麦克雷特-迈耶联合定理的完善

Matthew Fox, Chaitanya Karamchedu
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引用次数: 0

摘要

利用布卢姆复杂性度量和某些复杂性类运算符的特性,我们展示了一个可计算且不递减的函数$t_{math\sf{poly}}$,对于所有$k$,该函数都是可计算的、$\Sigma_k\mathsf{P} =\Sigma_k\mathsf{TIME}(t_{mathsf{poly}}$, $\mathsf{BPP} =\mathsf{BPTIME}(t_{mathsf{poly}}$、$\mathsf{RP} =\mathsf{RTIME}(t_{\mathsf{poly}})$, $\mathsf{UP} =\mathsf{UTIME}(t_{\mathsf{poly}})$, $\mathsf{PP} =\mathsf{PTIME}(t_{mathsf{poly}})$、$\mathsf{Mod}_k\mathsf{P} =\mathsf{Mod}_k\mathsf{TIME}(t_{mathsf{poly}})$, $\mathsf{PSPACE} =\mathsf{DSPACE}(t_{mathsf{poly}})$, 等等。对于任何语言类集合,只要每个类都可以通过将某个复杂度类算子应用于某个布卢姆复杂度类来定义,那么类似的说法都是成立的。
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A Refinement of the McCreight-Meyer Union Theorem
Using properties of Blum complexity measures and certain complexity class operators, we exhibit a total computable and non-decreasing function $t_{\mathsf{poly}}$ such that for all $k$, $\Sigma_k\mathsf{P} = \Sigma_k\mathsf{TIME}(t_{\mathsf{poly}})$, $\mathsf{BPP} = \mathsf{BPTIME}(t_{\mathsf{poly}})$, $\mathsf{RP} = \mathsf{RTIME}(t_{\mathsf{poly}})$, $\mathsf{UP} = \mathsf{UTIME}(t_{\mathsf{poly}})$, $\mathsf{PP} = \mathsf{PTIME}(t_{\mathsf{poly}})$, $\mathsf{Mod}_k\mathsf{P} = \mathsf{Mod}_k\mathsf{TIME}(t_{\mathsf{poly}})$, $\mathsf{PSPACE} = \mathsf{DSPACE}(t_{\mathsf{poly}})$, and so forth. A similar statement holds for any collection of language classes, provided that each class is definable by applying a certain complexity class operator to some Blum complexity class.
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