Circuit lower bounds for nondeterministic quasi-polytime: an easy witness lemma for NP and NQP

Proceedings of the 50th Annual ACM SIGACT Symposium on Theory of Computing Pub Date : 2018-06-20 DOI:10.1145/3188745.3188910

Cody Murray, Richard Ryan Williams

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引用次数: 53

Abstract

We prove that if every problem in NP has nk-size circuits for a fixed constant k, then for every NP-verifier and every yes-instance x of length n for that verifier, the verifier’s search space has an nO(k3)-size witness circuit: a witness for x that can be encoded with a circuit of only nO(k3) size. An analogous statement is proved for nondeterministic quasi-polynomial time, i.e., NQP = NTIME[nlogO(1) n]. This significantly extends the Easy Witness Lemma of Impagliazzo, Kabanets, and Wigderson [JCSS’02] which only held for larger nondeterministic classes such as NEXP. As a consequence, the connections between circuit-analysis algorithms and circuit lower bounds can be considerably sharpened: algorithms for approximately counting satisfying assignments to given circuits which improve over exhaustive search can imply circuit lower bounds for functions in NQP or even NP. To illustrate, applying known algorithms for satisfiability of ACC ∘ THR circuits [R. Williams, STOC 2014] we conclude that for every fixed k, NQP does not have nlogk n-size ACC ∘ THR circuits.

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不确定拟多时的电路下界:NP和NQP的一个简单的证明引理

我们证明，如果NP中的每个问题对于固定常数k都有nk大小的电路，那么对于该验证者的每个NP-验证者和每个长度为n的yes-instance x，验证者的搜索空间具有nO(k3)大小的见证电路:x的见证电路可以用nO(k3)大小的电路编码。对于非确定性拟多项式时间，证明了一个类似的命题，即NQP = NTIME[nlogO(1) n]。这大大扩展了Impagliazzo, Kabanets和Wigderson [JCSS ' 02]的Easy Witness引理，该引理仅适用于较大的不确定性类，如NEXP。因此，电路分析算法和电路下界之间的联系可以大大加强:对于给定电路的近似计数满足分配的算法，它优于穷举搜索，可以暗示NQP甚至NP中的函数的电路下界。为了说明，应用已知算法求解ACC°THR电路的可满足性[R]。我们得出结论，对于每一个固定k, NQP没有nlogn个大小的ACC°THR电路。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Proceedings of the 50th Annual ACM SIGACT Symposium on Theory of Computing

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