,0,1,1,2=\psi(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega+1))</math>
* <math>0,1,2,1,2,0,1,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega+\Omega_2)</math>
* <math>0,1,2,1,2,0,1,2=\psi(\Omega_2^\Omega\times\Omega+\Omega_2^\Omega)</math>
* <math>0,1,2,1,2,0,1,2,0,1,2,1=\psi(\Omega_2^\Omega\times\Omega+\Omega_2^\Omega\times\omega)</math>
* <math>0,1,2,1,2,0,1,2,0,1,2,1,1,2=\psi(\Omega_2^\Omega\times\Omega+\Omega_2^\Omega\times\psi(0))</math>
* <math>0,1,2,1,2,0,1,2,0,1,2,1,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega+\Omega_2^\Omega\times\psi(\Omega))</math>
* <math>0,1,2,1,2,0,1,2,0,1,2,1,1,2,3,2,3=\psi(\Omega_2^\Omega\times\Omega+\Omega_2^\Omega\times\psi(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,1,2,0,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega\times 2)</math>
* <math>0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega\times3)</math>
* <math>0,1,2,1,2,0,1,2,1=\psi(\Omega_2^\Omega\times\Omega\times\omega)</math>
* <math>0,1,2,1,2,0,1,2,1,0,1,2,1=\psi(\Omega_2^\Omega\times\Omega\times\omega^2)</math>
* <math>0,1,2,1,2,0,1,2,1,0,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega^2)</math>
* <math>0,1,2,1,2,0,1,2,1,1=\psi(\Omega_2^\Omega\times\Omega^\omega)</math>
* <math>0,1,2,1,2,0,1,2,1,1,0,1,2,1,2=\psi(\Omega_2^\Omega\times\Omega^\Omega)</math>
* <math>0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi_1(0))</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,0,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(0)+\Omega_2^\Omega\times\Omega)</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,0,1,2,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi_1(0)\times2)</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,0,1,2,1=\psi(\Omega_2^\Omega\times\psi_1(0)\times\omega)</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,0,1,2,1,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(0)\times\Omega)</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,0,1,2,1,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi_1(0)^2)</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,0,1,2,1,1=\psi(\Omega_2^\Omega\times\psi_1(0)^\omega)</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,0,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi_1(1))</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega))</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega\times\omega))</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,1,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega^\omega))</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2))</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^2))</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\omega))</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,3=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^{\psi(\Omega^\Omega)}))</math>
* <math>0,1,2,1,2,0,1,2,1,1,2,3,2,3=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^{\psi(\Omega_2^\Omega\times\Omega)}))</math>
* <math>0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega}\times\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega+1))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,1,2,0,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega+\Omega))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega\times\Omega)))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,1,2,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega+\psi_1(\Omega_2^\Omega\times\Omega)\times\omega))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega+\Omega_2))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega+\Omega_2^\Omega))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,2,0,1,2,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega+\Omega_2^\Omega\times\omega))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega\times2))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,2,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega\times\omega))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,2,1,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega^2))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(0)))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,2,1,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2)))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega))\times\omega)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+1))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega)))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,1,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega))))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,1,2,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega))\times\omega))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+1)))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,1,2,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2\times2)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times2)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times\Omega)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times\Omega\times2)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times\Omega\times\omega)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times\Omega^2)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,1,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times\Omega^\omega)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times2)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times\omega)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times\Omega)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)^2)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,1,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)^\omega)</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+1))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+\Omega_2))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+\Omega_2^2))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times2))</math>
* <math>0,1,2,1,2,0,1,2,1,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times3))</math>
* <math>0,1,2,1,2,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\omega))</math>
* <math>0,1,2,1,2,1,1=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\omega^2))</math>
* <math>0,1,2,1,2,1,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\psi(0)))</math>
* <math>0,1,2,1,2,1,2=\psi(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,1,2,2=\psi(\Omega_2^{\Omega+1})</math>

=== Part 13 ===
* <math>0,1,2,1,2,2,1,2=\psi(\Omega_2^{\Omega+1}\times\Omega)</math>
* <math>0,1,2,1,2,2,1,2,0,1,2,1,2,2,1,2=\psi(\Omega_2^{\Omega+1}\times\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,1,2,2,1,2,1=\psi(\Omega_2^{\Omega+1}\times\psi_1(\Omega_2^{\Omega+1}\times\omega))</math>
* <math>0,1,2,1,2,2,1,2,1,2=\psi(\Omega_2^{\Omega+1}\times\psi_1(\Omega_2^{\Omega+1}\times\Omega))</math>
* <math>0,1,2,1,2,2,1,2,1,2,2=\psi(\Omega_2^{\Omega+2})</math>
* <math>0,1,2,1,2,2,1,2,1,2,2,1,2,1,2,2=\psi(\Omega_2^{\Omega+3})</math>
* <math>0,1,2,1,2,2,1,2,2=\psi(\Omega_2^{\Omega+\omega})</math>
* <math>0,1,2,1,2,2,1,2,2,1,2,1,2,2,1,2,2=\psi(\Omega_2^{\Omega+\omega\times2})</math>
* <math>0,1,2,1,2,2,1,2,2,1,2,2=\psi(\Omega_2^{\Omega+\omega^2})</math>
* <math>0,1,2,1,2,2,2=\psi(\Omega_2^{\Omega+\omega^\omega})</math>
* <math>0,1,2,1,2,2,3=\psi(\Omega_2^{\Omega+\psi(0)})</math>
* <math>0,1,2,1,2,2,3,4,2,3,4=\psi(\Omega_2^{\Omega+\psi(\Omega_2)})</math>
* <math>0,1,2,1,2,2,3,4,2,3,4,2,3,4=\psi(\Omega_2^{\Omega+\psi(\Omega_2^\Omega)})</math>
* <math>0,1,2,1,2,2,3,4,2,3,4,3,4=\psi(\Omega_2^{\Omega+\psi(\Omega_2^\Omega\times\Omega)})</math>
* <math>0,1,2,1,2,3=\psi(\Omega_2^{\Omega\times2})</math>
* <math>0,1,2,1,2,3,0,1,0,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega^\Omega)</math>
* <math>0,1,2,1,2,3,0,1,0,1,2,0,1,2=\psi(\Omega_2^{\Omega\times2}+\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,1,2,3,0,1,0,1,2,1=\psi(\Omega_2^{\Omega\times2}+\psi_1(\Omega_2^\Omega\times\omega))</math>
* <math>0,1,2,1,2,3,0,1,0,1,2,1,2=\psi(\Omega_2^{\Omega\times2}+\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,1,2,3,0,1,0,1,2,1,2,1,2=\psi(\Omega_2^{\Omega\times2}+\psi_1(\Omega_2^{\Omega+2}))</math>
* <math>0,1,2,1,2,3,0,1,0,1,2,1,2,2=\psi(\Omega_2^{\Omega\times2}+\psi_1(\Omega_2^{\Omega+\omega}))</math>
* <math>0,1,2,1,2,3,0,1,0,1,2,1,2,3=\psi(\Omega_2^{\Omega\times2}+\psi_1(\Omega_2^{\Omega\times2}))</math>
* <math>0,1,2,1,2,3,0,1,1=\psi(\Omega_2^{\Omega\times2}+\psi_1(\Omega_2^{\Omega\times2})\times\omega)</math>
* <math>0,1,2,1,2,3,0,1,1,2=\psi(\Omega_2^{\Omega\times2}+\psi_1(\Omega_2^{\Omega\times2}+1))</math>
* <math>0,1,2,1,2,3,0,1,1,2,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2)</math>
* <math>0,1,2,1,2,3,0,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega)</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times2)</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\omega)</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\Omega)</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2,0,1,2,1=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\Omega\times\omega)</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\Omega^2)</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2,0,1,2,1,1=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\Omega^\omega)</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(0))</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2,1=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\omega))</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2,1,2,1=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\omega)))</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2,3=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega\times2}))</math>
* <math>0,1,2,1,2,3,0,1,2,0,1,2,1,2,3,0,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega\times2})+\Omega^\Omega)</math>
* <math>0,1,2,1,2,3,0,1,2,1=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega\times2})\times\omega)</math>
* <math>0,1,2,1,2,3,0,1,2,1,0,1,2,1,2,3=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega\times2})^2)</math>
* <math>0,1,2,1,2,3,0,1,2,1,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega\times2}+1))</math>
* <math>0,1,2,1,2,3,0,1,2,1,1,2,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega\times2}+\Omega_2))</math>
* <math>0,1,2,1,2,3,0,1,2,1,1,2,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega\times2}+\Omega_2^\omega))</math>
* <math>0,1,2,1,2,3,0,1,2,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega\times2}+\Omega_2^\Omega))</math>
* <math>0,1,2,1,2,3,0,1,2,1,2,1,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega\times2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega\times2}+\Omega_2^\Omega)))</math>
* <math>0,1,2,1,2,3,0,1,2,1,2,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^{\Omega+1})</math>
* <math>0,1,2,1,2,3,0,1,2,1,2,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^{\Omega+1})</math>
* <math>0,1,2,1,2,3,0,1,2,1,2,2,0,1,2,1,2,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^{\Omega+1}\times2)</math>
* <math>0,1,2,1,2,3,0,1,2,1,2,2,1,2,1,2,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^{\Omega+2})</math>
* <math>0,1,2,1,2,3,0,1,2,1,2,2,1,2,2=\psi(\Omega_2^{\Omega\times2}+\Omega_2^{\Omega+\omega})</math>
* <math>0,1,2,1,2,3,0,1,2,1,2,3=\psi(\Omega_2^{\Omega\times2}\times2)</math>

