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以下为长初等序列序数折叠函数(LPrSSψ)的分析。LPrSSψ与BOCF在BHO前完全一致,但强度大得多,可达(0)(1,1,1)(2,2,1)(3)以上。 == 分析1:BHO~BO == 此阶段分析很简单,仅需将每一层从对应的ψ拆出来即可。 {| class="wikitable" |+分析1:BHO~BO !LPrSSψ !BOCF !BMS |- |<math>\psi(\psi_1(\Omega_2))=\psi(\varepsilon_{\Omega+1})</math> |<math>\psi(\Omega_2)</math> |(0)(1,1)(2,2) |- |<math>\psi(\psi_1(\Omega_2)+1)</math> |<math>\psi(\Omega_2+1)</math> |(0)(1,1)(2,2)(1) |- |<math>\psi(\psi_1(\Omega_2)+\Omega)</math> |<math>\psi(\Omega_2+\Omega)</math> |(0)(1,1)(2,2)(1,1) |- |<math>\psi(\psi_1(\Omega_2)\times2)</math> |<math>\psi(\Omega_2+\psi_1(\Omega_2))</math> |(0)(1,1)(2,2)(1,1)(2,2) |- |<math>\psi(\psi_1(\Omega_2)\times3)</math> |<math>\psi(\Omega_2+\psi_1(\Omega_2)\times2)</math> |(0)(1,1)(2,2)(1,1)(2,2)(1,1)(2,2) |- |<math>\psi(\psi_1(\Omega_2+1))</math> |<math>\psi(\Omega_2+\psi_1(\Omega_2+1))</math> |(0)(1,1)(2,2)(2) |- |<math>\psi(\psi_1(\Omega_2+\omega))</math> |<math>\psi(\Omega_2+\psi_1(\Omega_2+\omega))</math> |(0)(1,1)(2,2)(2)(3) |- |<math>\psi(\psi_1(\Omega_2+\Omega))</math> |<math>\psi(\Omega_2+\psi_1(\Omega_2+\Omega))</math> |(0)(1,1)(2,2)(2,1) |- |<math>\psi(\psi_1(\Omega_2+\psi_1(\Omega_2)))</math> |<math>\psi(\Omega_2+\psi_1(\Omega_2+\psi_1(\Omega_2)))</math> |(0)(1,1)(2,2)(2,1)(3,2) |- |<math>\psi(\psi_1(\Omega_2+\psi_1(\Omega_2+\psi_1(\Omega_2))))</math> |<math>\psi(\Omega_2+\psi_1(\Omega_2+\psi_1(\Omega_2+\psi_1(\Omega_2))))</math> |(0)(1,1)(2,2)(2,1)(3,2)(3,1)(4,2) |- |<math>\psi(\psi_1(\Omega_22))=\psi(\varepsilon_{\Omega+2})</math> |<math>\psi(\Omega_22)</math> |(0)(1,1)(2,2)(2,2) |- |<math>\psi(\psi_1(\Omega_22)\times2)</math> |<math>\psi(\Omega_22+\psi_1(\Omega_22))</math> |(0)(1,1)(2,2)(2,2)(1,1)(2,2)(2,2) |- |<math>\psi(\psi_1(\Omega_22+1))</math> |<math>\psi(\Omega_22+\psi_1(\Omega_22+1))</math> |(0)(1,1)(2,2)(2,2)(2) |- |<math>\psi(\psi_1(\Omega_23))</math> |<math>\psi(\Omega_23)</math> |(0)(1,1)(2,2)(2,2)(2,2) |- |<math>\psi(\psi_1(\Omega_2\omega))=\psi(\varepsilon_{\Omega+\omega})</math> |<math>\psi(\Omega_2\omega)</math> |(0)(1,1)(2,2)(3) |- |<math>\psi(\psi_1(\Omega_2\Omega))=\psi(\varepsilon_{\Omega2})</math> |<math>\psi(\Omega_2\Omega)</math> |(0)(1,1)(2,2)(3,1) |- |<math>\psi(\psi_1(\Omega_2\times\psi_1(\Omega_2)))=\psi(\varepsilon_{\varepsilon_{\Omega+1}})</math> |<math>\psi(\Omega_2\times\psi_1(\Omega_2))</math> |(0)(1,1)(2,2)(3,1)(4,2) |- |<math>\psi(\psi_1(\Omega_2^2))=\psi(\zeta_{\Omega+1})</math> |<math>\psi(\Omega_2^2)</math> |(0)(1,1)(2,2)(3,2) |- |<math>\psi(\psi_1(\Omega_2^2)\times2)</math> |<math>\psi(\Omega_2^2+\psi_1(\Omega_2^2))</math> |(0)(1,1)(2,2)(3,2)(1,1)(2,2)(3,2) |- |<math>\psi(\psi_1(\Omega_2^2+\Omega_2))</math> |<math>\psi(\Omega_2^2+\Omega_2)</math> |(0)(1,1)(2,2)(3,2)(2,2) |- |<math>\psi(\psi_1(\Omega_2^22))</math> |<math>\psi(\Omega_2^22)</math> |(0)(1,1)(2,2)(3,2)(2,2)(3,2) |- |<math>\psi(\psi_1(\Omega_2^3))</math> |<math>\psi(\Omega_2^3)</math> |(0)(1,1)(2,2)(3,2)(3,2) |- |<math>\psi(\psi_1(\Omega_2^\omega))=\psi(\varphi(\omega,\Omega+1))</math> |<math>\psi(\Omega_2^\omega)</math> |(0)(1,1)(2,2)(3,2)(4) |- |<math>\psi(\psi_1(\Omega_2^\Omega))=\psi(\varphi(\Omega,1))</math> |<math>\psi(\Omega_2^\Omega)</math> |(0)(1,1)(2,2)(3,2)(4,1) |- |<math>\psi(\psi_1(\Omega_2^{\psi_1(\Omega_2)}))</math> |<math>\psi(\Omega_2^{\psi_1(\Omega_2)})</math> |(0)(1,1)(2,2)(3,2)(4,1)(5,2) |- |<math>\psi(\psi_1(\Omega_2^{\Omega_2}))=\psi(\Gamma_{\Omega+1})</math> |<math>\psi(\Omega_2^{\Omega_2})</math> |(0)(1,1)(2,2)(3,2)(4,2) |- |<math>\psi(\psi_1(\Omega_2\uparrow\uparrow3))</math> |<math>\psi(\Omega_2\uparrow\uparrow3)</math> |(0)(1,1)(2,2)(3,2)(4,2)(5,2) |- |<math>\psi(\psi_1(\psi_2(\Omega_3)))=\psi(\psi_1(\varepsilon_{\Omega_2+1}))</math> |<math>\psi(\Omega_3)</math> |(0)(1,1)(2,2)(3,3) |- |<math>\psi(\psi_1(\psi_2(\Omega_3))\times2)</math> |<math>\psi(\Omega_3+\psi_1(\Omega_3))</math> |(0)(1,1)(2,2)(3,3)(1,1)(2,2)(3,3) |- |<math>\psi(\psi_1(\psi_2(\Omega_3)+1))</math> |<math>\psi(\Omega_3+\psi_1(\Omega_3+1))</math> |(0)(1,1)(2,2)(3,3)(2) |- |<math>\psi(\psi_1(\psi_2(\Omega_3)+\Omega_2))</math> |<math>\psi(\Omega_3+\Omega_2)</math> |(0)(1,1)(2,2)(3,3)(2,2) |- |<math>\psi(\psi_1(\psi_2(\Omega_3)\times2))</math> |<math>\psi(\Omega_3+\psi_2(\Omega_3))</math> |(0)(1,1)(2,2)(3,3)(2,2)(3,3) |- |<math>\psi(\psi_1(\psi_2(\Omega_3+1)))</math> |<math>\psi(\Omega_3+\psi_2(\Omega_3+1))</math> |(0)(1,1)(2,2)(3,3)(3) |- |<math>\psi(\psi_1(\psi_2(\Omega_3+\Omega_2)))</math> |<math>\psi(\Omega_3+\psi_2(\Omega_3+\Omega_2))</math> |(0)(1,1)(2,2)(3,3)(3,2) |- |<math>\psi(\psi_1(\psi_2(\Omega_3+\psi_2(\Omega_3))))</math> |<math>\psi(\Omega_3+\psi_2(\Omega_3+\psi_2(\Omega_3)))</math> |(0)(1,1)(2,2)(3,3)(3,2)(4,3) |- |<math>\psi(\psi_1(\psi_2(\Omega_32)))</math> |<math>\psi(\Omega_32)</math> |(0)(1,1)(2,2)(3,3)(3,3) |- |<math>\psi(\psi_1(\psi_2(\Omega_3\omega)))</math> |<math>\psi(\Omega_3\omega)</math> |(0)(1,1)(2,2)(3,3)(4) |- |<math>\psi(\psi_1(\psi_2(\Omega_3^2)))</math> |<math>\psi(\Omega_3^2)</math> |(0)(1,1)(2,2)(3,3)(4,3) |- |<math>\psi(\psi_1(\psi_2(\Omega_3^{\Omega_3})))</math> |<math>\psi(\Omega_3^{\Omega_3})</math> |(0)(1,1)(2,2)(3,3)(4,3)(5,3) |- |<math>\psi(\psi_1(\psi_2(\psi_3(\Omega_4))))</math> |<math>\psi(\Omega_4)</math> |(0)(1,1)(2,2)(3,3)(4,4) |- |<math>\psi(\psi_1(\psi_2(\psi_3(\psi_4(\Omega_5)))))</math> |<math>\psi(\Omega_5)</math> |(0)(1,1)(2,2)(3,3)(4,4)(5,5) |- |<math>\psi(\Omega_2)=\psi(\psi_1(\psi_2(\psi_3(\psi_4(...)))))