On the Satisfiability of Smooth Grid CSPs

Bulletin of the Society of Sea Water Science, Japan Pub Date : 2022-01-01 DOI:10.4230/LIPIcs.SEA.2022.18

V. Alferov, Mateus de Oliveira Oliveira

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Abstract

Many important NP-hard problems, arising in a wide variety of contexts, can be reduced straightforwardly to the satisfiability problem for CSPs whose underlying graph is a grid. In this work, we push forward the study of grid CSPs by analyzing, from an experimental perspective, a symbolic parameter called smoothness. More specifically, we implement an algorithm that provably works in polynomial time on grids of polynomial smoothness. Subsequently, we compare our algorithm with standard combinatorial optimization techniques, such as SAT-solving and integer linear programming (ILP). For this comparison, we use a class of grid-CSPs encoding the pigeonhole principle. We demonstrate, empirically, that these CSPs have polynomial smoothness and that our algorithm terminates in polynomial time. On the other hand, as strong evidence that the grid-like encoding is not destroying the essence of the pigeonhole principle, we show that the standard propositional translation of pigeonhole CSPs remains hard for state-of-the-art SAT solvers, such as minisat and glucose, and even to state-of-the-art integer linear-programming solvers, such as Coin-OR CBC.

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光滑网格csp的可满足性

在各种情况下出现的许多重要的np困难问题，可以直接归结为其底层图为网格的csp的可满足性问题。在这项工作中，我们通过从实验的角度分析称为平滑度的符号参数来推进网格csp的研究。更具体地说，我们实现了一个算法，可以证明在多项式平滑的网格上在多项式时间内工作。随后，我们将我们的算法与标准的组合优化技术，如sat求解和整数线性规划(ILP)进行比较。为了进行比较，我们使用了一类编码鸽子洞原理的网格- csp。我们从经验上证明，这些csp具有多项式平滑性，并且我们的算法在多项式时间内终止。另一方面，作为网格编码没有破坏鸽子洞原理本质的有力证据，我们表明鸽子洞csp的标准命题翻译对于最先进的SAT求解器(如minisat和glucose)，甚至对于最先进的整数线性规划求解器(如Coin-OR CBC)来说仍然很困难。

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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Bulletin of the Society of Sea Water Science, Japan

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