立方体基本封面的下限

IF 1 2区数学 Q1 MATHEMATICS

Combinatorica Pub Date : 2024-04-23 DOI:10.1007/s00493-024-00093-4

Gal Yehuda, Amir Yehudayoff

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引用次数: 0

摘要

关于覆盖布尔立方所需的超平面数量，人们已经在不同的背景下进行了研究。Linial 和 Radhakrishnan 提出了基本覆盖的概念。基本覆盖是超立方体顶点最小覆盖的超平面集合，每个坐标至少在其中一个超平面上有影响。利尼阿尔和拉达克里希南用代数工具证明了 n 立方体的每个基本盖的大小必须至少是 \(\Omega (\sqrt{n})\) 。我们设计了一种更强的下限方法，并证明了每个本质盖的大小至少是（\Omega (n^{0.52})\）。这个结果对证明复杂性有影响，因为本质盖已经被用来证明几个证明系统的下界。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

A Lower Bound for Essential Covers of the Cube

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A Lower Bound for Essential Covers of the Cube

The amount of hyperplanes that are needed in order to cover the Boolean cube has been studied in various contexts. Linial and Radhakrishnan introduced the notion of essential covers. An essential cover is a collection of hyperplanes that form a minimal cover of the vertices of the hypercube, and every coordinate is influential in at least one of the hyperplanes. Linial and Radhakrishnan proved using algebraic tools that every essential cover of the n-cube must be of size at least \(\Omega (\sqrt{n})\). We devise a stronger lower bound method, and show that the size of every essential cover is at least \(\Omega (n^{0.52})\). This result has implications in proof complexity, because essential covers have been used to prove lower bounds for several proof systems.

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来源期刊

Combinatorica 数学-数学

CiteScore

1.90

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： COMBINATORICA publishes research papers in English in a variety of areas of combinatorics and the theory of computing, with particular emphasis on general techniques and unifying principles. Typical but not exclusive topics covered by COMBINATORICA are - Combinatorial structures (graphs, hypergraphs, matroids, designs, permutation groups). - Combinatorial optimization. - Combinatorial aspects of geometry and number theory. - Algorithms in combinatorics and related fields. - Computational complexity theory. - Randomization and explicit construction in combinatorics and algorithms.