Resolution Over Linear Equations: Combinatorial Games for Tree-like Size and Space

Svyatoslav Gryaznov, Sergei Ovcharov, Artur Riazanov
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Abstract

We consider the proof system Res($\oplus$) introduced by Itsykson and Sokolov (Ann. Pure Appl. Log.'20), which is an extension of the resolution proof system and operates with disjunctions of linear equations over $\mathbb{F}_2$. We study characterizations of tree-like size and space of Res($\oplus$) refutations using combinatorial games. Namely, we introduce a class of extensible formulas and prove tree-like size lower bounds on it using Prover-Delayer games, as well as space lower bounds. This class is of particular interest since it contains many classical combinatorial principles, including the pigeonhole, ordering, and dense linear ordering principles. Furthermore, we present the width-space relation for Res($\oplus$) generalizing the results by Atserias and Dalmau (J. Comput. Syst. Sci.'08) and their variant of Spoiler-Duplicator games.
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线性方程的解析:树状大小和空间的组合游戏
我们考虑了由 Itsykson 和 Sokolov 引入的 Res($\oplus$) 证明系统(Ann. Pure Appl. Log.我们利用组合博弈来研究树状大小和 Res($\oplus$)refutations 空间的特征。也就是说,我们引入了一类可扩展公式,并用 "验证者-德赖尔 "博弈证明了它的树状大小下界以及空间下界。这一类公式特别有意思,因为它包含了许多经典的组合原理,包括鸽子洞原理、排序原理和密集线性排序原理。此外,我们提出了 Res($\oplus$) 的宽度-空间关系,概括了 Atserias 和 Dalmau (J. Comput. Syst. Sci.'08) 的结果及其 Spoiler-Duplicator 博弈的变体。
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