</math> |<math>\psi(\Omega_\omega)</math> |(0)(1,1,1) |} == 分析2:BO~(0)(1,1,1)(2,1) == 到(0)(1,1,1)(2,1)的分析仍较简单,仅需找层即可,但此后,LPrSSψ的行为更类似BMS,而不是BOCF,因为具有(0)(1,1,1)(2,1)(1,1,1)提升。 {| class="wikitable" |+分析2:BO~FBLO !LPrSSψ !BOCF !BMS |- |<math>\psi(\Omega_2)</math> |<math>\psi(\Omega_\omega)</math> |(0)(1,1,1) |- |<math>\psi(\Omega_2+1)</math> |<math>\psi(\Omega_\omega+1)</math> |(0)(1,1,1)(1) |- |<math>\psi(\Omega_2+\Omega)</math> |<math>\psi(\Omega_\omega+\Omega)</math> |(0)(1,1,1)(1,1) |- |<math>\psi(\Omega_2+\psi_1(\Omega_2))</math> |<math>\psi(\Omega_\omega+\psi_1(\Omega_2))</math> |(0)(1,1,1)(1,1)(2,2) |- |<math>\psi(\Omega_2+\psi_1(\psi_2(\Omega_3)))</math> |<math>\psi(\Omega_\omega+\psi_1(\Omega_3))</math> |(0)(1,1,1)(1,1)(2,2)(3,3) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3))=\psi(\Omega_2+\psi_1(\psi_2(\psi_3(...))))</math> |<math>\psi(\Omega_\omega+\psi_1(\Omega_\omega))</math> |(0)(1,1,1)(1,1)(2,2,1) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3)\times2)</math> |<math>\psi(\Omega_\omega+\psi_1(\Omega_\omega)\times2)</math> |(0)(1,1,1)(1,1)(2,2,1)(1,1)(2,2,1) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3+1))</math> |<math>\psi(\Omega_\omega+\psi_1(\Omega_\omega+1))</math> |(0)(1,1,1)(1,1)(2,2,1)(2) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3+\Omega))</math> |<math>\psi(\Omega_\omega+\psi_1(\Omega_\omega+\Omega))</math> |(0)(1,1,1)(1,1)(2,2,1)(2,1) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3+\psi_1(\Omega_2)))</math> |<math>\psi(\Omega_\omega+\psi_1(\Omega_\omega+\psi_1(\Omega_2)))</math> |(0)(1,1,1)(1,1)(2,2,1)(2,1)(3,2) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3+\psi_1(\Omega_3)))</math> |<math>\psi(\Omega_\omega+\psi_1(\Omega_\omega+\psi_1(\Omega_\omega)))</math> |(0)(1,1,1)(1,1)(2,2,1)(2,1)(3,2,1) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3+\Omega_2))</math> |<math>\psi(\Omega_\omega+\Omega_2)</math> |(0)(1,1,1)(1,1)(2,2,1)(2,2) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3+\Omega_22))</math> |<math>\psi(\Omega_\omega+\Omega_22)</math> |(0)(1,1,1)(1,1)(2,2,1)(2,2)(2,2) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3+\Omega_2^2))</math> |<math>\psi(\Omega_\omega+\Omega_2^2)</math> |(0)(1,1,1)(1,1)(2,2,1)(2,2)(3,2) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3+\psi_2(\Omega_3)))</math> |<math>\psi(\Omega_\omega+\psi_2(\Omega_3))</math> |(0)(1,1,1)(1,1)(2,2,1)(2,2)(3,3) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3+\psi_2(\Omega_4)))</math> |<math>\psi(\Omega_\omega+\psi_2(\Omega_\omega))</math> |(0)(1,1,1)(1,1)(2,2,1)(2,2)(3,3,1) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3+\psi_2(\Omega_4+\Omega_3)))</math> |<math>\psi(\Omega_\omega+\Omega_3)</math> |(0)(1,1,1)(1,1)(2,2,1)(2,2)(3,3,1)(3,3) |- |<math>\psi(\Omega_2+\psi_1(\Omega_3+\psi_2(\Omega_4+\psi_3(\Omega_5))))</math> |<math>\psi(\Omega_\omega+\psi_3(\Omega_\omega))</math> |(0)(1,1,1)(1,1)(2,2,1)(2,2)(3,3,1)(3,3)(4,4,1) |- |<math>\psi(\Omega_22)=\psi(\Omega_2+\psi_1(\Omega_3+\psi_2(\Omega_4+\psi_3(\Omega_5+...))))</math> |<math>\psi(\Omega_\omega2)</math> |(0)(1,1,1)(1,1,1) |- |<math>\psi(\Omega_22+\psi_1(\Omega_3))</math> |<math>\psi(\Omega_\omega2+\psi_1(\Omega_\omega))</math> |(0)(1,1,1)(1,1,1)(1,1)(2,2,1) |- |<math>\psi(\Omega_22+\psi_1(\Omega_32))</math> |<math>\psi(\Omega_\omega2+\psi_1(\Omega_\omega2))</math> |(0)(1,1,1)(1,1,1)(1,1)(2,2,1)(2,2,1) |- |<math>\psi(\Omega_22+\psi_1(\Omega_32+\Omega_2))</math> |<math>\psi(\Omega_\omega2+\Omega_2)</math> |(0)(1,1,1)(1,1,1)(1,1)(2,2,1)(2,2,1)(2,2) |- |<math>\psi(\Omega_23)</math> |<math>\psi(\Omega_\omega3)</math> |(0)(1,1,1)(1,1,1)(1,1,1) |- |<math>\psi(\Omega_2\omega)</math> |<math>\psi(\Omega_\omega\omega)</math> |(0)(1,1,1)(2) |- |<math>\psi(\Omega_2\times(\omega+1))</math> |<math>\psi(\Omega_\omega\times(\omega+1))</math> |(0)(1,1,1)(2)(1,1,1) |- |<math>\psi(\Omega_2\times\varepsilon_0)</math> |<math>\psi(\Omega_\omega\times\varepsilon_0)</math> |(0)(1,1,1)(2)(3,1) |- |<math>\psi(\Omega_2\times\psi(\Omega_2))</math> |<math>\psi(\Omega_\omega\times\psi(\Omega_\omega))</math> |(0)(1,1,1)(2)(3,1,1) |- |<math>\psi(\Omega_2\Omega)</math> |<math>\psi(\Omega_\omega\Omega)</math> |(0)(1,1,1)(2,1) |} == 分析3:(0)(1,1,1)(2,1)~(0)(1,1,1)(2,1)(1,1,1) == 分析进入提升阶段。可见LPrSSψ中,ψ中的一个Ω_2对应的不是BOCF中的一个Ω_ω,而是BMS中的一个(1,1,1)。类似的,BGO前许多阶差2的表达式对应BMS第三行的1。