Equating $k$ Maximum Degrees in Graphs without Short Cycles
Abstract
For an integer at least , and a graph , let be the minimum cardinality of a set of vertices of such that has either vertices of maximum degree or order less than . Caro and Yuster (Discrete Mathematics 310 (2010) 742-747) conjectured that, for every , there is a constant such that for every graph . Verifying a conjecture of Caro, Lauri, and Zarb (arXiv:1704.08472v1), we show the best possible result that, if is a positive integer, and is a forest of order at most , then . We study for forests in more detail obtaining similar almost tight results, and we establish upper bounds on for graphs of girth at least . For graphs of girth more than , for at least , our results imply . Finally, we show that, for every fixed , and every given forest , the value of can be determined in polynomial time.
Keywords
Cite
@article{arxiv.1705.07409,
title = {Equating $k$ Maximum Degrees in Graphs without Short Cycles},
author = {M. Fürst and M. Gentner and M. A. Henning and S. Jäger and D. Rautenbach},
journal= {arXiv preprint arXiv:1705.07409},
year = {2017}
}