一种局部搜索的线性权传递规则

Md. Solimul Chowdhury, Cayden Codel, Marijn J. H. Heule
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引用次数: 0

摘要

定权分置算法(ddfw)是一种动态局部搜索sat求解算法,它将权重从局部最小值的满足子句转移到证伪子句。DDFW在一些困难的组合实例上是非常有效的。然而,尽管它取得了成功,但自2005年首次亮相以来,它几乎没有得到任何研究。在本文中,我们提出了对基本算法的三种修改:一种线性权值转移方法,在局部最小值的子句之间动态移动权值;一种调整在局部最小值中如何选择满足的子句来赋予权值;以及一种加权随机选择变量翻转的方法。我们将对ddfw的修改实现在求解器yalsat之上。我们的实验表明,与原始的ddfw算法相比,我们的修改在多个基准测试中提高了性能,包括过去三年的SAT比赛。此外,我们改进的求解器专门解决了反驳Ahmed等人(2014)提出的关于两个Van der Waerden数下界的猜想的困难组合实例,并且它在已经开放了三十多年的硬图着色实例上表现良好。
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A Linear Weight Transfer Rule for Local Search
The Divide and Distribute Fixed Weights algorithm (ddfw) is a dynamic local search SAT-solving algorithm that transfers weight from satisfied to falsified clauses in local minima. ddfw is remarkably effective on several hard combinatorial instances. Yet, despite its success, it has received little study since its debut in 2005. In this paper, we propose three modifications to the base algorithm: a linear weight transfer method that moves a dynamic amount of weight between clauses in local minima, an adjustment to how satisfied clauses are chosen in local minima to give weight, and a weighted-random method of selecting variables to flip. We implemented our modifications to ddfw on top of the solver yalsat. Our experiments show that our modifications boost the performance compared to the original ddfw algorithm on multiple benchmarks, including those from the past three years of SAT competitions. Moreover, our improved solver exclusively solves hard combinatorial instances that refute a conjecture on the lower bound of two Van der Waerden numbers set forth by Ahmed et al. (2014), and it performs well on a hard graph-coloring instance that has been open for over three decades.
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