=== Part 14 ===
* <math>0,1,2,1,2,3,1=\psi(\Omega_2^{\Omega\times2}\times\omega)</math>
* <math>0,1,2,1,2,3,1,2=\psi(\Omega_2^{\Omega\times2}\times\Omega)</math>
* <math>0,1,2,1,2,3,1,2,0,1,2,1,2,3,1,2=\psi(\Omega_2^{\Omega\times2}\times\psi_1(\Omega_2^{\Omega\times2}))</math>
* <math>0,1,2,1,2,3,1,2,1,2=\psi(\Omega_2^{\Omega\times2}\times\psi_1(\Omega_2^{\Omega\times2}\times\Omega))</math>
* <math>0,1,2,1,2,3,1,2,1,2,2=\psi(\Omega_2^{\Omega\times2+1})</math>
* <math>0,1,2,1,2,3,1,2,1,2,3=\psi(\Omega_2^{\Omega\times3})</math>
* <math>0,1,2,1,2,3,1,2,2=\psi(\Omega_2^{\Omega\times\omega})</math>
* <math>0,1,2,1,2,3,1,2,2,1,2,2,3=\psi(\Omega_2^{\Omega\times\psi(0)})</math>
* <math>0,1,2,1,2,3,1,2,2,1,2,3=\psi(\Omega_2^{\Omega^2})</math>
* <math>0,1,2,1,2,3,1,2,2,3=\psi(\Omega_2^{\psi_1(0)})</math>
* <math>0,1,2,1,2,3,1,2,2,3,2,3=\psi(\Omega_2^{\psi_1(\Omega_2)})</math>
* <math>0,1,2,1,2,3,1,2,3=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega)})</math>
* <math>0,1,2,1,2,3,1,2,3,1,2,1,2,2=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega)+1})</math>
* <math>0,1,2,1,2,3,1,2,3,1,2,1,2,3=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega)+\Omega})</math>
* <math>0,1,2,1,2,3,1,2,3,1,2,1,2,3,1,2,2,3=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega)+\psi_1(0)})</math>
* <math>0,1,2,1,2,3,1,2,3,1,2,1,2,3,1,2,3=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega)\times2})</math>
* <math>0,1,2,1,2,3,1,2,3,1,2,2=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega)\times\omega})</math>
* <math>0,1,2,1,2,3,1,2,3,1,2,2,3=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega+1)})</math>
* <math>0,1,2,1,2,3,1,2,3,1,2,2,3,1,2,3,1,2,3=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega))})</math>
* <math>0,1,2,1,2,3,1,2,3,1,2,2,3,2,3=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega+\Omega_2)})</math>
* <math>0,1,2,1,2,3,1,2,3,1,2,3=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega\times2)})</math>
* <math>0,1,2,1,2,3,2=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega\times\omega)})</math>
* <math>0,1,2,1,2,3,2,3=\psi(\Omega_2^{\psi_1(\Omega_2^\Omega\times\Omega)})</math>
* <math>0,1,2,1,2,3,2,3,2,3,3=\psi(\Omega_2^{\psi_1(\Omega_2^{\Omega+1})})</math>
* <math>0,1,2,1,2,3,2,3,4=\psi(\Omega_2^{\psi_1(\Omega_2^{\Omega\times2})})</math>
* <math>0,1,2,1,2,3,2,3,4,2,3,4=\psi(\Omega_2^{\psi_1(\Omega_2^{\psi_1(\Omega_2^\Omega)})})</math>
* <math>0,1,2,2=\psi(\Omega_2^{\Omega_2})</math>
* <math>0,1,2,2,0,1=\psi(\Omega_2^{\Omega_2})\times\omega</math>
* <math>0,1,2,2,0,1,0,1,1,2,3,3=\psi(\Omega_2^{\Omega_2})^2</math>
* <math>0,1,2,2,0,1,0,1,1,2,3,3,0,1,1=\psi(\Omega_2^{\Omega_2})^\omega</math>
* <math>0,1,2,2,0,1,0,1,1,2,3,3,0,1,1,2=\psi(\Omega_2^{\Omega_2}+1)</math>
* <math>0,1,2,2,0,1,0,1,1,2,3,3,0,1,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi(\Omega_2^{\Omega_2}+1))</math>
* <math>0,1,2,2,0,1,0,1,1,2,3,3,0,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\Omega)</math>
* <math>0,1,2,2,0,1,0,1,1,2,3,3,0,1,1,2,2=\psi(\Omega_2^{\Omega_2}+\Omega)</math>
* <math>0,1,2,2,0,1,0,1,1,2,3,3,0,1,1,2,2=\psi(\Omega_2^{\Omega_2}+\Omega^\omega)</math>
* <math>0,1,2,2,0,1,0,1,1,2,3,3,0,1,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\Omega^{\psi(\Omega_2^{\Omega_2})})</math>
* <math>0,1,2,2,0,1,0,1,1,2,3,3,0,1,1,2,3,3,0,1,1,2=\psi(\Omega_2^{\Omega_2}+\Omega^{\psi(\Omega_2^{\Omega_2})}+1)</math>
* <math>0,1,2,2,0,1,0,1,1,2,3,3,1=\psi(\Omega_2^{\Omega_2}+\Omega^{\psi(\Omega_2^{\Omega_2})}\times\omega)</math>
* <math>0,1,2,2,0,1,0,1,1,2,3,3,1,2=\psi(\Omega_2^{\Omega_2}+\Omega^{\psi(\Omega_2^{\Omega_2})+1})</math>
* <math>0,1,2,2,0,1,0,1,2=\psi(\Omega_2^{\Omega_2}+\Omega^{\Omega})</math>
* <math>0,1,2,2,0,1,0,1,2,0,1,0,1,2=\psi(\Omega_2^{\Omega_2}+\Omega^\Omega\times2)</math>
* <math>0,1,2,2,0,1,0,1,2,0,1,1=\psi(\Omega_2^{\Omega_2}+\Omega^\Omega\times\omega)</math>
* <math>0,1,2,2,0,1,0,1,2,0,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(0))</math>
* <math>0,1,2,2,0,1,0,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,0,1,2,0,1,2,0,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega)\times\omega)</math>
* <math>0,1,2,2,0,1,0,1,2,0,1,2,0,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega+1))</math>
* <math>0,1,2,2,0,1,0,1,2,0,1,2,0,1,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega+\Omega))</math>
* <math>0,1,2,2,0,1,0,1,2,0,1,2,0,1,1,2,0,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)))</math>
* <math>0,1,2,2,0,1,0,1,2,0,1,2,0,1,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\omega))</math>
* <math>0,1,2,2,0,1,0,1,2,0,1,2,0,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega+\Omega_2))</math>
* <math>0,1,2,2,0,1,0,1,2,0,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times2))</math>
* <math>0,1,2,2,0,1,0,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi(0)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi(\Omega)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\Omega)\times\omega)</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\Omega+1))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\Omega+\Omega_2))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\Omega+\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\Omega+\Omega_2^\Omega\times2))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\Omega\times\omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\Omega^2))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(0)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+1))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times2))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times\Omega\times\omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times\Omega^2))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times\psi_1(0)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times\psi_1(\Omega_2)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times2))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times\omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times\omega+\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times\Omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2,0,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times\Omega\times\omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2,0,1,2,1,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times\Omega^2))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2,0,1,2,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times\Omega^\omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times\psi_1(0)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2,0,1,2,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times\psi_1(\Omega_2)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)^2))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)^\omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+1)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+\Omega)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2,0,1,2,1,2,0,1,2,1,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+\psi_1(0))))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega))))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)\times\omega)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2,1,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)^2)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega)^\omega)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+\psi_1(\Omega_2^\Omega+1))))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+\Omega_2^2)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times2)))</math>

=== Part 15 ===
* <math>0,1,2,2,0,1,0,1,2,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\omega)))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\Omega))))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,2,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega+2}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,2,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega+\omega}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega+\omega^\omega}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,2,3=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega+\psi(0)}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,3=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega\times2}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,3,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega\times2}\times\Omega))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,3,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega\times2+1}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,3,1,2,1,2,3=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega\times3}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,3,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega\times\omega}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,3,1,2,2,3=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\psi_1(0)}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,3,1,2,3=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\psi_1(\Omega_2^\Omega)}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,3,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\psi_1(\Omega_2^\Omega\times\omega)}))</math>
* <math>0,1,2,2,0,1,0,1,2,1,2,3,2,3=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\psi_1(\Omega_2^\Omega\times\Omega)}))</math>
* <math>0,1,2,2,0,1,0,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2}))</math>
* <math>0,1,2,2,0,1,0,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2}))</math>
* <math>0,1,2,2,0,1,0,1,2,2,0,1,0,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times2)</math>
* <math>0,1,2,2,0,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\omega)</math>
* <math>0,1,2,2,0,1,1,0,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\omega^2)</math>
* <math>0,1,2,2,0,1,1,0,1,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\omega^\omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\Omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,0,1,2,2,0,1,1,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\omega\times2)</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\Omega\times\omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,1,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\Omega^2)</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\Omega^\omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,1,1,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\Omega^\Omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(0))</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,1,2,0,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(1))</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega\times\omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\psi_1(0)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2))</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\Omega+1))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\Omega+\Omega_2))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\Omega+\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\Omega\times\omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(0)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+1))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,1,2,0,1,2,0,1,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(0)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,1,2,0,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,1,2,0,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\omega)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\Omega)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,1,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega))))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)+\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times2))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)\times\omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)^2))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+1)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega+\Omega_2)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times2)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\omega)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\Omega)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,2,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^{\Omega+2}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,2,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^{\Omega+\omega}))</math>

=== Part 16 ===
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\psi_1(\Omega_2^{\Omega\times2}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})^2)</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})^2\times\omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,1,1,0,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})^2\times\Omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,1,1,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})^2\times\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,1,1,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})^2\times\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,1,1,0,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})^2\times\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,1,1,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})^3)</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,1,1,1=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})^\omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,1,2=\psi(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2}+1))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^\Omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega_2}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1=\psi(\Omega_2^{\Omega_2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega_2})\times\omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega_2})\times\Omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega_2})^2)</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega_2}+1))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^\Omega)))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\Omega+1})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\Omega\times2})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,1,2,2,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(0)})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,1,2,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^\Omega)})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,2,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^\Omega\times\Omega)})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,2,3,4=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega\times2})})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times2)</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,1,1,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,1,1,0,1,2,1,2,3,3,0,1,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,1,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}+1))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,1,2,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}+\psi_1(\Omega_2^{\Omega_2})))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,1,2,0,1,2,1,2,3,3,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}+\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})})))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}+\Omega_2))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}+\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times2))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,1=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})+1})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,1,2,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})+\Omega})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})\times2})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})\times\omega})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})\times\Omega})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,2,3,4,4=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})^2})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,2,3,4,4,1,2,2,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2}+1)})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,2,3,4,4,1,2,3=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2}+\Omega_2^\Omega)})</math>
* <math>0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,2,3,4,4,1,2,3,2,3,4,4=\psi(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})})})</math>
* <math>0,1,2,2,0,1,1,0,1,2,2=\psi(\Omega_2^{\Omega_2}\times2)</math>

=== Part 17 ===
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2=\psi(\Omega_2^{\Omega_2}\times2+\Omega^\Omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,1,2,3=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega\times2}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,2=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,2,0,1,1=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2})\times\omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2})^2)</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,1,2=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}+1))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}+\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,1=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})\times\omega}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,0,1,2,2,0,1,1,0,1,2,2=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}\times2))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}\times2)\times\omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}\times2)\times\Omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2,1=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}\times2)\times\psi_1(\Omega_2^\Omega\times\omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}\times2)\times\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}\times2)\times\psi_1(\Omega_2^{\Omega_2}))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}\times2)^2)</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,3,0,1,1,2=\psi(\Omega_2^{\Omega_2}\times2+\psi_1(\Omega_2^{\Omega_2}\times2+1))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,3,0,1,2=\psi(\Omega_2^{\Omega_2}\times2+\Omega_2^\Omega)</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,3,0,1,2,1,2,3,3,1,2,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times2+\Omega_2^{\psi_1(\Omega_2^{\Omega_2}\times2)})</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,3,1=\psi(\Omega_2^{\Omega_2}\times2+\Omega_2^{\psi_1(\Omega_2^{\Omega_2}\times2)}\times\psi(\Omega_2^{\Omega_2}\times2+\Omega_2^{\psi_1(\Omega_2^{\Omega_2}\times2)}\times\omega))</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,3,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}\times2+\Omega_2^{\psi_1(\Omega_2^{\Omega_2}\times2)+1})</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,3,1,2,2=\psi(\Omega_2^{\Omega_2}\times2+\Omega_2^{\psi_1(\Omega_2^{\Omega_2}\times2)\times\omega})</math>
* <math>0,1,2,2,0,1,1,0,1,2,2,0,1,1,0,1,2,2=\psi(\Omega_2^{\Omega_2}\times3)</math>
* <math>0,1,2,2,0,1,1,1=\psi(\Omega_2^{\Omega_2}\times\omega)</math>

=== Part 18 ===
* <math>0,1,2,2,0,1,1,1=\psi(\Omega_2^{\Omega_2}\times\omega)</math>
* <math>0,1,2,2,0,1,1,1,0,1,1,1=\psi(\Omega_2^{\Omega_2}\times\omega^2)</math>
* <math>0,1,2,2,0,1,1,1,0,1,2=\psi(\Omega_2^{\Omega_2}\times\Omega)</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,0,1,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(0))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^\Omega\times\omega))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,0,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^\Omega\times\Omega+\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,0,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^\Omega\times\Omega\times2))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega)))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^\Omega\times\psi_1(\Omega_2^\Omega\times\Omega)))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega\times2}))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+1))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^\Omega)))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2})\times\omega))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\psi_1(\Omega_2^{\Omega_2}+1)))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1,1,2,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^\Omega))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1,2,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega_2})))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1,2,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^\Omega\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^\Omega)))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1,2,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\Omega\times2}))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}+1))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,0,1,2,1,2,3,3,0,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times2))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\omega))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi(0)))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\Omega))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,0,1,2,1,2,3,3,0,1,2,1,2,3,3,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\Omega\times2))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,0,1,2,1,2,3,3,1=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\Omega\times\omega))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,0,1,2,1,2,3,3,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^\Omega)))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,1=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^\Omega\times\omega)))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2})))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,1,2,3,3,0,1,2,1,2,3,3,1=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2})\times\omega))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,1,2,3,3,0,1,2,1,2,3,3,1,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})})))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,1,2,3,3,1,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})}\times\Omega)))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})+1}))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,2,3,4,4=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}+\Omega_2^{\psi_1(\Omega_2^{\Omega_2})\times2}))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,2,1,2,3,3=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}\times2))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,1,2,3,3,1,2,2,2=\psi(\Omega_2^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}\times\omega))</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,2=\psi(\Omega_2^{\Omega_2+1})</math>
* <math>0,1,2,2,0,1,1,1,0,1,2,2,0,1,1,1=\psi(\Omega_2^{\Omega_2+\omega})</math>
* <math>0,1,2,2,0,1,1,1,1=\psi(\Omega_2^{\Omega_2+\omega^2})</math>
* <math>0,1,2,2,0,1,1,1,1,1=\psi(\Omega_2^{\Omega_2\times\omega})</math>
* <math>0,1,2,2,0,1,1,1,1,1,0,1,2,2=\psi(\Omega_2^{\Omega_2^2})</math>
* <math>0,1,2,2,0,1,1,2=\psi(\psi_2(0))</math>

