Maximum matching width: new characterizations and a fast algorithm for dominating set
Abstract
We give alternative definitions for maximum matching width, e.g. a graph has if and only if it is a subgraph of a chordal graph and for every maximal clique of there exists with and such that any subset of that is a minimal separator of is a subset of either or . Treewidth and branchwidth have alternative definitions through intersections of subtrees, where treewidth focuses on nodes and branchwidth focuses on edges. We show that mm-width combines both aspects, focusing on nodes and on edges. Based on this we prove that given a graph and a branch decomposition of mm-width we can solve Dominating Set in time , thereby beating whenever . Note that and these inequalities are tight. Given only the graph and using the best known algorithms to find decompositions, maximum matching width will be better for solving Dominating Set whenever .
Cite
@article{arxiv.1507.02384,
title = {Maximum matching width: new characterizations and a fast algorithm for dominating set},
author = {Jisu Jeong and Sigve Hortemo Sæther and Jan Arne Telle},
journal= {arXiv preprint arXiv:1507.02384},
year = {2015}
}