这里注意LPrSSψ一般不单独定义Ω_0,展开方式,Ω_2展开出ψ_1时,把外面的Ω变成了里面的Ω_2,以此类推,但ω不提升。因为阶差为d时,Ω_(n+1)变出的ψ_n只把外面的x>=n的Ω_x提升为Ω_(x+d)。不然,若定义Ω_0=ω,并在这种位置将其提升为Ω,会与没有【特别地,如果坏根中元素不是坏部中某项的祖先项,则该项在复制过程中将保持不变。】规则的BMS一样,发生无穷降链。此外,若无此种提升,可能可以得到类似IBMS的ILPrSSψ。 {| class="wikitable" |+分析3:(0)(1,1,1)(2,1)~(0)(1,1,1)(2,1)(1,1,1) !LPrSSψ !BOCF !BMS |- |<math>\psi(\Omega_2\Omega)</math> |<math>\psi(\Omega_\omega\Omega)</math> |(0)(1,1,1)(2,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3))</math> |<math>\psi(\Omega_\omega\Omega+\psi_1(\Omega_\omega))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega))</math> |<math>\psi(\Omega_\omega\Omega+\psi_1(\Omega_\omega\Omega))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega+1))</math> |<math>\psi(\Omega_\omega\Omega+\psi_1(\Omega_\omega\Omega+1))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(2) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega+\Omega))</math> |<math>\psi(\Omega_\omega\Omega+\psi_1(\Omega_\omega\Omega+\Omega))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(2,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega+\psi_1(\Omega_3\Omega)))</math> |<math>\psi(\Omega_\omega\Omega+\psi_1(\Omega_\omega\Omega+\psi_1(\Omega_\omega\Omega)))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(2,1)(3,2,1)(4,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega+\Omega_2))</math> |<math>\psi(\Omega_\omega\Omega+\Omega_2)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(2,2) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega+\psi_2(\Omega_4)))</math> |<math>\psi(\Omega_\omega\Omega+\psi_2(\Omega_\omega))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(2,2)(3,3,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega+\psi_2(\Omega_4\Omega)))</math> |<math>\psi(\Omega_\omega\Omega+\psi_2(\Omega_\omega\Omega))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(2,2)(3,3,1)(4,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega+\psi_2(\Omega_4\Omega+\Omega_3)))</math> |<math>\psi(\Omega_\omega\Omega+\Omega_3)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(2,2)(3,3,1)(4,1)(3,3) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\times(\Omega+1)))=\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega+\psi_2(\Omega_4\Omega+...)))</math> |<math>\psi(\Omega_\omega\times(\Omega+1))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(2,2,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\times(\Omega+2)))</math> |<math>\psi(\Omega_\omega\times(\Omega+2))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(2,2,1)(2,2,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\times(\Omega+\omega)))</math> |<math>\psi(\Omega_\omega\times(\Omega+\omega))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(2,2,1)(3) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\times\Omega2))</math> |<math>\psi(\Omega_\omega\times\Omega2)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(2,2,1)(3,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\times\Omega\omega))</math> |<math>\psi(\Omega_\omega\times\Omega\omega)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(3) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\times\Omega^2))</math> |<math>\psi(\Omega_\omega\times\Omega^2)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(3,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\times\Omega^\omega))</math> |<math>\psi(\Omega_\omega\times\Omega^\omega)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(4) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\times\Omega^\Omega))</math> |<math>\psi(\Omega_\omega\times\Omega^\Omega)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(4,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\times\psi_1(\Omega_2)))</math> |<math>\psi(\Omega_\omega\times\psi_1(\Omega_2))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(4,2) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\times\psi_1(\Omega_3)))</math> |<math>\psi(\Omega_\omega\times\psi_1(\Omega_\omega))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(4,2,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\times\psi_1(\Omega_3\times\psi_1(\Omega_3))))</math> |<math>\psi(\Omega_\omega\times\psi_1(\Omega_\omega\times\psi_1(\Omega_\omega)))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,1)(4,2,1)(5,1)(6,2,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2))</math> |<math>\psi(\Omega_\omega\Omega_2)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\Omega_2))</math> |<math>\psi(\Omega_\omega\Omega_2+\Omega_2)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\psi_2(\Omega_3)))</math> |<math>\psi(\Omega_\omega\Omega_2+\psi_2(\Omega_3))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2)(3,3) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\psi_2(\Omega_4)))</math> |<math>\psi(\Omega_\omega\Omega_2+\psi_2(\Omega_\omega))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2)(3,3,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\psi_2(\Omega_4\Omega)))</math> |<math>\psi(\Omega_\omega\Omega_2+\psi_2(\Omega_\omega\Omega))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2)(3,3,1)(4,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\psi_2(\Omega_4\Omega_2)))</math> |<math>\psi(\Omega_\omega\Omega_2+\psi_2(\Omega_\omega\Omega_2))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2)(3,3,1)(4,2) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\psi_2(\Omega_4\Omega_2+\Omega_3)))</math> |<math>\psi(\Omega_\omega\Omega_2+\Omega_3)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2)(3,3,1)(4,2)(3,3) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\psi_2(\Omega_4\times(\Omega_2+1))))</math> |<math>\psi(\Omega_\omega\times(\Omega_2+1))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2)(3,3,1)(4,2)(3,3,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\psi_2(\Omega_4\times\Omega_22)))</math> |<math>\psi(\Omega_\omega\times\Omega_22)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2)(3,3,1)(4,2)(3,3,1)(4,2) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\psi_2(\Omega_4\times\psi_2(\Omega_4))))</math> |<math>\psi(\Omega_\omega\times\psi_2(\Omega_\omega))</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2)(3,3,1)(4,2)(5,3,1) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\psi_2(\Omega_4\Omega_3)))</math> |<math>\psi(\Omega_\omega\Omega_3)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2)(3,3,1)(4,3) |- |<math>\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\psi_2(\Omega_4\Omega_3+\psi_3(\Omega_5\Omega_4))))</math> |<math>\psi(\Omega_\omega\Omega_4)</math> |(0)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2)(3,3,1)(4,3)(3,3)(4,4,1)(5,4) |- |<math>\psi(\Omega_2\times(\Omega+1))=\psi(\Omega_2\Omega+\psi_1(\Omega_3\Omega_2+\psi_2(\Omega_4\Omega_3+...)))</math> |<math>\psi(\Omega_\omega^2)</math> |(0)(1,1,1)(2,1)(1,1,1) |} == 分析4:(0)(1,1,1)(2,1)(1,1,1)~TFBO == 此阶段难度相对较低,LPrSSψ与BMS对应较为简单,BOCF有随时出现的Ω变Ω_ω提升。 {| class="wikitable" |+分析4:(0)(1,1,1)(2,1)(1,1,1)~TFBO !LPrSSψ !BOCF !BMS |- |<math>\psi(\Omega_2\times(\Omega+1))</math> |<math>\psi(\Omega_\omega^2)</math> |(0)(1,1,1)(2,1)(1,1,1) |- |<math>\psi(\Omega_2\times(\Omega+1)+\psi_1(\Omega_3))</math> |<math>\psi(\Omega_\omega^2+\psi_1(\Omega_\omega))</math> |(0)(1,1,1)(2,1)(1,1,1)(1,1)(2,2,1) |- |<math>\psi(\Omega_2\times(\Omega+1)+\psi_1(\Omega_3\Omega))</math> |<math>\psi(\Omega_\omega^2+\psi_1(\Omega_\omega\Omega))</math> |(0)(1,1,1)(2,1)(1,1,1)(1,1)(2,2,1)(3,1) |- |<math>\psi(\Omega_2\times(\Omega+1)+\psi_1(\Omega_3\Omega_2))</math> |<math>\psi(\Omega_\omega^2+\psi_1(\Omega_\omega\Omega_2))</math> |(0)(1,1,1)(2,1)(1,1,1)(1,1)(2,2,1)(3,2) |- |<math>\psi(\Omega_2\times(\Omega+1)+\psi_1(\Omega_3\times(\Omega_2+1)))</math> |<math>\psi(\Omega_\omega^2+\psi_1(\Omega_\omega^2))</math> |(0)(1,1,1)(2,1)(1,1,1)(1,1)(2,2,1)(3,2)(2,2,1) |- |<math>\psi(\Omega_2\times(\Omega+1)+\psi_1(\Omega_3\times(\Omega_2+1)+\Omega_2))</math> |<math>\psi(\Omega_\omega^2+\Omega_2)</math> |(0)(1,1,1)(2,1)(1,1,1)(1,1)(2,2,1)(3,2)(2,2,1)(2,2) |- |<math>\psi(\Omega_2\times(\Omega+2))</math> |<math>\psi(\Omega_\omega^2+\Omega_\omega)</math> |(0)(1,1,1)(2,1)(1,1,1)(1,1,1) |- |<math>\psi(\Omega_2\times(\Omega+\omega))</math> |<math>\psi(\Omega_\omega^2+\Omega_\omega\omega)</math> |(0)(1,1,1)(2,1)(1,1,1)(2) |- |<math>\psi(\Omega_2\times\Omega2)</math> |<math>\psi(\Omega_\omega^2+\Omega_\omega\Omega)</math> |(0)(1,1,1)(2,1)(1,1,1)(2,1) |- |<math>\psi(\Omega_2\times\Omega2+\psi_1(\Omega_3\times(\Omega_2+\Omega)))</math> |<math>\psi(\Omega_\omega^2+\Omega_\omega\Omega+\psi_1(\Omega_\omega^2+\Omega_\omega\Omega))</math> |(0)(1,1,1)(2,1)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2,1)(3,1) |- |<math>\psi(\Omega_2\times\Omega2+\psi_1(\Omega_3\times(\Omega_2+\Omega)+\Omega_2))</math> |<math>\psi(\Omega_\omega^2+\Omega_\omega\times(\Omega+1))</math> |(0)(1,1,1)(2,1)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2,1)(3,1)(2,2,1) |- |<math>\psi(\Omega_2\times\Omega2+\psi_1(\Omega_3\times\Omega_22))</math> |<math>\psi(\Omega_\omega^2+\Omega_\omega\Omega_2)</math> |(0)(1,1,1)(2,1)(1,1,1)(2,1)(1,1)(2,2,1)(3,2)(2,2,1)(3,2) |- |<math>\psi(\Omega_2\times(\Omega2+1))</math> |<math>\psi(\Omega_\omega^22)</math> |(0)(1,1,1)(2,1)(1,1,1)(2,1)(1,1,1) |- |<math>\psi(\Omega_2\times\Omega\omega)</math> |<math>\psi(\Omega_\omega^2\omega)</math> |(0)(1,1,1)(2,1)(2) |- |<math>\psi(\Omega_2\times\Omega^2)</math> |<math>\psi(\Omega_\omega^2\Omega)</math> |(0)(1,1,1)(2,1)(2,1) |- |<math>\psi(\Omega_2\times\Omega^2+\psi_1(\Omega_3\Omega_2\Omega))</math> |<math>\psi(\Omega_\omega^2\Omega+\psi_1(\Omega_\omega^2\Omega))</math> |(0)(1,1,1)(2,1)(2,1)(1,1)(2,2,1)(3,2)(3,1) |- |<math>\psi(\Omega_2\times\Omega^2+\psi_1(\Omega_3\Omega_2\Omega+\Omega_2))</math> |<math>\psi(\Omega_\omega^2\Omega+\Omega_\omega)</math> |(0)(1,1,1)(2,1)(2,1)(1,1)(2,2,1)(3,2)(3,1)(2,2,1) |- |<math>\psi(\Omega_2\times\Omega^2+\psi