=== Part 19 ===
* <math>0,1,2,2,0,1,1,2=\psi(\psi_2(0))</math>
* <math>0,1,2,2,0,1,1,2,0,1,0,1,2,2=\psi(\psi_2(0)+\psi_1(\Omega_2^{\Omega_2}))</math>
* <math>0,1,2,2,0,1,1,2,0,1,0,1,2,2,0,1,1,2=\psi(\psi_2(0)\times2)</math>
* <math>0,1,2,2,0,1,1,2,0,1,1=\psi(\psi_2(0)\times\omega)</math>
* <math>0,1,2,2,0,1,1,2,0,1,1,0,1,2,2=\psi(\psi_2(0)\times\Omega_2)</math>
* <math>0,1,2,2,0,1,1,2,0,1,1,0,1,2,2,0,1,1,2=\psi(\psi_2(0)^2)</math>
* <math>0,1,2,2,0,1,1,2,0,1,1,2=\psi(\psi_2(1))</math>
* <math>0,1,2,2,0,1,1,2,0,1,2,2=\psi(\psi_2(\Omega_2))</math>
* <math>0,1,2,2,0,1,1,2,1=\psi(\psi_2(\Omega_2)\times\omega)</math>
* <math>0,1,2,2,0,1,1,2,1,1,2=\psi(\psi_2(\Omega_2+1))</math>
* <math>0,1,2,2,0,1,1,2,1,2=\psi(\Omega_3)</math>
* <math>0,1,2,2,0,1,2=\psi(\Omega_3^\Omega)</math>
* <math>0,1,2,2,0,1,2,0,1,0,1,2,2,0,1,2=\psi(\Omega_3^\Omega+\psi_1(\Omega_3^\Omega))</math>
* <math>0,1,2,2,0,1,2,0,1,1=\psi(\Omega_3^\Omega+\psi_1(\Omega_3^\Omega)\times\omega)</math>
* <math>0,1,2,2,0,1,2,0,1,1,0,1,2,1,2,3,3,0,1,1,2=\psi(\Omega_3^\Omega+\psi_1(\Omega_3^\Omega+1))</math>
* <math>0,1,2,2,0,1,2,0,1,1,0,1,2,1,2,3,3,0,1,1,2,1,2=\psi(\Omega_3^\Omega+\Omega_2)</math>
* <math>0,1,2,2,0,1,2,0,1,1,0,1,2,2=\psi(\Omega_3^\Omega+\Omega_2^{\Omega_2})</math>
* <math>0,1,2,2,0,1,2,0,1,1,0,1,2,2,0,1,1,2=\psi(\Omega_3^\Omega+\psi_2(0))</math>
* <math>0,1,2,2,0,1,2,0,1,1,0,1,2,2,0,1,2=\psi(\Omega_3^\Omega+\psi_2(\Omega_3^\Omega))</math>
* <math>0,1,2,2,0,1,2,0,1,1,1=\psi(\Omega_3^\Omega+\psi_2(\Omega_3^\Omega)\times\omega)</math>
* <math>0,1,2,2,0,1,2,0,1,1,2=\psi(\Omega_3^\Omega+\psi_2(\Omega_3^\Omega+1))</math>
* <math>0,1,2,2,0,1,2,0,1,1,2,1,2=\psi(\Omega_3^\Omega+\Omega_3)</math>
* <math>0,1,2,2,0,1,2,0,1,2=\psi(\Omega_3^\Omega\times2)</math>
* <math>0,1,2,2,0,1,2,0,1,2,1=\psi(\Omega_3^\Omega\times\omega)</math>
* <math>0,1,2,2,0,1,2,0,1,2,1,2=\psi(\Omega_3^\Omega\times\Omega)</math>
* <math>0,1,2,2,0,1,2,0,1,2,1,2,1,2=\psi(\Omega_3^\Omega\times\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,2,0,1,2,0,1,2,1,2,2=\psi(\Omega_3^\Omega\times\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,2,0,1,2,0,1,2,1,2,3,3=\psi(\Omega_3^\Omega\times\psi_1(\Omega_2^{\Omega_2}))</math>
* <math>0,1,2,2,0,1,2,0,1,2,1,2,3,3,1,2,3=\psi(\Omega_3^\Omega\times\psi_1(\Omega_3^{\Omega_\Omega}))</math>
* <math>0,1,2,2,0,1,2,0,1,2,2=\psi(\Omega_3^\Omega\times\Omega_2)</math>
* <math>0,1,2,2,0,1,2,1=\psi(\Omega_3^\Omega\times\Omega_2\times\omega)</math>
* <math>0,1,2,2,0,1,2,1,1,2=\psi(\Omega_3^\Omega\times\psi_2(0))</math>
* <math>0,1,2,2,0,1,2,1,1,2,0,1,2,2=\psi(\Omega_3^\Omega\times\psi_2(\Omega_2))</math>
* <math>0,1,2,2,0,1,2,1,1,2,1=\psi(\Omega_3^\Omega\times\psi_2(\Omega_2\times\omega))</math>
* <math>0,1,2,2,0,1,2,1,1,2,1,2=\psi(\Omega_3^\Omega\times\psi_2(\Omega_3))</math>
* <math>0,1,2,2,0,1,2,1,2=\psi(\Omega_3^\Omega\times\psi_2(\Omega_3^\Omega))</math>
* <math>0,1,2,2,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_3^\Omega\times\psi_2(\Omega_3^\Omega\times2))</math>
* <math>0,1,2,2,0,1,2,1,2,2=\psi(\Omega_3^{\Omega+1})</math>
* <math>0,1,2,2,0,1,2,1,2,3,1,2,2,3=\psi(\Omega_3^{\psi_2(0)})</math>
* <math>0,1,2,2,0,1,2,1,2,3,3=\psi(\Omega_3^{\psi_2(\Omega_2^{\Omega_2})})</math>
* <math>0,1,2,2,0,1,2,2=\psi(\Omega_3^{\Omega_2})</math>
* <math>0,1,2,2,0,1,2,2=\psi(\Omega_3^{\Omega_2})</math>
* <math>0,1,2,2,1=\psi(\Omega_3^{\Omega_2}\times\omega)</math>
* <math>0,1,2,2,1,2=\psi(\Omega_3^{\Omega_2}\times\Omega)</math>
* <math>0,1,2,2,1,2,0,1,2,2,1,1,2=\psi(\Omega_3^{\Omega_2}\times\psi_1(0))</math>
* <math>0,1,2,2,1,2,0,1,2,2,1,2=\psi(\Omega_3^{\Omega_2}\times\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,2,1,2,1,2,2=\psi(\Omega_3^{\Omega_2}\times\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,2,1,2,1,2,3,3=\psi(\Omega_3^{\Omega_2}\times\psi_1(\Omega_2^{\Omega_2}))</math>
* <math>0,1,2,2,1,2,1,2,3,3,1,2,3=\psi(\Omega_3^{\Omega_2}\times\psi_1(\Omega_3^{\Omega}))</math>
* <math>0,1,2,2,1,2,1,2,3,3,1,2,3,3=\psi(\Omega_3^{\Omega_2}\times\psi_1(\Omega_3^{\Omega_2}))</math>
* <math>0,1,2,2,1,2,1,2,3,3,2=\psi(\Omega_3^{\Omega_2}\times\psi_1(\Omega_3^{\Omega_2}\times\omega))</math>
* <math>0,1,2,2,1,2,2=\psi(\Omega_3^{\Omega_2}\times\Omega_2)</math>
* <math>0,1,2,2,1,2,2,0,1,2,2=\psi(\Omega_3^{\Omega_2}\times\Omega_2+\Omega_3^{\Omega_2})</math>
* <math>0,1,2,2,1,2,2,0,1,2,2,0,1,2,2,1,2,2=\psi(\Omega_3^{\Omega_2}\times\Omega_2\times2)</math>
* <math>0,1,2,2,1,2,2,0,1,2,2,1=\psi(\Omega_3^{\Omega_2}\times\Omega_2\times\omega)</math>
* <math>0,1,2,2,1,2,2,0,1,2,2,1,1,2=\psi(\Omega_3^{\Omega_2}\times\psi_2(0))</math>
* <math>0,1,2,2,1,2,2,0,1,2,2,1,2=\psi(\Omega_3^{\Omega_2}\times\psi_2(\Omega_3^\Omega))</math>
* <math>0,1,2,2,1,2,2,0,1,2,2,1,2,2=\psi(\Omega_3^{\Omega_2}\times\psi_2(\Omega_3^{\Omega_2}))</math>
* <math>0,1,2,2,1,2,2,1=\psi(\Omega_3^{\Omega_2}\times\psi_2(\Omega_3^{\Omega_2}\times\Omega))</math>
* <math>0,1,2,2,1,2,2,1,2,2=\psi(\Omega_3^{\Omega_2}\times\psi_2(\Omega_3^{\Omega_2}\times\Omega_2))</math>
* <math>0,1,2,2,1,2,2,2=\psi(\Omega_3^{\Omega_2+1})</math>
* <math>0,1,2,2,2=\psi(\Omega_3^{\Omega_3})</math>
* <math>0,1,2,2,3=\psi(\Omega_\omega)=\mathrm{BO}</math>

