Derandomization with Minimal Memory Footprint

Dean Doron, R. Tell
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引用次数: 6

Abstract

Existing proofs that deduce BPL = L from circuit lower bounds convert randomized algorithms into deterministic algorithms with large constant overhead in space. We study space-bounded derandomization with minimal footprint, and ask what is the minimal possible space overhead for derandomization. We show that BPSPACE [ S ] ⊆ DSPACE [ c · S ] for c ≈ 2, assuming space-efficient cryptographic PRGs, and, either: (1) lower bounds against bounded-space algorithms with advice, or: (2) lower bounds against certain uniform compression algorithms. Under additional assumptions regarding the power of catalytic computation, in a new setting of parameters that was not studied before, we are even able to get c ≈ 1. Our results are constructive: Given a candidate hard function (and a candidate cryptographic PRG) we show how to transform the randomized algorithm into an efficient deterministic one. This follows from new PRGs and targeted PRGs for space-bounded algorithms, which we combine with novel space-efficient evaluation methods. A central ingredient in all our constructions is hardness amplification reductions in logspace-uniform TC 0 , that were not known before. 2012 ACM Subject Classification Theory of computation → Complexity theory and logic; Theory of computation → Pseudorandomness and derandomization; Theory of computation → Error-correcting codes
最小内存占用的非随机化
现有的从电路下界推导BPL = L的证明将随机算法转化为具有较大空间常数开销的确定性算法。我们研究空间有界的非随机化和最小占用空间,并询问非随机化的最小可能空间开销是什么。我们证明了BPSPACE [S]对c≈2,假设具有空间效率的密码prg,并且(1)具有建议的有界空间算法的下界,或(2)具有统一压缩算法的下界。在关于催化计算能力的额外假设下,在以前没有研究过的新参数设置中,我们甚至可以得到c≈1。我们的结果是建设性的:给定一个候选硬函数(和一个候选加密PRG),我们展示了如何将随机算法转换为有效的确定性算法。这源于新的PRGs和靶向PRGs的空间有界算法,我们将其与新的空间高效评估方法相结合。我们所有构造的一个中心成分是对数空间均匀tc0的硬度放大减小,这是以前不知道的。2012 ACM学科分类:计算理论→复杂性理论与逻辑;计算理论→伪随机与非随机化计算理论→纠错码
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