_1(\Omega_3\times\Omega_2^2))</math> |<math>\psi(\Omega_\omega^2\Omega_2)</math> |(0)(1,1,1)(2,1)(2,1)(1,1)(2,2,1)(3,2)(3,2) |- |<math>\psi(\Omega_2\times(\Omega^2+1))</math> |<math>\psi(\Omega_\omega^3)</math> |(0)(1,1,1)(2,1)(2,1)(1,1,1) |- |<math>\psi(\Omega_2\times\Omega^\omega)</math> |<math>\psi(\Omega_\omega^\omega)</math> |(0)(1,1,1)(2,1)(3) |- |<math>\psi(\Omega_2\times\Omega^\Omega)</math> |<math>\psi(\Omega_\omega^\Omega)</math> |(0)(1,1,1)(2,1)(3,1) |- |<math>\psi(\Omega_2\times\Omega^\Omega+\psi_1(\Omega_3\times\Omega_2^\Omega))</math> |<math>\psi(\Omega_\omega^\Omega+\psi_1(\Omega_\omega^\Omega))</math> |(0)(1,1,1)(2,1)(3,1)(1,1)(2,2,1)(3,2)(4,1) |- |<math>\psi(\Omega_2\times\Omega^\Omega+\psi_1(\Omega_3\times\Omega_2^\Omega+\Omega_2))</math> |<math>\psi(\Omega_\omega^\Omega+\Omega_\omega)</math> |(0)(1,1,1)(2,1)(3,1)(1,1)(2,2,1)(3,2)(4,1)(2,2,1) |- |<math>\psi(\Omega_2\times\Omega^\Omega+\psi_1(\Omega_3\times\Omega_2^{\Omega_2}))</math> |<math>\psi(\Omega_\omega^{\Omega_2})</math> |(0)(1,1,1)(2,1)(3,1)(1,1)(2,2,1)(3,2)(4,2) |- |<math>\psi(\Omega_2\times(\Omega^\Omega+1))</math> |<math>\psi(\Omega_\omega^{\Omega_\omega})</math> |(0)(1,1,1)(2,1)(3,1)(1,1,1) |- |<math>\psi(\Omega_2\times\Omega^\Omega2)</math> |<math>\psi(\Omega_\omega^{\Omega_\omega}+\Omega_\omega^\Omega)</math> |(0)(1,1,1)(2,1)(3,1)(1,1,1)(2,1)(3,1) |- |<math>\psi(\Omega_2\times\Omega^{\Omega+1})</math> |<math>\psi(\Omega_\omega^{\Omega_\omega}\Omega)</math> |(0)(1,1,1)(2,1)(3,1)(2,1) |- |<math>\psi(\Omega_2\times\Omega^{\Omega2})</math> |<math>\psi(\Omega_\omega^{\Omega_\omega+\Omega})</math> |(0)(1,1,1)(2,1)(3,1)(2,1)(3,1) |- |<math>\psi(\Omega_2\times\Omega^{\Omega^2})</math> |<math>\psi(\Omega_\omega^{\Omega_\omega\Omega})</math> |(0)(1,1,1)(2,1)(3,1)(3,1) |- |<math>\psi(\Omega_2\times\Omega^{\Omega^\Omega})</math> |<math>\psi(\Omega_\omega^{\Omega_\omega^\Omega})</math> |(0)(1,1,1)(2,1)(3,1)(4,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2))=\psi(\Omega_2\times\varepsilon_{\Omega+1})</math> |<math>\psi(\Omega_{\omega+1})</math> |(0)(1,1,1)(2,1)(3,2) |} == 分析5:TFBO~BiO == 此阶段若对照BMS分析,难度相对较低,而BOCF有随时出现的各级提升。 {| class="wikitable" |+分析5:TFBO~BiO !LPrSSψ !BOCF !BMS |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2))</math> |<math>\psi(\Omega_{\omega+1})</math> |(0)(1,1,1)(2,1)(3,2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2)+\psi_1(\Omega_3\times\psi_2(\Omega_3)))</math> |<math>\psi(\Omega_{\omega+1}+\psi_1(\Omega_{\omega+1}))</math> |(0)(1,1,1)(2,1)(3,2)(1,1)(2,2,1)(3,2)(4,3) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2)+\psi_1(\Omega_3\times\psi_2(\Omega_3)+\Omega_2))</math> |<math>\psi(\Omega_{\omega+1}+\Omega_2)</math> |(0)(1,1,1)(2,1)(3,2)(1,1)(2,2,1)(3,2)(4,3)(2,2) |- |<math>\psi(\Omega_2\times(\psi_1(\Omega_2)+1))</math> |<math>\psi(\Omega_{\omega+1}+\Omega_\omega)</math> |(0)(1,1,1)(2,1)(3,2)(1,1,1) |- |<math>\psi(\Omega_2\times(\psi_1(\Omega_2)+\Omega))</math> |<math>\psi(\Omega_{\omega+1}+\Omega_\omega\Omega)</math> |(0)(1,1,1)(2,1)(3,2)(1,1,1)(2,1) |- |<math>\psi(\Omega_2\times(\psi_1(\Omega_2)+\Omega+1))</math> |<math>\psi(\Omega_{\omega+1}+\Omega_\omega^2)</math> |(0)(1,1,1)(2,1)(3,2)(1,1,1)(2,1)(1,1,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2)\times2)</math> |<math>\psi(\Omega_{\omega+1}+\psi_\omega(\Omega_{\omega+1}))</math> |(0)(1,1,1)(2,1)(3,2)(1,1,1)(2,1)(3,2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2+1))</math> |<math>\psi(\Omega_{\omega+1}+\psi_\omega(\Omega_{\omega+1}+1))</math> |(0)(1,1,1)(2,1)(3,2)(2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2+\Omega))</math> |<math>\psi(\Omega_{\omega+1}+\psi_\omega(\Omega_{\omega+1}+\Omega))</math> |(0)(1,1,1)(2,1)(3,2)(2,1) |- |<math>\psi(\Omega_2\times(\psi_1(\Omega_2+\Omega)+1))</math> |<math>\psi(\Omega_{\omega+1}+\psi_\omega(\Omega_{\omega+1}+\Omega_\omega))</math> |(0)(1,1,1)(2,1)(3,2)(2,1)(1,1,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2+\psi_1(\Omega_2)))</math> |<math>\psi(\Omega_{\omega+1}+\psi_\omega(\Omega_{\omega+1}+\psi_\omega(\Omega_{\omega+1})))</math> |(0)(1,1,1)(2,1)(3,2)(2,1)(3,2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2+\psi_1(\Omega_2+\Omega)))</math> |<math>\psi(\Omega_{\omega+1}+\psi_\omega(\Omega_{\omega+1}+\psi_\omega(\Omega_{\omega+1}+\Omega)))</math> |(0)(1,1,1)(2,1)(3,2)(3,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2+\psi_1(\Omega_2+\psi_1(\Omega_2))))</math> |<math>\psi(\Omega_{\omega+1}+\psi_\omega(\Omega_{\omega+1}+\psi_\omega(\Omega_{\omega+1}+\psi_\omega(\Omega_{\omega+1}))))</math> |(0)(1,1,1)(2,1)(3,2)(3,1)(4,2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_22))</math> |<math>\psi(\Omega_{\omega+1}2)</math> |(0)(1,1,1)(2,1)(3,2)(3,2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2\omega))</math> |<math>\psi(\Omega_{\omega+1}\omega)</math> |(0)(1,1,1)(2,1)(3,2)(4) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2\Omega))</math