Optimal Colorings with Rainbow Paths
Abstract
Let be a connected graph of chromatic number . For a -coloring of , a full -rainbow path is a path of order in whose vertices are all colored differently by . We show that has a -coloring such that every vertex of lies on a full -rainbow path, which provides a positive answer to a question posed by Lin (Simple proofs of results on paths representing all colors in proper vertex-colorings, Graphs Combin. 23 (2007) 201-203). Furthermore, we show that if has a cycle of length , then has a -coloring such that, for every vertex of , some full -rainbow path begins at , which solves a problem posed by Bessy and Bousquet (Colorful paths for 3-chromatic graphs, arXiv 1503.00965v1). Finally, we establish some more results on the existence of optimal colorings with (directed) full rainbow paths.
Cite
@article{arxiv.1506.03170,
title = {Optimal Colorings with Rainbow Paths},
author = {Oliver Bendele and Dieter Rautenbach},
journal= {arXiv preprint arXiv:1506.03170},
year = {2017}
}