Local and Union Boxicity
Abstract
The boxicity of a graph is the smallest integer such that is the intersection of interval graphs, or equivalently, that is the intersection graph of axis-aligned boxes in . These intersection representations can be interpreted as covering representations of the complement of with co-interval graphs, that is, complements of interval graphs. We follow the recent framework of global, local and folded covering numbers (Knauer and Ueckerdt, Discrete Mathematics 339 (2016)) to define two new parameters: the local boxicity and the union boxicity of . The union boxicity of is the smallest such that can be covered with vertex-disjoint unions of co-interval graphs, while the local boxicity of is the smallest such that can be covered with co-interval graphs, at most at every vertex. We show that for every graph we have and that each of these inequalities can be arbitrarily far apart. Moreover, we show that local and union boxicity are also characterized by intersection representations of appropriate axis-aligned boxes in . We demonstrate with a few striking examples, that in a sense, the local boxicity is a better indication for the complexity of a graph, than the classical boxicity.
Keywords
Cite
@article{arxiv.1609.09447,
title = {Local and Union Boxicity},
author = {Thomas Bläsius and Peter Stumpf and Torsten Ueckerdt},
journal= {arXiv preprint arXiv:1609.09447},
year = {2016}
}
Comments
13 pages, 3 figures