线性qwq函数[]
\(qwq(n)=n+1\) \(0\)
\(qwq_0(n)=qwq(n)\) \(0\)
\(qwq_{m+1}(n)=qwq^{qwq_m(n)}(n)\) \(\omega\)
\(qwq_{0|1}(n)=qwq_n(n)\) \(\omega\)
\(qwq_{1|1}(n)=qwq_{0|1}^n(n)\) \(\omega+1\)
\(qwq_{a|1}(n)=qwq_{a-1|1}^n(n)\) \(\omega2\)
\(qwq_{0|2}(n)=qwq_{n|1}(n)\)
\(qwq_{a|2}(n)=qwq_{a-1|1}^n(n)\)
\(qwq_{0|b}(n)=qwq_{n|b-1}(n)\) \(\omega^2\)
\(qwq_{a|b}(n)=qwq_{a-1|b}^n(n)(a>0)\)
\(qwq_{0|0|1}(n)=qwq_{n|n}(n)\)
\(qwq_{a|0|1}(n)=qwq_{a-1|0|1}^n(n)\) \(\omega^2+\omega\)
\(qwq_{0|b|1}(n)=qwq_{n|b-1|1}(n)\)
\(qwq_{a|b|1}(n)=qwq_{a-1|b|1}^n(n)(a>0)\)
\(qwq_{0|0|c}(n)=qwq_{n|n|c-1}(n)\) \(\omega^3)
\(qwq_{a|0|c}(n)=qwq_{a-1|0|c}^n(n)\)
线性qwq总结[]
加项规则:
\(qwq_{n|n|..(atimes)..}(n)=qwq_{0|0|..(atimes)..|1}(n)\)
进位规则:
如果qwq函数的下角标中的前几项均为n,那它们将会变为0并把后面的数+1
双分割记号qwq函数[]
\(qwq_{a||0}(n)=qwq_{a|a|..(ntimes)..|a|a}(n)\) \(\omega^\omega\)
\(qwq_{a||1}(n)=qwq_{a||0}^n(n)\) \(\omega^\omega+1\)
\(qwq_{a||b}(n)=qwq_{a||b-1}^n(n)\) \(\omega^\omega+\omega\)
\(qwq_{a||0|1}(n)=qwq_{a||n}^n(n)\)
\(qwq_{a||b|1}(n)=qwq_{a||b-1|1}^n(n)\) \(\omega^\omega+\omega2\)
\(qwq_{a||0|b}(n)=qwq_{a||n}^n(n)\) \(\omega^\omega+\omega^2\)
\(qwq_{a||0|0|1}(n)=qwq_{a||n|n}(n)\)
\(qwq_{a||b|0|1}(n)=qwq_{a||b-1|0|1}^n(n)\)