=== Part 20 ===
* <math>0,1,2,2,3,0,1,0,1,2=\psi(\Omega_\omega+\Omega^\Omega)</math>
* <math>0,1,2,2,3,0,1,0,1,2,0,1,1,2=\psi(\Omega_\omega+\psi_1(0))</math>
* <math>0,1,2,2,3,0,1,0,1,2,2=\psi(\Omega_\omega+\psi_1(\Omega_2^{\Omega_2}))</math>
* <math>0,1,2,2,3,0,1,0,1,2,2,3=\psi(\Omega_\omega+\psi_1(\Omega_\omega))</math>
* <math>0,1,2,2,3,0,1,1=\psi(\Omega_\omega+\psi_1(\Omega_\omega)\times\omega)</math>
* <math>0,1,2,2,3,0,1,1,0,1,2=\psi(\Omega_\omega+\psi_1(\Omega_\omega)\times\Omega)</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,0,1,1,2=\psi(\Omega_\omega+\psi_1(\Omega_\omega)\times\psi_1(0))</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,0,1,2=\psi(\Omega_\omega+\psi_1(\Omega_\omega)\times\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2=\psi(\Omega_\omega+\psi_1(\Omega_\omega)\times\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,2=\psi(\Omega_\omega+\psi_1(\Omega_\omega)\times\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4=\psi(\Omega_\omega+\psi_1(\Omega_\omega)^2)</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,1,2=\psi(\Omega_\omega+\psi_1(\Omega_\omega+1))</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,1,2,1,2=\psi(\Omega_\omega+\Omega_2)</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,2=\psi(\Omega_\omega+\Omega_2^\Omega)</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,2,0,1,2=\psi(\Omega_\omega+\Omega_2^\Omega\times2)</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,2,0,1,2,1,2,3,3,4=\psi(\Omega_\omega+\Omega_2^\Omega\times\psi(\Omega_\omega))</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,2,1=\psi(\Omega_\omega+\Omega_2^\Omega\times\psi(\Omega_\omega)\times\omega)</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,2,1,1,2=\psi(\Omega_\omega+\Omega_2^\Omega\times\psi(\Omega_\omega+1))</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,2,1,2=\psi(\Omega_\omega+\Omega_2^\Omega\times\psi(\Omega_\omega+\Omega_2^\Omega))</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,2,1,2,0,1,2,1,2,3,3,4=\psi(\Omega_\omega+\Omega_2^\Omega\times\psi(\Omega_\omega+\Omega_2^\Omega\times\psi_1(\Omega_\omega)))</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,2,1,2,2=\psi(\Omega_\omega+\Omega_2^{\Omega+1})</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,2,1,2,3,1,2,2,3=\psi(\Omega_\omega+\Omega_2^{\psi_1(0)})</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,2,1,2,3,3,4=\psi(\Omega_\omega+\Omega_2^{\psi_1(\Omega_\omega)})</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,1=\psi(\Omega_\omega+\Omega_2^{\psi_1(\Omega_\omega)}\times\omega)</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,2=\psi(\Omega_\omega+\Omega_2^{\Omega_2})</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,2,0,1,1,2=\psi(\Omega_\omega+\psi_2(0))</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,2,0,1,1,2,1,2=\psi(\Omega_\omega+\psi_2(\Omega_2))</math>
* <math>0,1,2,2,3,0,1,1,0,1,2,2,3=\psi(\Omega_\omega+\psi_2(\Omega_\omega))</math>
* <math>0,1,2,2,3,0,1,1,1=\psi(\Omega_\omega+\psi_2(\Omega_\omega)\times\omega)</math>
* <math>0,1,2,2,3,0,1,1,2=\psi(\Omega_\omega\times2)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,0,1,2,2,3=\psi(\Omega_\omega\times2+\psi_1(\Omega_\omega))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,0,1,2,2,3,0,1,1,2=\psi(\Omega_\omega\times2+\psi_1(\Omega_\omega\times2))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,1=\psi(\Omega_\omega\times2+\psi_1(\Omega_\omega\times2)\times\omega)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,1,0,1,2,2=\psi(\Omega_\omega\times2+\psi_1(\Omega_\omega\times2)\times\Omega_2)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,1,0,1,2,2,3=\psi(\Omega_\omega\times2+\psi_2(\Omega_\omega))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,1,0,1,2,2,3,0,1,1,2=\psi(\Omega_\omega\times2+\psi_2(\Omega_\omega\times2))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,1,0,1,2,2,3,0,1,1,2,0,1,1=\psi(\Omega_\omega\times2+\psi_2(\Omega_\omega\times2)+\psi_1(\Omega_\omega\times2+\psi_2(\Omega_\omega\times2))\times\omega)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,1,0,1,2,2,3,0,1,1,2=\psi(\Omega_\omega\times2+\psi_2(\Omega_\omega\times2))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,1,2=\psi(\Omega_\omega\times3)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2=\psi(\Omega_\omega\times\Omega)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,0,1,2,2,3,0,1,1,0,1,2=\psi(\Omega_\omega\times\Omega+\psi_1(\Omega_\omega)\times\Omega)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4=\psi(\Omega_\omega\times\Omega+\psi_1(\Omega_\omega)^2)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,0,1,2,2,3,0,1,1,0,1,2,1,2,3,3,4,0,1,1,2,1,2=\psi(\Omega_\omega\times\Omega+\psi_1(\Omega_\omega+\Omega_2))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,0,1,2,2,3,0,1,1,0,1,2,2,3=\psi(\Omega_\omega\times\Omega+\psi_1(\Omega_\omega+\psi_2(\Omega_\omega)))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,0,1,2,2,3,0,1,1,2=\psi(\Omega_\omega\times\Omega+\psi_1(\Omega_\omega\times2))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,0,1,2,2,3,0,1,1,2,0,1,2=\psi(\Omega_\omega\times\Omega+\psi_1(\Omega_\omega\times\Omega))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,1=\psi(\Omega_\omega\times\Omega+\psi_1(\Omega_\omega\times\Omega)\times\omega)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,1,0,1,2,2=\psi(\Omega_\omega\times\Omega+\Omega_2)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,1,0,1,2,2,3=\psi(\Omega_\omega\times\Omega+\psi_2(\Omega_\omega))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,1,2=\psi(\Omega_\omega\times\Omega+\Omega_\omega)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,1,2,1=\psi(\Omega_\omega\times\Omega\times\omega)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,1,2,1,0,1,2=\psi(\Omega_\omega\times\Omega^2)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,1,2,1,1,2=\psi(\Omega_\omega\times\psi_1(0))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,0,1,2=\psi(\Omega_\omega\times\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,1=\psi(\Omega_\omega\times\psi_1(\Omega_2^\Omega\times\omega))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,1,2,3,3,4=\psi(\Omega_\omega\times\psi_1(\Omega_\omega))</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,2=\psi(\Omega_\omega\times\Omega_2)</math>
* <math>0,1,2,2,3,0,1,1,2,0,1,2,2,3=\psi(\Omega_\omega^2)</math>
* <math>0,1,2,2,3,0,1,1,2,1=\psi(\Omega_\omega^2\times\omega)</math>
* <math>0,1,2,2,3,0,1,1,2,1,0,1,2,2,3=\psi(\Omega_\omega^3)</math>
* <math>0,1,2,2,3,0,1,1,2,1,1,2=\psi(\psi_\omega(0))</math>
* <math>0,1,2,2,3,0,1,1,2,1,1,2,0,1,1,2,0,1,2,2,3,0,1,1,2,1,1,2=\psi(\psi_\omega(0)\times2)</math>
* <math>0,1,2,2,3,0,1,1,2,1,1,2,0,1,1,2,1,1,2=\psi(\psi_\omega(1))</math>
* <math>0,1,2,2,3,0,1,1,2,1,2=\psi(\Omega_{\omega+1})</math>
* <math>0,1,2,2,3,0,1,1,2,2=\psi(\Omega_{\omega+1}^\omega)</math>
* <math>0,1,2,2,3,0,1,2=\psi(\Omega_{\omega+1}^\Omega)</math>
* <math>0,1,2,2,3,0,1,2,0,1,0,1,2,2,3,0,1,2=\psi(\Omega_{\omega+1}^\Omega+\psi_1(\Omega_{\omega+1}^\Omega))</math>
* <math>0,1,2,2,3,0,1,2,0,1,1=\psi(\Omega_{\omega+1}^\Omega+\psi_1(\Omega_{\omega+1}^\Omega)\times\omega)</math>
* <math>0,1,2,2,3,0,1,2,0,1,1,2=\psi(\Omega_{\omega+1}^\Omega+\Omega_\omega)</math>
* <math>0,1,2,2,3,0,1,2,0,1,1,2,0,1,2,2,3,0,1,2=\psi(\Omega_{\omega+1}^\Omega\times2)</math>
* <math>0,1,2,2,3,0,1,2,0,1,1,2,1=\psi(\Omega_{\omega+1}^\Omega\times\omega)</math>
* <math>0,1,2,2,3,0,1,2,0,1,1,2,1,0,1,2,2,3=\psi(\Omega_{\omega+1}^{\Omega}\times\Omega_\omega)</math>
* <math>0,1,2,2,3,0,1,2,0,1,1,2,1,0,1,2,2,3,0,1,1,2,1,1,2=\psi(\Omega_{\omega+1}^{\Omega}\times\psi_\omega(0))</math>
* <math>0,1,2,2,3,0,1,2,0,1,1,2,1,0,1,2,2,3,0,1,2=\psi(\Omega_{\omega+1}^{\Omega}\times\psi_\omega(\Omega_{\omega+1}^\Omega))</math>
* <math>0,1,2,2,3,0,1,2,0,1,1,2,1,1=\psi(\Omega_{\omega+1}^{\Omega}\times\psi_\omega(\Omega_{\omega+1}^\Omega)^\omega)</math>
* <math>0,1,2,2,3,0,1,2,0,1,1,2,1,2=\psi(\Omega_{\omega+1}^{\Omega}\times\psi_\omega(\Omega_{\omega+1}^\Omega+\Omega_{\omega+1}))</math>
* <math>0,1,2,2,3,0,1,2,0,1,2=\psi(\Omega_{\omega+1}^{\Omega}\times\psi_\omega(\Omega_{\omega+1}^\Omega\times2))</math>
* <math>0,1,2,2,3,0,1,2,0,1,2,2,3=\psi(\Omega_{\omega+1}^{\Omega}\times\psi_\omega(\Omega_{\omega+1}^\Omega\times\Omega_\omega))</math>
* <math>0,1,2,2,3,0,1,2,1=\psi(\Omega_{\omega+1}^{\Omega}\times\psi_\omega(\Omega_{\omega+1}^\Omega\times\Omega_\omega\times\omega))</math>
* <math>0,1,2,2,3,0,1,2,1,1,2=\psi(\Omega_{\omega+1}^{\Omega}\times\psi_\omega(\Omega_{\omega+1}^\Omega\times\psi_\omega(0)))</math>
* <math>0,1,2,2,3,0,1,2,1,1,2,1,2=\psi(\Omega_{\omega+1}^{\Omega}\times\psi_\omega(\Omega_{\omega+1}^\Omega\times\psi_\omega(\Omega_{\omega+1})))</math>
* <math>0,1,2,2,3,0,1,2,1,2=\psi(\Omega_{\omega+1}^{\Omega}\times\psi_\omega(\Omega_{\omega+1}^\Omega\times\psi_\omega(\Omega_{\omega+1}^\Omega)))</math>
* <math>0,1,2,2,3,0,1,2,1,2,2=\psi(\Omega_{\omega+1}^{\Omega+1})</math>
* <math>0,1,2,2,3,0,1,2,1,2,3,1,2,2,3=\psi(\Omega_{\omega+1}^{\psi_1(0)})</math>
* <math>0,1,2,2,3,0,1,2,1,2,3,3,4=\psi(\Omega_{\omega+1}^{\psi_1(\Omega_\omega)})</math>
* <math>0,1,2,2,3,0,1,2,2=\psi(\Omega_{\omega+1}^{\Omega_2})</math>
* <math>0,1,2,2,3,0,1,2,2,3=\psi(\Omega_{\omega+1}^{\Omega_\omega})</math>
* <math>0,1,2,2,3,1=\psi(\Omega_{\omega+1}^{\Omega_\omega}\times\omega)</math>
* <math>0,1,2,2,3,1,2=\psi(\Omega_{\omega+1}^{\Omega_\omega}\times\Omega)</math>
* <math>0,1,2,2,3,1,2,2=\psi(\Omega_{\omega+1}^{\Omega_\omega}\times\Omega_2)</math>
* <math>0,1,2,2,3,1,2,2,3=\psi(\Omega_{\omega+1}^{\Omega_\omega}\times\Omega_\omega)</math>
* <math>0,1,2,2,3,1,2,2,3,2=\psi(\Omega_{\omega+1}^{\Omega_\omega+1})</math>
* <math>0,1,2,2,3,1,2,3=\psi(\Omega_{\omega+1}^{\Omega_\omega+\Omega})</math>
* <math>0,1,2,2,3,1,2,3,1,2,3=\psi(\Omega_{\omega+1}^{\Omega_\omega+\psi_1(\Omega_2^\Omega)})</math>
* <math>0,1,2,2,3,1,2,3,2,3=\psi(\Omega_{\omega+1}^{\Omega_\omega+\psi_1(\Omega_2^\Omega\times\Omega)})</math>
* <math>0,1,2,2,3,1,2,3,2,3,4,4,5=\psi(\Omega_{\omega+1}^{\Omega_\omega+\psi_1(\Omega_\omega)})</math>
* <math>0,1,2,2,3,1,2,3,3=\psi(\Omega_{\omega+1}^{\Omega_\omega+\Omega_2})</math>
* <math>0,1,2,2,3,1,2,3,3,4=\psi(\Omega_{\omega+1}^{\Omega_\omega\times2})</math>
* <math>0,1,2,2,3,2=\psi(\Omega_{\omega+1}^{\Omega_{\omega+1}})</math>
* <math>0,1,2,2,3,2,2=\psi(\Omega_{\omega+2}^{\Omega_{\omega+2}})</math>
* <math>0,1,2,2,3,2,2,3=\psi(\Omega_{\omega\times2})</math>
* <math>0,1,2,2,3,2,3=\psi(\Omega_{\omega^2})</math>
* <math>0,1,2,2,3,4=\psi(\Omega_{\psi(\Omega^\Omega)})</math>
* <math>0,1,2,2,3,4,4,5=\psi(\Omega_{\psi(\Omega_\omega)})</math>
* <math>0,1,2,3=\psi(\Omega_{\Omega})</math>

