English

Note on edge-colored graphs and digraphs without properly colored cycles

Discrete Mathematics 2007-08-01 v1

Abstract

We study the following two functions: d(n,c) and d(n,c)\vec{d}(n,c); d(n,c) (d(n,c)\vec{d}(n,c)) is the minimum number k such that every c-edge-colored undirected (directed) graph of order n and minimum monochromatic degree (out-degree) at least k has a properly colored cycle. Abouelaoualim et al. (2007) stated a conjecture which implies that d(n,c)=1. Using a recursive construction of c-edge-colored graphs with minimum monochromatic degree p and without properly colored cycles, we show that d(n,c)1c(logcnlogclogcn)d(n,c)\ge {1 \over c}(\log_cn -\log_c\log_cn) and, thus, the conjecture does not hold. In particular, this inequality significantly improves a lower bound on d(n,2)\vec{d}(n,2) obtained by Gutin, Sudakov and Yeo in 1998.

Keywords

Cite

@article{arxiv.0707.4580,
  title  = {Note on edge-colored graphs and digraphs without properly colored cycles},
  author = {Gregory Gutin},
  journal= {arXiv preprint arXiv:0707.4580},
  year   = {2007}
}
R2 v1 2026-06-21T09:03:22.897Z