> |<math>\psi(\Omega_{\omega+1}\Omega)</math> |(0)(1,1,1)(2,1)(3,2)(4,1) |- |<math>\psi(\Omega_2\times(\psi_1(\Omega_2\Omega)+1))</math> |<math>\psi(\Omega_{\omega+1}\Omega_\omega)</math> |(0)(1,1,1)(2,1)(3,2)(4,1)(1,1,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2\times\psi_1(\Omega_2)))</math> |<math>\psi(\Omega_{\omega+1}\times\psi_\omega(\Omega_{\omega+1}))</math> |(0)(1,1,1)(2,1)(3,2)(4,1)(5,2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2^2))</math> |<math>\psi(\Omega_{\omega+1}^2)</math> |(0)(1,1,1)(2,1)(3,2)(4,2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2^\omega))</math> |<math>\psi(\Omega_{\omega+1}^\omega)</math> |(0)(1,1,1)(2,1)(3,2)(4,2)(5) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2^\Omega))</math> |<math>\psi(\Omega_{\omega+1}^\Omega)</math> |(0)(1,1,1)(2,1)(3,2)(4,2)(5,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_2^{\Omega_2}))</math> |<math>\psi(\Omega_{\omega+1}^{\Omega_{\omega+1}})</math> |(0)(1,1,1)(2,1)(3,2)(4,2)(5,2) |- |<math>\psi(\Omega_2\times\psi_1(\psi_2(\Omega_3)))</math> |<math>\psi(\Omega_{\omega+2})</math> |(0)(1,1,1)(2,1)(3,2)(4,3) |- |<math>\psi(\Omega_2\times\psi_1(\psi_2(\Omega_3)\times2))</math> |<math>\psi(\Omega_{\omega+2}+\psi_{\omega+1}(\Omega_{\omega+2}))</math> |(0)(1,1,1)(2,1)(3,2)(4,3)(3,2)(4,3) |- |<math>\psi(\Omega_2\times\psi_1(\psi_2(\Omega_32)))</math> |<math>\psi(\Omega_{\omega+2}2)</math> |(0)(1,1,1)(2,1)(3,2)(4,3)(4,3) |- |<math>\psi(\Omega_2\times\psi_1(\psi_2(\Omega_3^2)))</math> |<math>\psi(\Omega_{\omega+2}^2)</math> |(0)(1,1,1)(2,1)(3,2)(4,3)(5,3) |- |<math>\psi(\Omega_2\times\psi_1(\psi_2(\psi_3(\Omega_4))))</math> |<math>\psi(\Omega_{\omega+3})</math> |(0)(1,1,1)(2,1)(3,2)(4,3)(5,4) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3))</math> |<math>\psi(\Omega_{\omega2})</math> |(0)(1,1,1)(2,1)(3,2,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3)\times2)</math> |<math>\psi(\Omega_{\omega2}+\psi_\omega(\Omega_{\omega2}))</math> |(0)(1,1,1)(2,1)(3,2,1)(1,1,1)(2,1)(3,2,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3+1))</math> |<math>\psi(\Omega_{\omega2}+\psi_\omega(\Omega_{\omega2}+1))</math> |(0)(1,1,1)(2,1)(3,2,1)(2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3+\Omega))</math> |<math>\psi(\Omega_{\omega2}+\psi_\omega(\Omega_{\omega2}+\Omega))</math> |(0)(1,1,1)(2,1)(3,2,1)(2,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3+\psi_1(\Omega_3)))</math> |<math>\psi(\Omega_{\omega2}+\psi_\omega(\Omega_{\omega2}+\psi_\omega(\Omega_{\omega2})))</math> |(0)(1,1,1)(2,1)(3,2,1)(2,1)(3,2,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3+\Omega_2))</math> |<math>\psi(\Omega_{\omega2}+\Omega_{\omega+1})</math> |(0)(1,1,1)(2,1)(3,2,1)(3,2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_32))</math> |<math>\psi(\Omega_{\omega2}2)</math> |(0)(1,1,1)(2,1)(3,2,1)(3,2,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3\omega))</math> |<math>\psi(\Omega_{\omega2}\omega)</math> |(0)(1,1,1)(2,1)(3,2,1)(4) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3\Omega))</math> |<math>\psi(\Omega_{\omega2}\Omega)</math> |(0)(1,1,1)(2,1)(3,2,1)(4,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3\Omega_2))</math> |<math>\psi(\Omega_{\omega2}\Omega_{\omega+1})</math> |(0)(1,1,1)(2,1)(3,2,1)(4,2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3\times(\Omega_2+1)))</math> |<math>\psi(\Omega_{\omega2}^2)</math> |(0)(1,1,1)(2,1)(3,2,1)(4,2)(3,2,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3\times\Omega_2^2))</math> |<math>\psi(\Omega_{\omega2}^2\times\Omega_{\omega+1})</math> |(0)(1,1,1)(2,1)(3,2,1)(4,2)(4,2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3\times\Omega_2^{\Omega_2}))</math> |<math>\psi(\Omega_{\omega2}^{\Omega_{\omega+1}})</math> |(0)(1,1,1)(2,1)(3,2,1)(4,2)(5,2) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3\times\psi_2(\Omega_3)))</math> |<math>\psi(\Omega_{\omega2+1})</math> |(0)(1,1,1)(2,1)(3,2,1)(4,2)(5,3) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3\times\psi_2(\psi_3(\Omega_4))))</math> |<math>\psi(\Omega_{\omega2+2})</math> |(0)(1,1,1)(2,1)(3,2,1)(4,2)(5,3)(6,4) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3\times\psi_2(\Omega_4)))</math> |<math>\psi(\Omega_{\omega3})</math> |(0)(1,1,1)(2,1)(3,2,1)(4,2)(5,3,1) |- |<math>\psi(\Omega_2\times\psi_1(\Omega_3\times\psi_2(\Omega_4\times\psi_3(\Omega_5))))</math> |<math>\psi(\Omega_{\omega4})</math> |(0)(1,1,1)(2,1)(3,2,1)(4,2)(5,3,1)(6,3)(7,4,1) |- |<math>\psi(\Omega_2^2)</math> |<math>\psi(\Omega_{\omega^2})</math> |(0)(1,1,1)(2,1,1) |- |<math>\psi(\Omega_2^2+\Omega_2)</math> |<math>\psi(\Omega_{\omega^2}+\Omega_\omega)</math> |(0)(1,1,1)(2,1,1)(1,1,1) |- |<math>\psi(\Omega_2^2+\psi_1(\Omega_3))</math> |<math>\psi(\Omega_{\omega^2}+\psi_\omega(\Omega_{\omega2}))</math> |(0)(1,1,1)(2,1,1)(1,1,1)(2,1)(3,2,1) |- |<math>\psi(\Omega_2^2+\psi_1(\Omega_3^2))</math> |<math>\psi(\Omega_{\omega^