=== Part 21 ===
* <math>0,1,2,3,0,1,0,1,2,3=\psi(\Omega_\Omega+\psi_1(\Omega_\Omega))</math>
* <math>0,1,2,3,0,1,1=\psi(\Omega_\Omega+\psi_1(\Omega_\Omega)\times\omega)</math>
* <math>0,1,2,3,0,1,1,0,1,2,3=\psi(\Omega_\Omega+\psi_2(\Omega_\Omega))</math>
* <math>0,1,2,3,0,1,1,2=\psi(\Omega_\Omega+\Omega_\omega)</math>
* <math>0,1,2,3,0,1,1,2,1,1,2=\psi(\Omega_\Omega+\Omega_{\omega\times2})</math>
* <math>0,1,2,3,0,1,2=\psi(\Omega_\Omega\times2)</math>
* <math>0,1,2,3,0,1,2,0,1,1=\psi(\Omega_\Omega\times2+\psi_1(\Omega_\Omega\times2)\times\omega)</math>
* <math>0,1,2,3,0,1,2,0,1,2=\psi(\Omega_\Omega\times3)</math>
* <math>0,1,2,3,0,1,2,0,1,2,1,2=\psi(\Omega_\Omega\times\Omega)</math>
* <math>0,1,2,3,0,1,2,0,1,2,2=\psi(\Omega_\Omega\times\Omega_2)</math>
* <math>0,1,2,3,0,1,2,0,1,2,3=\psi(\Omega_\Omega^2)</math>
* <math>0,1,2,3,0,1,2,0,1,2,3,0,1,2=\psi(\Omega_\Omega^2+\Omega_\Omega)</math>
* <math>0,1,2,3,0,1,2,1=\psi(\Omega_\Omega^2\times\omega)</math>
* <math>0,1,2,3,0,1,2,1,0,1,2,0,1,2,3=\psi(\Omega_\Omega^2\times\omega+\Omega_\Omega^2)</math>
* <math>0,1,2,3,0,1,2,1,0,1,2,0,1,2,3,0,1,2,1=\psi(\Omega_\Omega^2\times\omega\times2)</math>
* <math>0,1,2,3,0,1,2,1,0,1,2,1=\psi(\Omega_\Omega^2\times\omega^2)</math>
* <math>0,1,2,3,0,1,2,1,0,1,2,3=\psi(\Omega_\Omega^3)</math>
* <math>0,1,2,3,0,1,2,1,0,1,2,3,0,1,2,1=\psi(\Omega_\Omega^3\times\omega)</math>
* <math>0,1,2,3,0,1,2,1,1=\psi(\Omega_\Omega^\omega)</math>
* <math>0,1,2,3,0,1,2,1,1,0,1,2,1=\psi(\Omega_\Omega^\omega\times\omega)</math>
* <math>0,1,2,3,0,1,2,1,1,0,1,2,1,1=\psi(\Omega_\Omega^{\omega\times2})</math>
* <math>0,1,2,3,0,1,2,1,1,0,1,2,3=\psi(\Omega_\Omega^{\Omega_\Omega})</math>
* <math>0,1,2,3,0,1,2,1,1,2=\psi(\psi_{\Omega_{\Omega+1}}(0))</math>
* <math>0,1,2,3,0,1,2,1,2=\psi(\Omega_{\Omega+1}^{\Omega})</math>
* <math>0,1,2,3,0,1,2,1,2,0,1,2=\psi(\Omega_{\Omega+1}^{\Omega}+\Omega_\Omega)</math>
* <math>0,1,2,3,0,1,2,1,2,0,1,2,1=\psi(\Omega_{\Omega+1}^{\Omega}+\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega})\times\omega)</math>
* <math>0,1,2,3,0,1,2,1,2,0,1,2,1,1,2=\psi(\Omega_{\Omega+1}^{\Omega}+\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega}+1))</math>
* <math>0,1,2,3,0,1,2,1,2,0,1,2,1,1,2,1,2=\psi(\Omega_{\Omega+1}^{\Omega}+\Omega_{\Omega+1})</math>
* <math>0,1,2,3,0,1,2,1,2,0,1,2,1,2=\psi(\Omega_{\Omega+1}^{\Omega}\times2)</math>
* <math>0,1,2,3,0,1,2,1,2,0,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega}\times\Omega_\Omega)</math>
* <math>0,1,2,3,0,1,2,1,2,1=\psi(\Omega_{\Omega+1}^{\Omega}\times\Omega_\Omega\times\omega)</math>
* <math>0,1,2,3,0,1,2,1,2,1,1,2=\psi(\Omega_{\Omega+1}^{\Omega}\times\psi_{\Omega_{\Omega+1}}(0))</math>
* <math>0,1,2,3,0,1,2,1,2,1,2=\psi(\Omega_{\Omega+1}^{\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega}))</math>
* <math>0,1,2,3,0,1,2,1,2,1,2,0,1,2,1,2,1=\psi(\Omega_{\Omega+1}^{\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega})\times\omega)</math>
* <math>0,1,2,3,0,1,2,1,2,1,2,0,1,2,1,2,1,1,2=\psi(\Omega_{\Omega+1}^{\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega}+1))</math>
* <math>0,1,2,3,0,1,2,1,2,1,2,0,1,2,1,2,1,1,2,1,2=\psi(\Omega_{\Omega+1}^{\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega}+\Omega_{\Omega+1}))</math>
* <math>0,1,2,3,0,1,2,1,2,1,2,0,1,2,1,2,1,2=\psi(\Omega_{\Omega+1}^{\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega}\times2))</math>
* <math>0,1,2,3,0,1,2,1,2,1,2,0,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega}\times\Omega_\Omega))</math>
* <math>0,1,2,3,0,1,2,1,2,2=\psi(\Omega_{\Omega+1}^{\Omega+1})</math>
* <math>0,1,2,3,0,1,2,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega\times2})</math>
* <math>0,1,2,3,0,1,2,2=\psi(\Omega_{\Omega+1}^{\Omega_2})</math>
* <math>0,1,2,3,0,1,2,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\omega})</math>
* <math>0,1,2,3,0,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega})</math>
* <math>0,1,2,3,0,1,2,3,0,1,0,1,2,3,0,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}+\psi_1(\Omega_{\Omega+1}^{\Omega_\Omega}))</math>
* <math>0,1,2,3,0,1,2,3,0,1,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}+\Omega_{\Omega})</math>
* <math>0,1,2,3,0,1,2,3,0,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times2)</math>
* <math>0,1,2,3,1=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\omega)</math>
* <math>0,1,2,3,1,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega)</math>
* <math>0,1,2,3,1,2,0,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega+\Omega_{\Omega+1}^{\Omega_\Omega})</math>
* <math>0,1,2,3,1,2,0,1,2,3,1,1,2,0,1,2,3,1,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_1(\Omega))</math>
* <math>0,1,2,3,1,2,0,1,2,3,1,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_1(\Omega_2^\Omega))</math>
* <math>0,1,2,3,1,2,1,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_1(\Omega_2^\Omega\times\Omega))</math>
* <math>0,1,2,3,1,2,1,2,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_1(\Omega_2^{\Omega+1}))</math>
* <math>0,1,2,3,1,2,1,2,3,3,4=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_1(\Omega_\omega))</math>
* <math>0,1,2,3,1,2,1,2,3,4=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_1(\Omega_\Omega))</math>
* <math>0,1,2,3,1,2,1,2,3,4,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_1(\Omega_\Omega\times2))</math>
* <math>0,1,2,3,1,2,1,2,3,4,1,2,3,4=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_1(\Omega_{\Omega+1}^{\Omega_\Omega}))</math>

=== Part 22 ===
* <math>0,1,2,3,1,2,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega_2)</math>
* <math>0,1,2,3,1,2,2,1,2,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_2(\Omega_{3}^{\Omega_2}\times\Omega_2))</math>
* <math>0,1,2,3,1,2,2,1,2,2,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_2(\Omega_{3}^{\Omega_2+1}))</math>
* <math>0,1,2,3,1,2,2,1,2,3,4=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_2(\Omega_{\Omega}))</math>
* <math>0,1,2,3,1,2,2,1,2,3,4,1,2,3,4=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_2(\Omega_{\Omega+1}^{\Omega_\Omega}))</math>
* <math>0,1,2,3,1,2,2,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega_3)</math>
* <math>0,1,2,3,1,2,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega_\omega)</math>
* <math>0,1,2,3,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega_\Omega)</math>
* <math>0,1,2,3,1,2,3,0,1,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega_\Omega+\Omega_\Omega)</math>
* <math>0,1,2,3,1,2,3,0,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega_\Omega+\Omega_{\Omega+1}^{\Omega_\Omega})</math>
* <math>0,1,2,3,1,2,3,0,1,2,3,0,1,2,3,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega_\Omega\times2)</math>
* <math>0,1,2,3,1,2,3,0,1,2,3,1,1,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_{\Omega_{\Omega+1}}(0))</math>
* <math>0,1,2,3,1,2,3,0,1,2,3,1,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^\Omega))</math>
* <math>0,1,2,3,1,2,3,0,1,2,3,1,2,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega_2}))</math>
* <math>0,1,2,3,1,2,3,0,1,2,3,1,2,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega_\omega}))</math>
* <math>0,1,2,3,1,2,3,0,1,2,3,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega_\Omega}))</math>
* <math>0,1,2,3,1,2,3,1=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega_\Omega}\times\omega))</math>
* <math>0,1,2,3,1,2,3,1,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega))</math>
* <math>0,1,2,3,1,2,3,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega}\times\psi_{\Omega_{\Omega+1}}(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega_\Omega))</math>
* <math>0,1,2,3,1,2,3,2=\psi(\Omega_{\Omega+1}^{\Omega_\Omega+1})</math>
* <math>0,1,2,3,1,2,3,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega+\Omega})</math>
* <math>0,1,2,3,1,2,3,2,3,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega+\Omega_2})</math>
* <math>0,1,2,3,1,2,3,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega+\Omega_2})</math>
* <math>0,1,2,3,1,2,3,3,4=\psi(\Omega_{\Omega+1}^{\Omega_\Omega+\Omega_\omega})</math>
* <math>0,1,2,3,1,2,3,4=\psi(\Omega_{\Omega+1}^{\Omega_\Omega\times2})</math>
* <math>0,1,2,3,1,2,3,4,1,2,3=\psi(\Omega_{\Omega+1}^{\Omega_\Omega\times3})</math>
* <math>0,1,2,3,1,2,3,4,1,2,3,2,2,3=\psi(\Omega_{\Omega+1}^{\psi_{\Omega_{\Omega+1}}(0)})</math>
* <math>0,1,2,3,2=\psi(\Omega_{\Omega+1}^{\Omega_{\Omega+1}})</math>
* <math>0,1,2,3,2,2=\psi(\Omega_{\Omega+2}^{\Omega_{\Omega+2}})</math>
* <math>0,1,2,3,2,2,3=\psi(\Omega_{\Omega+\omega})</math>
* <math>0,1,2,3,2,3=\psi(\Omega_{\Omega\times2})</math>
* <math>0,1,2,3,2,3,3=\psi(\Omega_{\Omega\times\omega})</math>
* <math>0,1,2,3,2,3,4=\psi(\Omega_{\Omega^2})</math>
* <math>0,1,2,3,2,3,4=\psi(\Omega_{\Omega^2})</math>
* <math>0,1,2,3,2,3,4,2,3=\psi(\Omega_{\Omega^2+\Omega})</math>
* <math>0,1,2,3,2,3,4,2,3,2,3,4=\psi(\Omega_{\Omega^2\times2})</math>
* <math>0,1,2,3,2,3,4,2,3,3=\psi(\Omega_{\Omega^2\times\omega})</math>
* <math>0,1,2,3,2,3,4,2,3,3,2,3,4=\psi(\Omega_{\Omega^3})</math>
* <math>0,1,2,3,2,3,4,2,3,3,4=\psi(\Omega_{\psi_1(0)})</math>
* <math>0,1,2,3,2,3,4,2,3,4=\psi(\Omega_{\psi_1(\Omega_2^\Omega)})</math>
* <math>0,1,2,3,2,3,4,3,4,4=\psi(\Omega_{\psi_1(\Omega_2^{\Omega+1})})</math>
* <math>0,1,2,3,2,3,4,4,5=\psi(\Omega_{\psi_1(\Omega_\omega)})</math>
* <math>0,1,2,3,2,3,4,5=\psi(\Omega_{\psi_1(\Omega_\Omega)})</math>
* <math>0,1,2,3,2,3,4,5,2,3,4,5=\psi(\Omega_{\psi_1(\Omega_{\Omega+1}^{\Omega_\Omega})})</math>
* <math>0,1,2,3,2,3,4,5,3,4=\psi(\Omega_{\psi_1(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega)})</math>
* <math>0,1,2,3,2,3,4,5,3,4,5=\psi(\Omega_{\psi_1(\Omega_{\Omega+1}^{\Omega_\Omega}\times\Omega_\Omega)})</math>
* <math>0,1,2,3,2,3,4,5,4=\psi(\Omega_{\psi_1(\Omega_{\Omega+1}^{\Omega_{\Omega+1}})})</math>
* <math>0,1,2,3,2,3,4,5,4,5,6,7=\psi(\Omega_{\psi_1(\Omega_{\psi_1(\Omega_\Omega)})})</math>
* <math>0,1,2,3,3=\psi(\Omega_{\Omega_2})</math>
* <math>0,1,2,3,3,2,3=\psi(\Omega_{\Omega_2+1})</math>
* <math>0,1,2,3,3,2,3,2,3,4,5=\psi(\Omega_{\Omega_2+\psi_1(\Omega_\Omega)})</math>
* <math>0,1,2,3,3,2,3,2,3,4,5,5=\psi(\Omega_{\Omega_2+\psi_1(\Omega_{\Omega_2})})</math>
* <math>0,1,2,3,3,2,3,3=\psi(\Omega_{\Omega_2\times2})</math>
* <math>0,1,2,3,3,2,3,3,3=\psi(\Omega_{\Omega_2\times\omega})</math>
* <math>0,1,2,3,3,2,3,4=\psi(\Omega_{\Omega_2\times\Omega})</math>
* <math>0,1,2,3,3,2,3,4,4=\psi(\Omega_{\Omega_2^2})</math>
* <math>0,1,2,3,3,2,3,4,4,2,3,3,4=\psi(\Omega_{\psi_2(0)})</math>
* <math>0,1,2,3,3,2,3,4,4,5=\psi(\Omega_{\psi_2(\Omega_\omega)})</math>
* <math>0,1,2,3,3,2,3,4,5=\psi(\Omega_{\psi_2(\Omega_\Omega)})</math>
* <math>0,1,2,3,3,3=\psi(\Omega_{\Omega_3})</math>
* <math>0,1,2,3,3,4=\psi(\Omega_{\Omega_\omega})</math>
* <math>0,1,2,3,4=\psi(\Omega_{\Omega_\Omega})</math>
* <math>0,1,2,3,4,2,3,4,5,2,3,4,3,3,2,3,4,5,0,1,2,3,1,2,3,4,1,2,3,2,2,1,2,3,4,1,1,0,1,2,3,4,2,3,4,5,2,3,4,3,3,2,3,4,5=\psi(\Omega_{\Omega_\Omega^{\Omega_\Omega}}^{\Omega_{\Omega_\Omega^{\Omega_\Omega}}})</math>
* <math>0,1,2,3,4,5,\cdots=\psi(\psi_I(0))=\mathrm{EBO}</math>

