QBF Merge Resolution is powerful but unnatural

M. Mahajan, Gaurav Sood
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引用次数: 1

Abstract

The Merge Resolution proof system (M-Res) for QBFs, proposed by Beyersdorff et al. in 2019, explicitly builds partial strategies inside refutations. The original motivation for this approach was to overcome the limitations encountered in long-distance Q-Resolution proof system (LD-Q-Res), where the syntactic side-conditions, while prohibiting all unsound resolutions, also end up prohibiting some sound resolutions. However, while the advantage of M-Res over many other resolution-based QBF proof systems was already demonstrated, a comparison with LD-Q-Res itself had remained open. In this paper, we settle this question. We show that M-Res has an exponential advantage over not only LD-Q-Res, but even over LQU$^+$-Res and IRM, the most powerful among currently known resolution-based QBF proof systems. Combining this with results from Beyersdorff et al. 2020, we conclude that M-Res is incomparable with LQU-Res and LQU$^+$-Res. Our proof method reveals two additional and curious features about M-Res: (i) MRes is not closed under restrictions, and is hence not a natural proof system, and (ii) weakening axiom clauses with existential variables provably yields an exponential advantage over M-Res without weakening. We further show that in the context of regular derivations, weakening axiom clauses with universal variables provably yields an exponential advantage over M-Res without weakening. These results suggest that MRes is better used with weakening, though whether M-Res with weakening is closed under restrictions remains open. We note that even with weakening, M-Res continues to be simulated by eFrege $+$ $\forall$red (the simulation of ordinary M-Res was shown recently by Chew and Slivovsky).
QBF合并分辨率功能强大,但不自然
Beyersdorff等人在2019年提出的qbf的合并分辨率证明系统(M-Res)明确地在反驳中构建了部分策略。这种方法的最初动机是克服长距离q -分辨率证明系统(LD-Q-Res)中遇到的限制,其中语法侧条件虽然禁止所有不健全的分辨率,但最终也禁止一些健全的分辨率。然而,虽然M-Res比许多其他基于分辨率的QBF证明系统的优势已经得到证明,但与LD-Q-Res本身的比较仍然是开放的。本文解决了这一问题。我们表明,M-Res不仅比LD-Q-Res具有指数优势,而且比LQU$^+$-Res和IRM具有指数优势,这是目前已知的基于分辨率的QBF证明系统中最强大的。结合Beyersdorff等人2020年的研究结果,我们得出结论,M-Res与LQU-Res和LQU$^+$-Res无法比拟。我们的证明方法揭示了关于M-Res的两个额外的和奇怪的特征:(i) MRes在限制下不是封闭的,因此不是一个自然的证明系统;(ii)带有存在变量的弱化公理子句可证明地比M-Res产生指数优势而不弱化。我们进一步证明了在正则推导的背景下,弱化带有全称变量的公理子句可证明地产生了比M-Res更大的指数优势。这些结果表明,弱化磁流变仪更适合使用,但弱化磁流变仪是否在限制条件下关闭仍是未知的。我们注意到,即使在减弱的情况下,M-Res仍然可以用eFrege $+$ $ $\forall$red来模拟(普通M-Res的模拟最近由Chew和Slivovsky展示)。
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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