2}+\psi_\omega(\Omega_{\omega^2}))</math> |(0)(1,1,1)(2,1,1)(1,1,1)(2,1)(3,2,1)(4,2,1) |- |<math>\psi(\Omega_2^2+\psi_1(\Omega_3^2+\Omega_3))</math> |<math>\psi(\Omega_{\omega^2}+\Omega_{\omega2})</math> |(0)(1,1,1)(2,1,1)(1,1,1)(2,1)(3,2,1)(4,2,1)(3,2,1) |- |<math>\psi(\Omega_2^22)</math> |<math>\psi(\Omega_{\omega^2}2)</math> |(0)(1,1,1)(2,1,1)(1,1,1)(2,1,1) |- |<math>\psi(\Omega_2^2\Omega)</math> |<math>\psi(\Omega_{\omega^2}\Omega)</math> |(0)(1,1,1)(2,1,1)(2,1) |- |<math>\psi(\Omega_2^2\Omega+\Omega_2)</math> |<math>\psi(\Omega_{\omega^2}\Omega_\omega)</math> |(0)(1,1,1)(2,1,1)(2,1)(1,1,1) |- |<math>\psi(\Omega_2^2\times(\Omega+1))</math> |<math>\psi(\Omega_{\omega^2}^2)</math> |(0)(1,1,1)(2,1,1)(2,1)(1,1,1)(2,1,1) |- |<math>\psi(\Omega_2^2\times\psi_1(\Omega_2))</math> |<math>\psi(\Omega_{\omega^2+1})</math> |(0)(1,1,1)(2,1,1)(2,1)(3,2) |- |<math>\psi(\Omega_2^2\times\psi_1(\Omega_3))</math> |<math>\psi(\Omega_{\omega^2+\omega})</math> |(0)(1,1,1)(2,1,1)(2,1)(3,2,1) |- |<math>\psi(\Omega_2^2\times\psi_1(\Omega_3^2))</math> |<math>\psi(\Omega_{\omega^22})</math> |(0)(1,1,1)(2,1,1)(2,1)(3,2,1)(4,2,1) |- |<math>\psi(\Omega_2^3)</math> |<math>\psi(\Omega_{\omega^3})</math> |(0)(1,1,1)(2,1,1)(2,1,1) |- |<math>\psi(\Omega_2^\omega)</math> |<math>\psi(\Omega_{\omega^\omega})</math> |(0)(1,1,1)(2,1,1)(3) |- |<math>\psi(\Omega_2^{\varepsilon_0})</math> |<math>\psi(\Omega_{\varepsilon_0})</math> |(0)(1,1,1)(2,1,1)(3)(4,1) |- |<math>\psi(\Omega_2^{\psi(\Omega_2)})</math> |<math>\psi(\Omega_{\psi(\Omega_\omega)})</math> |(0)(1,1,1)(2,1,1)(3)(4,1,1) |- |<math>\psi(\Omega_2^{\psi(\Omega_2^{\psi(\Omega_2)})})</math> |<math>\psi(\Omega_{\psi(\Omega_{\psi(\Omega_\omega)})})</math> |(0)(1,1,1)(2,1,1)(3)(4,1,1)(5,1,1)(6)(7,1,1) |- |<math>\psi(\Omega_2^\Omega)</math> |<math>\psi(\Omega_\Omega)</math> |(0)(1,1,1)(2,1,1)(3,1) |} == 分析6:BiO~EBO == {| class="wikitable" |+分析6:BiO~EBO !LPrSSψ !BOCF !BMS |- |<math>\psi(\Omega_2^\Omega)</math> |<math>\psi(\Omega_\Omega)</math> |(0)(1,1,1)(2,1,1)(3,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3))</math> |<math>\psi(\Omega_\Omega+\psi_1(\Omega_\omega))</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega))</math> |<math>\psi(\Omega_\Omega+\psi_1(\Omega_\Omega))</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega+\Omega_2))</math> |<math>\psi(\Omega_\Omega+\Omega_2)</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(2,2) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega+\Omega_3))</math> |<math>\psi(\Omega_\Omega+\Omega_\omega)</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(2,2,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega2))</math> |<math>\psi(\Omega_\Omega2)</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(2,2,1)(3,2,1)(4,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega\omega))</math> |<math>\psi(\Omega_\Omega\omega)</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(3) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega\Omega))</math> |<math>\psi(\Omega_\Omega\Omega)</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(3,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega\Omega_2))</math> |<math>\psi(\Omega_\Omega\Omega_2)</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(3,2) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega\times(\Omega_2+1)))</math> |<math>\psi(\Omega_\Omega^2)</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(3,2)(2,2,1)(3,2,1)(4,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega\times\psi_2(\Omega_3)))</math> |<math>\psi(\Omega_{\Omega+1})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(3,2)(4,3) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega\times\psi_2(\Omega_4)))</math> |<math>\psi(\Omega_{\Omega+\omega})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(3,2)(4,3,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega\times\psi_2(\Omega_4^2)))</math> |<math>\psi(\Omega_{\Omega+\omega^\omega})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(3,2)(4,3,1)(5,4,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^\Omega\times\psi_2(\Omega_4^\Omega)))</math> |<math>\psi(\Omega_{\Omega2})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(3,2)(4,3,1)(5,4,1)(6,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^{\Omega+1}))</math> |<math>\psi(\Omega_{\Omega\omega})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(3,2,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^{\Omega+2}))</math> |<math>\psi(\Omega_{\Omega\times\omega^\omega})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(3,2,1)(3,2,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^{\Omega2}))</math> |<math>\psi(\Omega_{\Omega^2})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(3,2,1)(4,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^{\Omega^2}))</math> |<math>\psi(\Omega_{\Omega^\Omega})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(4,