Local Irregularity Conjecture for 2-multigraphs versus cacti
Abstract
A multigraph is locally irregular if the degrees of the end-vertices of every multiedge are distinct. The locally irregular coloring is an edge coloring of a multigraph such that every color induces a locally irregular submultigraph of . A locally irregular colorable multigraph is any multigraph which admits a locally irregular coloring. We denote by the locally irregular chromatic index of a multigraph , which is the smallest number of colors required in the locally irregular coloring of the locally irregular colorable multigraph . In case of graphs the definitions are similar. The Local Irregularity Conjecture for 2-multigraphs claims that for every connected graph , which is not isomorphic to , multigraph obtained from by doubling each edge satisfies . We show this conjecture for cacti. This class of graphs is important for the Local Irregularity Conjecture for 2-multigraphs and the Local Irregularity Conjecture which claims that every locally irregular colorable graph satisfies . At the beginning it has been observed that all not locally irregular colorable graphs are cacti. Recently it has been proved that there is only one cactus which requires 4 colors for a locally irregular coloring and therefore the Local Irregularity Conjecture was disproved.
Cite
@article{arxiv.2211.08270,
title = {Local Irregularity Conjecture for 2-multigraphs versus cacti},
author = {Igor Grzelec and Mariusz Woźniak},
journal= {arXiv preprint arXiv:2211.08270},
year = {2022}
}
Comments
19 pages, 13 figures