On the pathwidth of almost semicomplete digraphs
Abstract
We call a digraph {\em -semicomplete} if each vertex of the digraph has at most non-neighbors, where a non-neighbor of a vertex is a vertex such that there is no edge between and in either direction. This notion generalizes that of semicomplete digraphs which are -semicomplete and tournaments which are semicomplete and have no anti-parallel pairs of edges. Our results in this paper are as follows. (1) We give an algorithm which, given an -semicomplete digraph on vertices and a positive integer , in time either constructs a path-decomposition of of width at most or concludes correctly that the pathwidth of is larger than . (2) We show that there is a function such that every -semicomplete digraph of pathwidth at least has a semicomplete subgraph of pathwidth at least . One consequence of these results is that the problem of deciding if a fixed digraph is topologically contained in a given -semicomplete digraph admits a polynomial-time algorithm for fixed .
Keywords
Cite
@article{arxiv.1507.01934,
title = {On the pathwidth of almost semicomplete digraphs},
author = {Kenta Kitsunai and Yasuaki Kobayashi and Hisao Tamaki},
journal= {arXiv preprint arXiv:1507.01934},
year = {2015}
}
Comments
33pages, a shorter version to appear in ESA 2015