Limits of CDCL Learning via Merge Resolution

Marc Vinyals, Chunxiao Li, Noah Fleming, A. Kolokolova, Vijay Ganesh
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Abstract

In their seminal work, Atserias et al. and independently Pipatsrisawat and Darwiche in 2009 showed that CDCL solvers can simulate resolution proofs with polynomial overhead. However, previous work does not address the tightness of the simulation, i.e., the question of how large this overhead needs to be. In this paper, we address this question by focusing on an important property of proofs generated by CDCL solvers that employ standard learning schemes, namely that the derivation of a learned clause has at least one inference where a literal appears in both premises (aka, a merge literal). Specifically, we show that proofs of this kind can simulate resolution proofs with at most a linear overhead, but there also exist formulas where such overhead is necessary or, more precisely, that there exist formulas with resolution proofs of linear length that require quadratic CDCL proofs.
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通过合并解析学习CDCL的局限性
Atserias等人以及Pipatsrisawat和Darwiche在2009年的开创性工作中表明,CDCL求解器可以用多项式开销模拟分辨率证明。然而,以前的工作并没有解决模拟的紧密性,也就是说,这个开销需要多大的问题。在本文中,我们通过关注采用标准学习方案的CDCL解算器生成的证明的一个重要性质来解决这个问题,即学习子句的推导至少有一个推理,其中两个前提中都出现了一个文字(又名合并文字)。具体地说,我们表明这种证明可以模拟分辨率证明,最多只需要一个线性开销,但也存在这样的开销是必要的公式,或者更准确地说,存在具有线性长度分辨率证明的公式,需要二次CDCL证明。
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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