English

Rainbow Tur\'an Problem for Even Cycles

Combinatorics 2012-05-15 v2

Abstract

An edge-colored graph is rainbow if all its edges are colored with distinct colors. For a fixed graph HH, the rainbow Tur\'an number ex(n,H)\mathrm{ex}^{\ast}(n,H) is defined as the maximum number of edges in a properly edge-colored graph on nn vertices with no rainbow copy of HH. We study the rainbow Tur\'an number of even cycles, and prove that for every fixed ε>0\varepsilon > 0, there is a constant C(ε)C(\varepsilon) such that every properly edge-colored graph on nn vertices with at least C(ε)n1+εC(\varepsilon) n^{1 + \varepsilon} edges contains a rainbow cycle of even length at most 2ln4lnεln(1+ε)2 \lceil \frac{\ln 4 - \ln \varepsilon}{\ln (1 + \varepsilon)} \rceil. This partially answers a question of Keevash, Mubayi, Sudakov, and Verstra\"ete, who asked how dense a graph can be without having a rainbow cycle of any length.

Keywords

Cite

@article{arxiv.1202.3221,
  title  = {Rainbow Tur\'an Problem for Even Cycles},
  author = {Shagnik Das and Choongbum Lee and Benny Sudakov},
  journal= {arXiv preprint arXiv:1202.3221},
  year   = {2012}
}

Comments

12 pages

R2 v1 2026-06-21T20:19:35.540Z