PTAS for Sparse General-valued CSPs

IF 0.9 3区计算机科学 Q3 COMPUTER SCIENCE, THEORY & METHODS

ACM Transactions on Algorithms Pub Date : 2022-12-13 DOI:10.1145/3569956

Balázs F. Mezei, Marcin Wrochna, Stanislav Živný

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引用次数: 2

Abstract

We study polynomial-time approximation schemes (PTASes) for constraint satisfaction problems (CSPs) such as Maximum Independent Set or Minimum Vertex Cover on sparse graph classes. Baker’s approach gives a PTAS on planar graphs, excluded-minor classes, and beyond. For Max-CSPs, and even more generally, maximisation finite-valued CSPs (where constraints are arbitrary non-negative functions), Romero, Wrochna, and Živný [SODA’21] showed that the Sherali-Adams LP relaxation gives a simple PTAS for all fractionally-treewidth-fragile classes, which is the most general “sparsity” condition for which a PTAS is known. We extend these results to general-valued CSPs, which include “crisp” (or “strict”) constraints that have to be satisfied by every feasible assignment. The only condition on the crisp constraints is that their domain contains an element that is at least as feasible as all the others (but possibly less valuable). For minimisation general-valued CSPs with crisp constraints, we present a PTAS for all Baker graph classes—a definition by Dvořák [SODA’20] that encompasses all classes where Baker’s technique is known to work, except for fractionally-treewidth-fragile classes. While this is standard for problems satisfying a certain monotonicity condition on crisp constraints, we show this can be relaxed to diagonalisability—a property of relational structures connected to logics, statistical physics, and random CSPs.

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稀疏一般值csp的PTAS

本文研究了稀疏图类上最大独立集或最小顶点覆盖等约束满足问题的多项式时间逼近格式(PTASes)。Baker的方法给出了平面图、排除次要类以及其他的PTAS。对于max - csp，甚至更一般地，最大化有限值csp(其中约束是任意的非负函数)，Romero, Wrochna和Živný [SODA ' 21]表明sherli - adams LP松弛给出了所有分数树宽脆弱类的简单PTAS，这是PTAS已知的最一般的“稀疏性”条件。我们将这些结果扩展到一般值csp，它包含了“清晰的”(或“严格的”)约束，每个可行的分配都必须满足这些约束。明确约束的唯一条件是，它们的领域包含的元素至少与所有其他元素一样可行(但可能不那么有价值)。为了最小化具有清晰约束的一般值csp，我们提出了所有Baker图类的PTAS -一个由Dvořák [SODA ' 20]定义的定义，它包含了除了分数树宽脆弱类之外，Baker技术已知有效的所有类。虽然这是在明确约束条件下满足一定单调性条件的问题的标准，但我们表明，这可以放宽为对角性——与逻辑、统计物理和随机csp相关的关系结构的属性。

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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来源期刊

ACM Transactions on Algorithms COMPUTER SCIENCE, THEORY & METHODS-MATHEMATICS, APPLIED

CiteScore

3.30

自引率

0.00%

发文量

审稿时长

6-12 weeks

期刊介绍： ACM Transactions on Algorithms welcomes submissions of original research of the highest quality dealing with algorithms that are inherently discrete and finite, and having mathematical content in a natural way, either in the objective or in the analysis. Most welcome are new algorithms and data structures, new and improved analyses, and complexity results. Specific areas of computation covered by the journal include combinatorial searches and objects; counting; discrete optimization and approximation; randomization and quantum computation; parallel and distributed computation; algorithms for graphs, geometry, arithmetic, number theory, strings; on-line analysis; cryptography; coding; data compression; learning algorithms; methods of algorithmic analysis; discrete algorithms for application areas such as biology, economics, game theory, communication, computer systems and architecture, hardware design, scientific computing