A width parameter useful for chordal and co-comparability graphs
Abstract
We investigate new graph classes of bounded mim-width, strictly extending interval graphs and permutation graphs. The graphs and are graphs obtained from the disjoint union of two cliques of size , and one clique of size and one independent set of size respectively, by adding a perfect matching. We prove that : (1) interval graphs are -free chordal graphs; and -free chordal graphs have mim-width at most , (2) permutation graphs are -free co-comparability graphs; and -free co-comparability graphs have mim-width at most , (3) chordal graphs and co-comparability graphs have unbounded mim-width in general. We obtain several algorithmic consequences; for instance, while Minimum Dominating Set is NP-complete on chordal graphs, it can be solved in time on -free chordal graphs. The third statement strengthens a result of Belmonte and Vatshelle stating that either those classes do not have constant mim-width or a decomposition with constant mim-width cannot be computed in polynomial time unless . We generalize these ideas to bigger graph classes. We introduce a new width parameter sim-width, of stronger modelling power than mim-width, by making a small change in the definition of mim-width. We prove that chordal graphs and co-comparability graphs have sim-width at most 1. We investigate a way to bound mim-width for graphs of bounded sim-width by excluding and as induced minors or induced subgraphs, and give algorithmic consequences. Lastly, we show that circle graphs have unbounded sim-width, and thus also unbounded mim-width.
Keywords
Cite
@article{arxiv.1606.08087,
title = {A width parameter useful for chordal and co-comparability graphs},
author = {Dong Yeap Kang and O-joung Kwon and Torstein J. F. Strømme and Jan Arne Telle},
journal= {arXiv preprint arXiv:1606.08087},
year = {2017}
}
Comments
24 pages, 5 figures; An extended abstract appeared in the proceedings of WALCOM2017