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^{\psi_1(\Omega_2)}))</math> |<math>\psi(\Omega_{\psi_1(\Omega_2)})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(5,2) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^{\psi_1(\Omega_3)}))</math> |<math>\psi(\Omega_{\psi_1(\Omega_\omega)})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(5,2,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^{\psi_1(\Omega_3^\Omega)}))</math> |<math>\psi(\Omega_{\psi_1(\Omega_\Omega)})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,1)(5,2,1)(6,2,1)(7,1) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^{\Omega_2}))</math> |<math>\psi(\Omega_{\Omega_2})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,2) |- |<math>\psi(\Omega_2^\Omega+\psi_1(\Omega_3^{\Omega_2}+\psi_2(\Omega_4^{\Omega_3})))</math> |<math>\psi(\Omega_{\Omega_3})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1)(2,2,1)(3,2,1)(4,2)(2,2)(3,3,1)(4,3,1)(5,3) |- |<math>\psi(\Omega_2^\Omega+\Omega_2)</math> |<math>\psi(\Omega_{\Omega_\omega})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_22)</math> |<math>\psi(\Omega_{\Omega_\omega}+\Omega_\omega)</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(1,1,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_2))</math> |<math>\psi(\Omega_{\Omega_\omega}+\psi_\omega(\Omega_{\omega+1}))</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3))</math> |<math>\psi(\Omega_{\Omega_\omega}+\psi_\omega(\Omega_{\omega2}))</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^\Omega))</math> |<math>\psi(\Omega_{\Omega_\omega}+\psi_\omega(\Omega_{\Omega}))</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^\Omega+\Omega_2))</math> |<math>\psi(\Omega_{\Omega_\omega}+\Omega_{\omega+1})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,1)(3,2) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^\Omega+\Omega_3))</math> |<math>\psi(\Omega_{\Omega_\omega}+\Omega_{\omega2})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,1)(3,2,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^\Omega2))</math> |<math>\psi(\Omega_{\Omega_\omega}+\Omega_{\Omega})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,1)(3,2,1)(4,3,1)(5,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^\Omega2+\Omega_3))</math> |<math>\psi(\Omega_{\Omega_\omega}2)</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,1)(3,2,1)(4,3,1)(5,1)(1,1,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^\Omega\Omega))</math> |<math>\psi(\Omega_{\Omega_\omega}\Omega)</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,1)(4,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^\Omega\Omega_2))</math> |<math>\psi(\Omega_{\Omega_\omega}\Omega_{\omega+1})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,1)(4,2) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^\Omega\times\psi_2(\Omega_3)))</math> |<math>\psi(\Omega_{\Omega_\omega+1})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,1)(4,2)(5,3) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^\Omega\times\psi_2(\Omega_4)))</math> |<math>\psi(\Omega_{\Omega_\omega+\omega})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,1)(4,2)(5,3,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^{\Omega+1}))</math> |<math>\psi(\Omega_{\Omega_\omega\omega})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,1)(4,2,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^{\Omega_2}))</math> |<math>\psi(\Omega_{\Omega_{\omega+1}})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,2) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^{\Omega_2}+\psi_2(\Omega_4^{\Omega_3})))</math> |<math>\psi(\Omega_{\Omega_{\omega+2}})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,2)(3,2)(4,3,1)(5,3,1)(6,3) |- |<math>\psi(\Omega_2^\Omega+\Omega_2\times\psi_1(\Omega_3^{\Omega_2}+\Omega_3))</math> |<math>\psi(\Omega_{\Omega_{\omega2}})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1)(3,2,1)(4,3,1)(5,2)(3,2,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_2^2)</math> |<math>\psi(\Omega_{\Omega_{\omega^2}})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1,1) |- |<math>\psi(\Omega_2^\Omega+\Omega_2^\omega)</math> |<math>\psi(\Omega_{\Omega_{\omega^\omega}})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1,1)(3) |- |<math>\psi(\Omega_2^\Omega2)</math> |<math>\psi(\Omega_{\Omega_\Omega})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1,1)(3,1) |- |<math>\psi(\Omega_2^\Omega2+\Omega_2)</math> |<math>\psi(\Omega_{\Omega_{\Omega_\omega}})</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1,1)(3,1)(1,1,1) |- |<math>\psi(\Omega_2^\Omega3)</math> |<math>\psi(\Omega\downarrow\downarrow4)</math> |(0)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1,1)(3,1)(1,1,1)(2,1,1)(3,1) |- |<math>\psi(\Omega_2^\Omega\omega)</math> |<math>\psi(I)</math> |(0)(1,1,1)(2,1,1)(3,1)(2) |} 下篇:[[LPrSSψ分析Part2]] [[分类:分析]]
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