非驼峰BMS
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非驼峰BMS,是BMS的一个改版。其修改BMS的定义:
对于一个存在LNZ的BMS来说,找到其坏根和阶差向量,之后正常加阶差向量,但坏部只包含坏根列。
其他规则不变。
非驼峰BMS的极限是.
分析
左为非驼峰BMS,右为PrSS
- 0=0
- 00=00
- 01=01
- 010=010
- 0100=0100
- 011=0101
- 0110=01010
- 0111=010101
- 012=011
- 0121=01101
- 01211=0110101
- 0122=011011
- 01222=011011011
- 0123=0111
- 01231=011101
- 01232=0111011
- 01233=01110111
- 01234=01111
- 0 11=012
- 0 11 1=01201
- 0 11 1 2=012011
- 0 11 1 2 3=0120111
- 0 11 11=012012
- 0 11 2=0121
- 0 11 2 11=0121012
- 0 11 2 2=01210121
- 0 11 2 3=01211
- 0 11 2 3 4=012111
- 0 11 21=01212
- 0 11 21 11=01212012
- 0 11 21 2=012120121
- 0 11 21 2 3=0121201211
- 0 11 21 21=0121201212
- 0 11 21 21 2=01212012120121
- 0 11 21 21 21=012120121201212
- 0 11 21 3=012121
- 0 11 21 3 4=0121211
- 0 11 21 31=0121212
- 0 11 21 31 41=012121212
- 0 11 22=0122
- 0 11 22 11=0122012
- 0 11 22 2=01220121
- 0 11 22 21=012201212
- 0 11 22 21 3=0122012121
- 0 11 22 21 31=01220121212
- 0 11 22 22=01220122
- 0 11 22 3=01221
- 0 11 22 31=012212
- 0 11 22 31 4=0122121
- 0 11 22 31 41=01221212
- 0 11 22 32=0122122
- 0 11 22 32 4=01221221
- 0 11 22 32 41=012212212
- 0 11 22 32 42=0122122122
- 0 11 22 33=01222
- 0 11 22 33 4=012221
- 0 11 22 33 41=0122212
- 0 11 22 33 42=01222122
- 0 11 22 33 43=012221222
- 0 11 22 33 44=012222
- 0 111=0123
- 0 111 11=0123012
- 0 111 11 2=01230121
- 0 111 11 21=012301212
- 0 111 11 22=01230122
- 0 111 11 22 33=012301222
- 0 111 111=01230123
- 0 111 2=01231
- 0 111 2 2=0123101231
- 0 111 2 3=012311
- 0 111 21=012312
- 0 111 21 31=01231212
- 0 111 22=0123122
- 0 111 22 3=01231221
- 0 111 22 31=012312212
- 0 111 22 32=0123122122
- 0 111 22 33=01231222
- 0 111 221=0123123
- 0 111 221 221=01231230123123
- 0 111 221 3=01231231
- 0 111 221 321=0123123123
- 0 111 221 33=01232
- 0 111 221 33 421=01232123
- 0 111 221 33 43=012321232
- 0 111 221 33 44=012322
- 0 111 221 331=012323
- 0 111 221 331 441=01232323
- 0 111 222=01233
- 0 111 222 3=012331
- 0 111 222 31=0123312
- 0 111 222 311=01233123
- 0 111 222 311 411=01233123123
- 0 111 222 32=012331232
- 0 111 222 32 42=0123312321232
- 0 111 222 32 43=0123312322
- 0 111 222 321=0123312323
- 0 111 222 321 421=012331232312323
- 0 111 222 321 43=01233123232
- 0 111 222 321 431=012331232323
- 0 111 222 322=012331233
- 0 111 222 322 422=0123312331233
- 0 111 222 33=012332
- 0 111 222 331=0123323
- 0 111 222 331 431=0123323123323
- 0 111 222 331 44=01233232
- 0 111 222 331 441=012332323
- 0 111 222 332=01233233
- 0 111 222 332 442=01233233233
- 0 111 222 333=012333
- 0 111 222 333 444=0123333
- 0 1111=01234
- 0 1111 1111=0123401234
- 0 1111 2=012341
- 0 1111 2211=012341234
- 0 1111 222=012342
- 0 1111 2221=01234234
- 0 1111 2221 333=012343
- 0 1111 2221 3331=0123434
- 0 1111 2222=012344
- 0 11111=012345
- 极限=0 11