[[分类:分析]]

TrSS

2025-08-24T11:13:57Z

油手就行：

== Tree Sequence System（v1.2） ==

=== 零．前言 ===
TrSS全称Tree Sequence System，是由树状结构启发而制作的记号。记号的表达式是一个树列，为方便呈现，将树列改写为数组列形式，本文档所述为数组列展开规则，但TrSS本身并不是矩阵。本文档中绿色小字体为注释或举例，红色字体为重要内容。

TrSS是由数组作为项组成的序列，每个数组由正整数和分隔符组成。序列的第一个数组必须为(1)。数和分隔符都有等级，对于数n+1，其等级为n。分隔符有ω种，对于i，i级分隔符为i个连续的逗号；特别的，0级分隔符为“/”。数后面的分隔符等级不能高于数的等级，否则不合法。

每个合法数组都可以被绘制为树，绘制这样的树有三种操作：①向上一步；②从原地开始向上画k个依次相连的节点；③向右一步。从数组的首项开始，每遇到一个数k就执行②一次，每遇到一个n级分隔符就执行③一次，然后执行① n次。每执行一次①或③，就要在新到达的位置和原来的位置中间画一条边。如果一个分隔符后面的数是0，那么删去0及该分隔符。

数组之间比较字典序时，将其视为(a1 分隔符 a2 分隔符……)(b1 分隔符 b2 分隔符……)的形式依次比较对应的数或分隔符，高等级分隔符>低等级分隔符。例如，(2,2,1)>(2,2/1)

符号指代范围（重要）：

i、j、k正整数 m、n 、p自然数 a_i、b_i、c_i数列的第i项 %、#、$、&任意合法表达式/数组 A、B、C 任意分隔符

TrSS的极限表达式为(1)(ω)。

作为新型记号的首次尝试，此记号可能有不完善之处，请指出并联系我修改。

油手就行

==== 更新日志： ====
2025.8.18 1.0版本

2025.8.19 1.1版本

2025.8.24 1.2版本

=== 一. 前置定义 ===
1.子数组：

1）一个数组的-1级子数组是它本身。

2）从m=0开始，将每个数组的每个(m-1)级子数组按其中的m级分隔符分开，分开后的部分称为原数组的m级子数组。如果数组的m级子数组内仍有分隔符，那么进入3）；如果数组的m级子数组内没有分隔符，那么流程结束。（展开时用到的子数组不一定是最高等级的）

3）使m的值+1，然后回到2）。

2. 元素：数组(的子数组)的元素是其中的所有数和分隔符。

3. 末数组：表达式中最后一个数组。

4. 末项/分隔符：数组中最后一个数/分隔符。

=== 二．展开流程 ===
1.#(1)=#+1

2.在末数组不为(1)时：

1）将末数组的末项和末分隔符中不为0的元素等级-1。

Ⅰ.若末分隔符等级为0或数组仅有一个数而末项等级>0，则将末项等级-1。

Ⅱ.若二者等级均为0，则将二者都删去。

Ⅲ.若末分隔符等级>0，则寻找数组中最靠后的比末分隔符等级低的分隔符A，将原数组的末项和末分隔符替换为比末分隔符低一级的分隔符以及原数组的(A,倒数第二分隔符]∪{末项-1}。若找不到这样的分隔符，则视为它在数组最前面并且隐形。

Ⅳ.若数组中只有一个分隔符且末项等级为0，那么将它们删去。优先级最高

(2,1/1)根据II变为(2,1)；(2,1/2/2)根据I变为(2,1/2/1)，(2,1/2,1)根据III变为(2,1/2/2)，(3,,3,1)根据III变为(3,,3/3)，(2,2,2)根据Ⅳ变为(2,2,1/2,2)，(2,1)根据IV变为(2)

2）从n=(表达式中出现的最高等级分隔符的等级)开始，取每个数组的n级子数组。

①若经过1）变换的末数组的n级子数组在后面去掉连续的部分后与前面某数组的n级子数组在数和分隔符上都相同，那么进入3），否则进入②。如果直到n=-1都没能找到前面部分与末数组相同的数组，那么进入4）。

(2,1/2)和(2,1/2)的-1级子数组相同，和(2,1/2/2)的0级子数组部分相同

②使n的值-1并回到①。

3）今有若干数组、&的n级子数组#、#、#……#、#$，其中#不为空，且均为类似构造的数组中最靠后的：

①若$为空，那么坏根为&_i并进入④。否则进入②。

②若任意%_j在字典序上都大于$，那么坏根为并进入④。否则进入③。

③找到最大的j，使得%_j的字典序小于$，坏根为&_j并进入④。

④进入5）。

4）定义阶伸项Q为{原末数组，其中末项-1}∪{(原末数组的末项-2)级分隔符}，坏部B为[表达式第二个数组，表达式倒数第二个数组]∪{Q}，好部G为首数组(1)，展开为G+B+QB+QQB+QQQB……其中QB指在B中的每个数组前都添加一个Q。

5）定义坏部B为[坏根，表达式倒数第二个数组]，好部G为[表达式首项，坏根)，阶伸项Q为将(坏根与经过1）操作的末数组相比缺少的部分)还原为数组的结果。

Ⅰ.对于坏部中原本属于3）中提到的&_i中的数组，每次复制时将Q放在坏根的对应位置之后。此时Q的开头一定是分隔符，末尾一定是数。

Ⅱ.对于坏部中不是原本属于3）中提到的&_i中的数组，在它们前面都添加坏根的内容，中间的分隔符等级与找坏根时用到的子数组等级相同，然后在复制时将Q放在坏根的对应位置之后。

坏部为(2,1)(2,2)(2,1/2)，将(2,2)改为(2,1/2,2)，(2,1)和(2,1/2)不变。

Q=(/2/1)，坏根为(2,1)时，坏部的(2,1/2)一次复制后变为(2,1 /2/1 /2)，坏部的(2,2)变为(2,1 /2/1 /2,2)

6）无论通过4）还是5）展开的表达式，都要保证每个数组的第一个分隔符等级不为0。如果为0，那么将其改为1级分隔符。{{默认排序:个人记号}}
[[分类:记号]]

TrSS

2025-08-19T11:44:20Z

油手就行：

== Tree Sequence System ==
=== 零．前言 ===
TrSS全称Tree Sequence System，是由树状结构启发而制作的记号。记号的表达式是一个树列，为方便呈现，将树列改写为数组列形式，本文档所述为数组列展开规则，但TrSS本身并不是矩阵。本文档中绿色小字体为注释或举例，红色字体为重要内容。
TrSS是由数组作为项组成的序列，每个数组由正整数和分隔符组成。序列的第一个数组必须为(1)。数和分隔符都有等级，对于数n+1，其等级为n。分隔符有ω种，对于i，i级分隔符为i个连续的逗号；特别的，0级分隔符为“/”。数后面的分隔符等级不能高于数的等级，否则不合法。
每个合法数组都可以被绘制为树，绘制这样的树有三种操作：①向上一步；②从原地开始向上画k个依次相连的节点；③向右一步。从数组的首项开始，每遇到一个数k就执行②一次，每遇到一个n级分隔符就执行③一次，然后执行① n次。每执行一次①或③，就要在新到达的位置和原来的位置中间画一条边。如果一个分隔符后面的数是0，那么删去0及该分隔符。
数组之间比较字典序时，将其视为(a1 分隔符 a2 分隔符……)(b1 分隔符 b2 分隔符……)的形式依次比较对应的数或分隔符，高等级分隔符>低等级分隔符。例如，(2,2,1)>(2,2/1)。
符号指代范围（重要）：
i、j、k正整数 m、n 、p自然数 a_i、b_i、c_i数列的第i项 %、#、$、&任意合法表达式/数组 A、B、C 任意分隔符
TrSS的极限表达式为(1)(ω)。作为新型记号的首次尝试，此记号可能有不完善之处，请指出并联系我修改。
油手就行

更新日志：

2025.8.18 TrSS v1.0

TrSS正式被定义。

2025.8.19 TrSS v1.1

修改了寻找坏根的方法。
=== 一．前置定义 ===
1.子数组：

1）一个数组的-1级子数组是它本身。

2）从m=0开始，将每个数组的每个(m-1)级子数组按其中的m级分隔符分开，分开后的部分称为原数组的m级子数组。如果数组的m级子数组内仍有分隔符，那么进入3）；如果数组的m级子数组内没有分隔符，那么流程结束。（展开时用到的子数组不一定是最高等级的）

3）使m的值+1，然后回到2）。

例如，
(2,1/2/1)的0级子数组为(2,1)(/2)(/1)，1级子数组为(2)(,1)(/2)(/1)

2.元素：数组(的子数组)的元素是其中的所有数和分隔符。

3.末数组：表达式中最后一个数组。

4.末项/分隔符：数组中最后一个数/分隔符。
=== 二．展开流程 ===
1.#(1)=#+1

2.在末数组不为(1)时：

1）从n=(表达式中出现的最高等级分隔符的等级)开始，取每个数组的n级子数组。

①若末数组的n级子数组在后面去掉连续的部分后与前面某数组的n级子数组在数和分隔符上都相同，那么使末数组的末项等级-1，此时：

Ⅰ.若末项和末分隔符等级都为0，则将二者都删去。

Ⅱ.若末分隔符等级>0而末项等级为0，则将分隔符等级-1，然后将末项的值改为与倒数第二项相同的值。

然后进入6），否则进入②。如果直到n=-1都没能找到前面部分与末数组相同的数组，那么进入2）。

②使n的值-1并回到①。
(2,1/2)和(2,1/2)的-1级子数组相同，和(2,1/2/2)的0级子数组部分相同

2）将末数组的末项和末分隔符中不为0的元素等级-1。
Ⅰ.若末分隔符等级>0而末项等级为0，则将分隔符等级-1，然后将末项的值改为与倒数第二项相同的值。
Ⅱ.若末分隔符等级为0或数组仅有一个数而末项等级>0，则将末项等级-1。
Ⅲ.若二者等级均为0，则将二者都删去。
Ⅳ.若二者等级均>0，则将末项等级-1，然后寻找数组中最靠后的比末分隔符等级低的分隔符A，在后面添加一个比末分隔符低一级的分隔符以及原数组的(A,倒数第二项]。若找不到这样的分隔符，则视为它在数组最前面并且隐形。
Ⅴ.若数组中只有一个分隔符且末项等级为0，那么将它们删去。'''优先级最高'''
若经过变换的末数组的n级子数组在后面去掉连续的部分后与前面某数组的n级子数组在数和分隔符上都相同，那么进入3）。如果直到n=-1都没能找到前面部分与末数组相同的数组，那么进入4）。

