Generalizing Roberts' characterization of unit interval graphs
Abstract
For any natural number , a graph is a (disjoint) -interval graph if it is the intersection graph of (disjoint) -intervals, the union of (disjoint) intervals on the real line. Two important subclasses of -interval graphs are unit and balanced -interval graphs (where every interval has unit length or all the intervals associated to a same vertex have the same length, respectively). A celebrated result by Roberts gives a simple characterization of unit interval graphs being exactly claw-free interval graphs. Here, we study the generalization of this characterization for -interval graphs. In particular, we prove that for any , if is a -free interval graph, then is a unit -interval graph. However, somehow surprisingly, under the same assumptions, is not always a \emph{disjoint} unit -interval graph. This implies that the class of disjoint unit -interval graphs is strictly included in the class of unit -interval graphs. Finally, we study the relationships between the classes obtained under disjoint and non-disjoint -intervals in the balanced case and show that the classes of disjoint balanced 2-intervals and balanced 2-intervals coincide, but this is no longer true for .
Keywords
Cite
@article{arxiv.2404.17872,
title = {Generalizing Roberts' characterization of unit interval graphs},
author = {Virginia Ardévol Martínez and Romeo Rizzi and Abdallah Saffidine and Florian Sikora and Stéphane Vialette},
journal= {arXiv preprint arXiv:2404.17872},
year = {2024}
}