On the Sensitivity Conjecture for Disjunctive Normal Forms

Foundations of Software Technology and Theoretical Computer Science Pub Date : 2016-07-18 DOI:10.4230/LIPIcs.FSTTCS.2016.15

S. KarthikC., Sébastien Tavenas

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引用次数: 10

Abstract

The sensitivity conjecture of Nisan and Szegedy [CC '94] asks whether for any Boolean function $f$, the maximum sensitivity $s(f)$, is polynomially related to its block sensitivity $bs(f)$, and hence to other major complexity measures. Despite major advances in the analysis of Boolean functions over the last decade, the problem remains widely open. In this paper, we consider a restriction on the class of Boolean functions through a model of computation (DNF), and refer to the functions adhering to this restriction as admitting the Normalized Block property. We prove that for any function $f$ admitting the Normalized Block property, $bs(f) \leq 4s(f)^2$. We note that (almost) all the functions mentioned in literature that achieve a quadratic separation between sensitivity and block sensitivity admit the Normalized Block property. Recently, Gopalan et al. [ITCS '16] showed that every Boolean function $f$ is uniquely specified by its values on a Hamming ball of radius at most $2s(f)$. We extend this result and also construct examples of Boolean functions which provide the matching lower bounds.

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析取范式的灵敏度猜想

Nisan和Szegedy [CC '94]的灵敏度猜想问的是，对于任何布尔函数$f$，最大灵敏度$s(f)$是否与其块灵敏度$bs(f)$多项式相关，从而与其他主要复杂度度量多项式相关。尽管布尔函数的分析在过去十年中取得了重大进展，但这个问题仍然广泛存在。本文通过计算模型(DNF)考虑了布尔函数类的一个限制，并将遵守该限制的函数称为承认归一化块性质。我们证明了对于任何函数$f$承认归一化块属性，$bs(f) \leq 4s(f)^2$。我们注意到(几乎)所有文献中提到的实现灵敏度和块灵敏度之间二次分离的函数都承认归一化块属性。最近，Gopalan等人[ITCS '16]证明了每个布尔函数$f$在半径不超过$2s(f)$的Hamming球上由其值唯一指定。我们扩展了这个结果，并构造了提供匹配下界的布尔函数的例子。

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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Foundations of Software Technology and Theoretical Computer Science

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