例如，(2,1/1)根据Ⅲ变为(2,1)；(2,1/2/2)根据Ⅱ变为(2,1/2/1)，(2,1/2,1)根据Ⅳ变为(2,1/2/2)，(3,,3,1)根据Ⅰ变为(3,,3/3)，(2,2,2)根据Ⅳ变为(2,2,1/2,2)，(2,1)根据Ⅴ变为(2)。

3）今有若干数组、&的n级子数组#、#、#……#、#$，其中#不为空，且均为类似构造的数组中最靠后的：
①若$为空，那么坏根为&_i并进入④。否则进入②。
②若任意%_j在字典序上都大于等于$，那么坏根为并进入④。否则进入③。
③找到最大的j，使得%_j的字典序小于$，坏根为&_j并进入④。
④进入5）。
4）定义阶伸项Q为{原末数组，其中末项-1}∪{(原末数组的末项-2)级分隔符}，坏部B为[表达式第二个数组，表达式倒数第二个数组]，好部G为首数组(1)，展开为G+B+QB+QQB+QQQB……其中QB指在B中的每个数组前都添加一个Q。

5）定义坏部B为[坏根，表达式倒数第二个数组]，好部G为[表达式首项，坏根)，阶伸项Q为将(坏根与经过1）或2）操作的末数组相比缺少的部分)还原为数组的结果。
Ⅰ.对于坏部中原本属于3）中提到的&_i中的数组，每次复制时将Q放在坏根的对应位置之后。此时Q的开头一定是分隔符，末尾一定是数。
Ⅱ.对于坏部中不是原本属于3）中提到的&_i中的数组：
①若某数组可以找到与坏根前面部分相同的n级子数组，那么不对它做任何操作，直接添加阶伸项。
②若某数组不能找到与坏根前面部分相同的n级子数组，在它们前面都添加坏根的内容，中间的分隔符等级与坏根的末项等级相同，然后在复制时将Q放在坏根的对应位置之后。
例如坏部为(2,1)(2,2)(2,1/2)时，将(2,2)改为(2,1/2,2)，(2,1)和(2,1/2)不变。Q=(/2/1)，坏根为(2,1)时，坏部的(2,1/2)一次复制后变为(2,1 /2/1 /2)，坏部的(2,2)变为(2,1 /2/1 /2,2)。

6）坏根寻找方法同3）。定义阶伸项Q为坏根与原末数组相比缺少的部分，坏部B为{原末数组，其中末项-1}，好部G为首数组(1)，展开为G+B+QB+QQB+QQQB……其中QB指在B中的每个数组前都添加一个Q。

7）无论通过4）、5）还是6）展开的表达式，都要保证每个数组的第一个分隔符等级不为0。如果为0，那么将其改为1级分隔符。

TrSS

2025-08-19T11:42:00Z

油手就行：

== Tree Sequence System ==
=== 零．前言 ===
TrSS全称Tree Sequence System，是由树状结构启发而制作的记号。记号的表达式是一个树列，为方便呈现，将树列改写为数组列形式，本文档所述为数组列展开规则，但TrSS本身并不是矩阵。本文档中绿色小字体为注释或举例，红色字体为重要内容。
TrSS是由数组作为项组成的序列，每个数组由正整数和分隔符组成。序列的第一个数组必须为(1)。数和分隔符都有等级，对于数n+1，其等级为n。分隔符有ω种，对于i，i级分隔符为i个连续的逗号；特别的，0级分隔符为“/”。数后面的分隔符等级不能高于数的等级，否则不合法。
每个合法数组都可以被绘制为树，绘制这样的树有三种操作：①向上一步；②从原地开始向上画k个依次相连的节点；③向右一步。从数组的首项开始，每遇到一个数k就执行②一次，每遇到一个n级分隔符就执行③一次，然后执行① n次。每执行一次①或③，就要在新到达的位置和原来的位置中间画一条边。如果一个分隔符后面的数是0，那么删去0及该分隔符。
数组之间比较字典序时，将其视为(a1 分隔符 a2 分隔符……)(b1 分隔符 b2 分隔符……)的形式依次比较对应的数或分隔符，高等级分隔符>低等级分隔符。例如，(2,2,1)>(2,2/1)。
符号指代范围（重要）：
i、j、k正整数 m、n 、p自然数 a_i、b_i、c_i数列的第i项 %、#、$、&任意合法表达式/数组 A、B、C 任意分隔符
TrSS的极限表达式为(1)(ω)。作为新型记号的首次尝试，此记号可能有不完善之处，请指出并联系我修改。
油手就行

更新日志：

2025.8.18 TrSS v1.0

TrSS正式被定义。

2025.8.19 TrSS v1.1

修改了寻找坏根的方法。
=== 一．前置定义 ===
1.子数组：

1）一个数组的-1级子数组是它本身。

2）从m=0开始，将每个数组的每个(m-1)级子数组按其中的m级分隔符分开，分开后的部分称为原数组的m级子数组。如果数组的m级子数组内仍有分隔符，那么进入3）；如果数组的m级子数组内没有分隔符，那么流程结束。（展开时用到的子数组不一定是最高等级的）

3）使m的值+1，然后回到2）
(2,1/2/1)的0级子数组为(2,1)(/2)(/1)，1级子数组为(2)(,1)(/2)(/1)

2.元素：数组(的子数组)的元素是其中的所有数和分隔符。

3.末数组：表达式中最后一个数组。

4.末项/分隔符：数组中最后一个数/分隔符。
=== 二．展开流程 ===
1.#(1)=#+1

2.在末数组不为(1)时：

1）从n=(表达式中出现的最高等级分隔符的等级)开始，取每个数组的n级子数组。

①若末数组的n级子数组在后面去掉连续的部分后与前面某数组的n级子数组在数和分隔符上都相同，那么使末数组的末项等级-1，此时：

Ⅰ.若末项和末分隔符等级都为0，则将二者都删去。

Ⅱ.若末分隔符等级>0而末项等级为0，则将分隔符等级-1，然后将末项的值改为与倒数第二项相同的值。

然后进入6），否则进入②。如果直到n=-1都没能找到前面部分与末数组相同的数组，那么进入2）。

②使n的值-1并回到①。
(2,1/2)和(2,1/2)的-1级子数组相同，和(2,1/2/2)的0级子数组部分相同

2）将末数组的末项和末分隔符中不为0的元素等级-1。
Ⅰ.若末分隔符等级>0而末项等级为0，则将分隔符等级-1，然后将末项的值改为与倒数第二项相同的值。
Ⅱ.若末分隔符等级为0或数组仅有一个数而末项等级>0，则将末项等级-1。
Ⅲ.若二者等级均为0，则将二者都删去。
Ⅳ.若二者等级均>0，则将末项等级-1，然后寻找数组中最靠后的比末分隔符等级低的分隔符A，在后面添加一个比末分隔符低一级的分隔符以及原数组的(A,倒数第二项]。若找不到这样的分隔符，则视为它在数组最前面并且隐形。
Ⅴ.若数组中只有一个分隔符且末项等级为0，那么将它们删去。'''优先级最高'''
若经过变换的末数组的n级子数组在后面去掉连续的部分后与前面某数组的n级子数组在数和分隔符上都相同，那么进入3）。如果直到n=-1都没能找到前面部分与末数组相同的数组，那么进入4）。

例如，(2,1/1)根据Ⅲ变为(2,1)；(2,1/2/2)根据Ⅱ变为(2,1/2/1)，(2,1/2,1)根据Ⅳ变为(2,1/2/2)，(3,,3,1)根据Ⅰ变为(3,,3/3)，(2,2,2)根据Ⅳ变为(2,2,1/2,2)，(2,1)根据Ⅴ变为(2)。

3）今有若干数组、&的n级子数组#、#、#……#、#$，其中#不为空，且均为类似构造的数组中最靠后的：
①若$为空，那么坏根为&_i并进入④。否则进入②。
②若任意%_j在字典序上都大于等于$，那么坏根为并进入④。否则进入③。
③找到最大的j，使得%_j的字典序小于$，坏根为&_j并进入④。
④进入5）。
4）定义阶伸项Q为{原末数组，其中末项-1}∪{(原末数组的末项-2)级分隔符}，坏部B为[表达式第二个数组，表达式倒数第二个数组]，好部G为首数组(1)，展开为G+B+QB+QQB+QQQB……其中QB指在B中的每个数组前都添加一个Q。

5）定义坏部B为[坏根，表达式倒数第二个数组]，好部G为[表达式首项，坏根)，阶伸项Q为将(坏根与经过1）或2）操作的末数组相比缺少的部分)还原为数组的结果。
Ⅰ.对于坏部中原本属于3）中提到的&_i中的数组，每次复制时将Q放在坏根的对应位置之后。此时Q的开头一定是分隔符，末尾一定是数。
Ⅱ.对于坏部中不是原本属于3）中提到的&_i中的数组：
①若某数组可以找到与坏根前面部分相同的n级子数组，那么不对它做任何操作，直接添加阶伸项。
②若某数组不能找到与坏根前面部分相同的n级子数组，在它们前面都添加坏根的内容，中间的分隔符等级与坏根的末项等级相同，然后在复制时将Q放在坏根的对应位置之后。
例如坏部为(2,1)(2,2)(2,1/2)时，将(2,2)改为(2,1/2,2)，(2,1)和(2,1/2)不变。Q=(/2/1)，坏根为(2,1)时，坏部的(2,1/2)一次复制后变为(2,1 /2/1 /2)，坏部的(2,2)变为(2,1 /2/1 /2,2)。

6）坏根寻找方法同3）。定义阶伸项Q为坏根与原末数组相比缺少的部分，坏部B为{原末数组，其中末项-1}，好部G为首数组(1)，展开为G+B+QB+QQB+QQQB……其中QB指在B中的每个数组前都添加一个Q。

7）无论通过4）、5）还是6）展开的表达式，都要保证每个数组的第一个分隔符等级不为0。如果为0，那么将其改为1级分隔符。

TrSS

2025-08-19T11:38:09Z

油手就行：

== Tree Sequence System ==
=== 零．前言 ===
TrSS全称Tree Sequence System，是由树状结构启发而制作的记号。记号的表达式是一个树列，为方便呈现，将树列改写为数组列形式，本文档所述为数组列展开规则，但TrSS本身并不是矩阵。本文档中绿色小字体为注释或举例，红色字体为重要内容。
TrSS是由数组作为项组成的序列，每个数组由正整数和分隔符组成。序列的第一个数组必须为(1)。数和分隔符都有等级，对于数n+1，其等级为n。分隔符有ω种，对于i，i级分隔符为i个连续的逗号；特别的，0级分隔符为“/”。数后面的分隔符等级不能高于数的等级，否则不合法。
每个合法数组都可以被绘制为树，绘制这样的树有三种操作：①向上一步；②从原地开始向上画k个依次相连的节点；③向右一步。从数组的首项开始，每遇到一个数k就执行②一次，每遇到一个n级分隔符就执行③一次，然后执行① n次。每执行一次①或③，就要在新到达的位置和原来的位置中间画一条边。如果一个分隔符后面的数是0，那么删去0及该分隔符。
数组之间比较字典序时，将其视为(a1 分隔符 a2 分隔符……)(b1 分隔符 b2 分隔符……)的形式依次比较对应的数或分隔符，高等级分隔符>低等级分隔符。例如，(2,2,1)>(2,2/1)。
符号指代范围（重要）：
i、j、k正整数 m、n 、p自然数 a_i、b_i、c_i数列的第i项 %、#、$、&任意合法表达式/数组 A、B、C 任意分隔符
TrSS的极限表达式为(1)(ω)。作为新型记号的首次尝试，此记号可能有不完善之处，请指出并联系我修改。
油手就行
更新日志：
2025.8.18 TrSS v1.0
TrSS正式被定义。
2025.8.19 TrSS v1.1
修改了寻找坏根的方法。
=== 一．前置定义 ===
1.子数组：
1）一个数组的-1级子数组是它本身。
2）从m=0开始，将每个数组的每个(m-1)级子数组按其中的m级分隔符分开，分开后的部分称为原数组的m级子数组。如果数组的m级子数组内仍有分隔符，那么进入3）；如果数组的m级子数组内没有分隔符，那么流程结束。（展开时用到的子数组不一定是最高等级的）
3）使m的值+1，然后回到2）
(2,1/2/1)的0级子数组为(2,1)(/2)(/1)，1级子数组为(2)(,1)(/2)(/1)
2.元素：数组(的子数组)的元素是其中的所有数和分隔符。
3.末数组：表达式中最后一个数组。
4.末项/分隔符：数组中最后一个数/分隔符。
=== 二．展开流程 ===
1.#(1)=#+1
2.在末数组不为(1)时：
1）从n=(表达式中出现的最高等级分隔符的等级)开始，取每个数组的n级子数组。
①若末数组的n级子数组在后面去掉连续的部分后与前面某数组的n级子数组在数和分隔符上都相同，那么使末数组的末项等级-1，此时：
Ⅰ.若末项和末分隔符等级都为0，则将二者都删去。
Ⅱ.若末分隔符等级>0而末项等级为0，则将分隔符等级-1，然后将末项的值改为与倒数第二项相同的值。
然后进入6），否则进入②。如果直到n=-1都没能找到前面部分与末数组相同的数组，那么进入2）。
②使n的值-1并回到①。
(2,1/2)和(2,1/2)的-1级子数组相同，和(2,1/2/2)的0级子数组部分相同
# 有序列表项

