Pseudodeterministic constructions in subexponential time

I. Oliveira, R. Santhanam
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引用次数: 37

Abstract

We study pseudodeterministic constructions, i.e., randomized algorithms which output the same solution on most computation paths. We establish unconditionally that there is an infinite sequence {pn} of primes and a randomized algorithm A running in expected sub-exponential time such that for each n, on input 1|pn|, A outputs pn with probability 1. In other words, our result provides a pseudodeterministic construction of primes in sub-exponential time which works infinitely often. This result follows from a more general theorem about pseudodeterministic constructions. A property Q ⊆ {0,1}* is ϒ-dense if for large enough n, |Q ∩ {0,1}n| ≥ ϒ2n. We show that for each c > 0 at least one of the following holds: (1) There is a pseudodeterministic polynomial time construction of a family {Hn} of sets, Hn ⊆ {0,1}n, such that for each (1/nc)-dense property Q Ε DTIME(nc) and every large enough n, Hn ∩ Q ≠ ∅ or (2) There is a deterministic sub-exponential time construction of a family {H′n} of sets, H′n ∩ {0,1}n, such that for each (1/nc)-dense property Q Ε DTIME(nc) and for infinitely many values of n, H′n ∩ Q ≠ ∅. We provide further algorithmic applications that might be of independent interest. Perhaps intriguingly, while our main results are unconditional, they have a non-constructive element, arising from a sequence of applications of the hardness versus randomness paradigm.
次指数时间内的伪确定性结构
我们研究伪确定性结构,即在大多数计算路径上输出相同解的随机算法。我们无条件地建立了一个无限素数序列{pn}和一个随机算法a在期望的次指数时间内运行,使得对于每个n,在输入1|pn|时,a以1的概率输出pn。换句话说,我们的结果提供了在次指数时间内无限频繁地工作的素数的伪确定性构造。这个结果来自于一个关于伪确定性结构的更一般的定理。如果n足够大,|Q∩{0,1}n|≥ϒ2n,则性质Q≥ϒ-dense。我们至少表明每个c > 0以下持有之一:(1)有一个pseudodeterministic多项式时间建设家庭集{Hn}, Hn⊆{0,1}n,这样对于每个(1 / nc)密集的房地产问ΕDTIME (nc)和每一个足够大的n, Hn∩问≠∅或(2)有一个确定性的次级多项式时间建设家庭集{H’},H’∩{0,1}n,这样对于每个(1 / nc)密集的房地产问ΕDTIME (nc)和无穷多值n, H’∩问≠∅。我们提供进一步的算法应用程序,可能是独立的兴趣。也许有趣的是,虽然我们的主要结果是无条件的,但它们有一个非建设性的元素,产生于硬度与随机性范例的一系列应用。
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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