Hardness of Minimal Symmetry Breaking in Distributed Computing

Proceedings of the 2019 ACM Symposium on Principles of Distributed Computing Pub Date : 2018-11-05 DOI:10.1145/3293611.3331605

A. Balliu, J. Hirvonen, D. Olivetti, J. Suomela

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引用次数: 29

Abstract

A graph is weakly 2-colored if the nodes are labeled with colors black and white such that each black node is adjacent to at least one white node and vice versa. In this work we study the distributed computational complexity of weak 2-coloring in the standard łocal model of distributed computing, and how it is related to the distributed computational complexity of other graph problems. First, we show that weak 2-coloring is a minimal distributed symmetry-breaking problem for regular even-degree trees and high-girth graphs: if there is any non-trivial locally checkable labeling problem that is solvable in o(log⋅ n) rounds with a distributed graph algorithm in the middle of a regular even-degree tree, then weak 2-coloring is also solvable in o(log⋅ n) rounds there. Second, we prove a tight lower bound of Ω(log ⋅ n) for the distributed computational complexity of weak 2-coloring in regular trees; previously only a lower bound of Ω n(log log⋅ n) was known. By minimality, the same lower bound holds for any non-trivial locally checkable problem inside regular even-degree trees.

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分布式计算中最小对称性破缺的硬度

如果节点被标记为黑色和白色，使得每个黑色节点与至少一个白色节点相邻，反之亦然，则图是弱2色的。在这项工作中，我们研究了弱2-着色在分布式计算的标准łocal模型中的分布式计算复杂性，以及它与其他图问题的分布式计算复杂性的关系。首先，我们证明了弱2-着色是正则偶数度树和高周长图的最小分布对称破坏问题:如果在正则偶数度树的中间存在用分布式图算法在o(log⋅n)轮内可解的非平凡局部可检标记问题，那么在那里的弱2-着色也是在o(log⋅n)轮内可解的。其次，我们证明了正则树弱2-着色分布计算复杂度的紧下界Ω(log⋅n);以前只知道Ω n(log log⋅n)的下界。通过极小性，同样的下界适用于正则偶数次树内的任何非平凡局部可检问题。

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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Proceedings of the 2019 ACM Symposium on Principles of Distributed Computing

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