2）将末数组的末项和末分隔符中不为0的元素等级-1。
Ⅰ.若末分隔符等级>0而末项等级为0，则将分隔符等级-1，然后将末项的值改为与倒数第二项相同的值。
Ⅱ.若末分隔符等级为0或数组仅有一个数而末项等级>0，则将末项等级-1。
Ⅲ.若二者等级均为0，则将二者都删去。
Ⅳ.若二者等级均>0，则将末项等级-1，然后寻找数组中最靠后的比末分隔符等级低的分隔符A，在后面添加一个比末分隔符低一级的分隔符以及原数组的(A,倒数第二项]。若找不到这样的分隔符，则视为它在数组最前面并且隐形。
Ⅴ.若数组中只有一个分隔符且末项等级为0，那么将它们删去。'''优先级最高'''
若经过变换的末数组的n级子数组在后面去掉连续的部分后与前面某数组的n级子数组在数和分隔符上都相同，那么进入3）。如果直到n=-1都没能找到前面部分与末数组相同的数组，那么进入4）。

例如，(2,1/1)根据Ⅲ变为(2,1)；(2,1/2/2)根据Ⅱ变为(2,1/2/1)，(2,1/2,1)根据Ⅳ变为(2,1/2/2)，(3,,3,1)根据Ⅰ变为(3,,3/3)，(2,2,2)根据Ⅳ变为(2,2,1/2,2)，(2,1)根据Ⅴ变为(2)。

3）今有若干数组、&的n级子数组#、#、#……#、#$，其中#不为空，且均为类似构造的数组中最靠后的：
①若$为空，那么坏根为&_i并进入④。否则进入②。
②若任意%_j在字典序上都大于等于$，那么坏根为并进入④。否则进入③。
③找到最大的j，使得%_j的字典序小于$，坏根为&_j并进入④。
④进入5）。
4）定义阶伸项Q为{原末数组，其中末项-1}∪{(原末数组的末项-2)级分隔符}，坏部B为[表达式第二个数组，表达式倒数第二个数组]，好部G为首数组(1)，展开为G+B+QB+QQB+QQQB……其中QB指在B中的每个数组前都添加一个Q。
5）定义坏部B为[坏根，表达式倒数第二个数组]，好部G为[表达式首项，坏根)，阶伸项Q为将(坏根与经过1）或2）操作的末数组相比缺少的部分)还原为数组的结果。
Ⅰ.对于坏部中原本属于3）中提到的&_i中的数组，每次复制时将Q放在坏根的对应位置之后。此时Q的开头一定是分隔符，末尾一定是数。
Ⅱ.对于坏部中不是原本属于3）中提到的&_i中的数组：
①若某数组可以找到与坏根前面部分相同的n级子数组，那么不对它做任何操作，直接添加阶伸项。
②若某数组不能找到与坏根前面部分相同的n级子数组，在它们前面都添加坏根的内容，中间的分隔符等级与坏根的末项等级相同，然后在复制时将Q放在坏根的对应位置之后。
例如坏部为(2,1)(2,2)(2,1/2)时，将(2,2)改为(2,1/2,2)，(2,1)和(2,1/2)不变。Q=(/2/1)，坏根为(2,1)时，坏部的(2,1/2)一次复制后变为(2,1 /2/1 /2)，坏部的(2,2)变为(2,1 /2/1 /2,2)。
6）坏根寻找方法同3）。定义阶伸项Q为坏根与原末数组相比缺少的部分，坏部B为{原末数组，其中末项-1}，好部G为首数组(1)，展开为G+B+QB+QQB+QQQB……其中QB指在B中的每个数组前都添加一个Q。
7）无论通过4）、5）还是6）展开的表达式，都要保证每个数组的第一个分隔符等级不为0。如果为0，那么将其改为1级分隔符。

TrSS

2025-08-19T11:34:04Z

油手就行：创建页面，内容为“== Tree Sequence System(TrSS) designed by Ysjs ver1.1 == === 零．前言 === TrSS全称Tree Sequence System，是由树状结构启发而制作的记号。记号的表达式是一个树列，为方便呈现，将树列改写为数组列形式，本文档所述为数组列展开规则，但TrSS本身并不是矩阵。本文档中绿色小字体为注释或举例，红色字体为重要内容。 TrSS是由数组作为项组成的序列，每个数组由正整数…”

== Tree Sequence System(TrSS) designed by Ysjs ver1.1 ==
=== 零．前言 ===
TrSS全称Tree Sequence System，是由树状结构启发而制作的记号。记号的表达式是一个树列，为方便呈现，将树列改写为数组列形式，本文档所述为数组列展开规则，但TrSS本身并不是矩阵。本文档中绿色小字体为注释或举例，红色字体为重要内容。
TrSS是由数组作为项组成的序列，每个数组由正整数和分隔符组成。序列的第一个数组必须为(1)。数和分隔符都有等级，对于数n+1，其等级为n。分隔符有ω种，对于i，i级分隔符为i个连续的逗号；特别的，0级分隔符为“/”。数后面的分隔符等级不能高于数的等级，否则不合法。
每个合法数组都可以被绘制为树，绘制这样的树有三种操作：①向上一步；②从原地开始向上画k个依次相连的节点；③向右一步。从数组的首项开始，每遇到一个数k就执行②一次，每遇到一个n级分隔符就执行③一次，然后执行① n次。每执行一次①或③，就要在新到达的位置和原来的位置中间画一条边。如果一个分隔符后面的数是0，那么删去0及该分隔符。
数组之间比较字典序时，将其视为(a1 分隔符 a2 分隔符……)(b1 分隔符 b2 分隔符……)的形式依次比较对应的数或分隔符，高等级分隔符>低等级分隔符。
例如，(2,2,1)>(2,2/1)
符号指代范围（重要）：
i、j、k正整数 m、n 、p自然数 a_i、b_i、c_i数列的第i项 %、#、$、&任意合法表达式/数组 A、B、C 任意分隔符
TrSS的极限表达式为(1)(ω)。
作为新型记号的首次尝试，此记号可能有不完善之处，请指出并联系我修改。
油手就行
更新日志：
2025.8.18 TrSS v1.0
TrSS正式被定义。
2025.8.19 TrSS v1.1
修改了寻找坏根的方法。
=== 一．前置定义 ===
1.子数组：
1）一个数组的-1级子数组是它本身。
2）从m=0开始，将每个数组的每个(m-1)级子数组按其中的m级分隔符分开，分开后的部分称为原数组的m级子数组。如果数组的m级子数组内仍有分隔符，那么进入3）；如果数组的m级子数组内没有分隔符，那么流程结束。（展开时用到的子数组不一定是最高等级的）
3）使m的值+1，然后回到2）
(2,1/2/1)的0级子数组为(2,1)(/2)(/1)，1级子数组为(2)(,1)(/2)(/1)
2.元素：数组(的子数组)的元素是其中的所有数和分隔符。
3.末数组：表达式中最后一个数组。
4.末项/分隔符：数组中最后一个数/分隔符。
=== 二．展开流程 ===
1.#(1)=#+1
2.在末数组不为(1)时：
1）从n=(表达式中出现的最高等级分隔符的等级)开始，取每个数组的n级子数组。
①若末数组的n级子数组在后面去掉连续的部分后与前面某数组的n级子数组在数和分隔符上都相同，那么使末数组的末项等级-1，此时：
Ⅰ.若末项和末分隔符等级都为0，则将二者都删去。
Ⅱ.若末分隔符等级>0而末项等级为0，则将分隔符等级-1，然后将末项的值改为与倒数第二项相同的值。
然后进入6），否则进入②。如果直到n=-1都没能找到前面部分与末数组相同的数组，那么进入2）。
②使n的值-1并回到①。
(2,1/2)和(2,1/2)的-1级子数组相同，和(2,1/2/2)的0级子数组部分相同
# 有序列表项

2）将末数组的末项和末分隔符中不为0的元素等级-1。
Ⅰ.若末分隔符等级>0而末项等级为0，则将分隔符等级-1，然后将末项的值改为与倒数第二项相同的值。
Ⅱ.若末分隔符等级为0或数组仅有一个数而末项等级>0，则将末项等级-1。
Ⅲ.若二者等级均为0，则将二者都删去。
Ⅳ.若二者等级均>0，则将末项等级-1，然后寻找数组中最靠后的比末分隔符等级低的分隔符A，在后面添加一个比末分隔符低一级的分隔符以及原数组的(A,倒数第二项]。若找不到这样的分隔符，则视为它在数组最前面并且隐形。
Ⅴ.若数组中只有一个分隔符且末项等级为0，那么将它们删去。优先级最高
若经过变换的末数组的n级子数组在后面去掉连续的部分后与前面某数组的n级子数组在数和分隔符上都相同，那么进入3）。如果直到n=-1都没能找到前面部分与末数组相同的数组，那么进入4）。

(2,1/1)根据Ⅲ变为(2,1)；(2,1/2/2)根据Ⅱ变为(2,1/2/1)，(2,1/2,1)根据Ⅳ变为(2,1/2/2)，(3,,3,1)根据Ⅰ变为(3,,3/3)，(2,2,2)根据Ⅳ变为(2,2,1/2,2)，(2,1)根据Ⅴ变为(2)

3）今有若干数组、&的n级子数组#、#、#……#、#$，其中#不为空，且均为类似构造的数组中最靠后的：
①若$为空，那么坏根为&_i并进入④。否则进入②。
②若任意%_j在字典序上都大于等于$，那么坏根为并进入④。否则进入③。
③找到最大的j，使得%_j的字典序小于$，坏根为&_j并进入④。
④进入5）。
4）定义阶伸项Q为{原末数组，其中末项-1}∪{(原末数组的末项-2)级分隔符}，坏部B为[表达式第二个数组，表达式倒数第二个数组]，好部G为首数组(1)，展开为G+B+QB+QQB+QQQB……其中QB指在B中的每个数组前都添加一个Q。
5）定义坏部B为[坏根，表达式倒数第二个数组]，好部G为[表达式首项，坏根)，阶伸项Q为将(坏根与经过1）或2）操作的末数组相比缺少的部分)还原为数组的结果。
Ⅰ.对于坏部中原本属于3）中提到的&_i中的数组，每次复制时将Q放在坏根的对应位置之后。此时Q的开头一定是分隔符，末尾一定是数。
Ⅱ.对于坏部中不是原本属于3）中提到的&_i中的数组：
①若某数组可以找到与坏根前面部分相同的n级子数组，那么不对它做任何操作，直接添加阶伸项。
②若某数组不能找到与坏根前面部分相同的n级子数组，在它们前面都添加坏根的内容，中间的分隔符等级与坏根的末项等级相同，然后在复制时将Q放在坏根的对应位置之后。
坏部为(2,1)(2,2)(2,1/2)，将(2,2)改为(2,1/2,2)，(2,1)和(2,1/2)不变。
Q=(/2/1)，坏根为(2,1)时，坏部的(2,1/2)一次复制后变为(2,1 /2/1 /2)，坏部的(2,2)变为(2,1 /2/1 /2,2)
6）坏根寻找方法同3）。定义阶伸项Q为坏根与原末数组相比缺少的部分，坏部B为{原末数组，其中末项-1}，好部G为首数组(1)，展开为G+B+QB+QQB+QQQB……其中QB指在B中的每个数组前都添加一个Q。
7）无论通过4）、5）还是6）展开的表达式，都要保证每个数组的第一个分隔符等级不为0。如果为0，那么将其改为1级分隔符。