Simple Constructions from (Almost) Regular One-Way Functions

IF 2.3 3区 计算机科学 Q2 COMPUTER SCIENCE, THEORY & METHODS
Noam Mazor, Jiapeng Zhang
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Abstract

Two of the most useful cryptographic primitives that can be constructed from one-way functions are pseudorandom generators (PRGs) and universal one-way hash functions (UOWHFs). In order to implement them in practice, the efficiency of such constructions must be considered. The three major efficiency measures are: the seed length, the call complexity to the one-way function, and the adaptivity of these calls. Still, the optimal efficiency of these constructions is not yet fully understood: there exist gaps between the known upper bound and the known lower bound for black-box constructions. A special class of one-way functions called unknown-regular one-way functions is much better understood. Haitner, Harnik and Reingold (CRYPTO 2006) presented a PRG construction with semi-linear seed length and linear number of calls based on a method called randomized iterate. Ames, Gennaro and Venkitasubramaniam (ASIACRYPT 2012) then gave a construction of UOWHF with similar parameters and using similar ideas. On the other hand, Holenstein and Sinha (FOCS 2012) and Barhum and Holenstein (TCC 2013) showed an almost linear call-complexity lower bound for black-box constructions of PRGs and UOWHFs from one-way functions. Hence, Haitner et al. and Ames et al. reached tight constructions (in terms of seed length and the number of calls) of PRGs and UOWHFs from regular one-way functions. These constructions, however, are adaptive. In this work, we present non-adaptive constructions for both primitives which match the optimal call complexity given by Holenstein and Sinha and Barhum and Holenstein. Our constructions, besides being simple and non-adaptive, are robust also for almost-regular one-way functions.

Abstract Image

从(几乎)正则单向函数的简单构造
伪随机发生器(PRG)和通用单向散列函数(UOWHF)是可以用单向函数构造的两个最有用的加密原语。为了在实践中实现它们,必须考虑此类构造的效率。效率的三个主要衡量标准是:种子长度、单向函数的调用复杂度以及这些调用的适应性。尽管如此,人们对这些结构的最佳效率还不完全了解:黑盒结构的已知上限和已知下限之间存在差距。人们对一类特殊的单向函数--未知正则单向函数--的理解要深刻得多。Haitner、Harnik 和 Reingold(CRYPTO 2006)基于一种称为随机迭代的方法,提出了一种具有半线性种子长度和线性调用次数的 PRG 结构。随后,Ames、Gennaro 和 Venkitasubramaniam(ASIACRYPT,2012 年)使用类似的思路给出了具有类似参数的 UOWHF 结构。另一方面,Holenstein 和 Sinha(FOCS,2012 年)以及 Barhum 和 Holenstein(TCC,2013 年)展示了单向函数 PRGs 和 UOWHFs 黑箱构造的几乎线性调用复杂度下限。因此,Haitner 等人和 Ames 等人通过常规单向函数实现了 PRG 和 UOWHF 的严密构造(就种子长度和调用次数而言)。然而,这些构造都是自适应的。在这项工作中,我们提出了这两种基元的非自适应构造,与 Holenstein 和 Sinha 以及 Barhum 和 Holenstein 所给出的最佳调用复杂度相匹配。我们的构造不仅简单、非自适应,而且对几乎不规则的单向函数也很稳健。
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来源期刊
Journal of Cryptology
Journal of Cryptology 工程技术-工程:电子与电气
CiteScore
7.10
自引率
3.30%
发文量
24
审稿时长
18 months
期刊介绍: The Journal of Cryptology is a forum for original results in all areas of modern information security. Both cryptography and cryptanalysis are covered, including information theoretic and complexity theoretic perspectives as well as implementation, application, and standards issues. Coverage includes such topics as public key and conventional algorithms and their implementations, cryptanalytic attacks, pseudo-random sequences, computational number theory, cryptographic protocols, untraceability, privacy, authentication, key management and quantum cryptography. In addition to full-length technical, survey, and historical articles, the journal publishes short notes.
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