Linear transformations between dominating sets in the TAR-model
Abstract
Given a graph and an integer , a token addition and removal ({\sf TAR} for short) reconfiguration sequence between two dominating sets and of size at most is a sequence of dominating sets of such that any two consecutive dominating sets differ by the addition or deletion of one vertex, and no dominating set has size bigger than . We first improve a result of Haas and Seyffarth, by showing that if (where is the maximum size of a minimal dominating set and the maximum size of an independent set), then there exists a linear {\sf TAR} reconfiguration sequence between any pair of dominating sets. We then improve these results on several graph classes by showing that the same holds for -minor free graph as long as and for planar graphs whenever . Finally, we show that if , then there also exists a linear transformation between any pair of dominating sets.
Keywords
Cite
@article{arxiv.2006.16726,
title = {Linear transformations between dominating sets in the TAR-model},
author = {Nicolas Bousquet and Alice Joffard and Paul Ouvrard},
journal= {arXiv preprint arXiv:2006.16726},
year = {2020}
}
Comments
13 pages, 6 figures