English

The generalised rainbow Tur\'an problem for cycles

Combinatorics 2022-02-28 v1

Abstract

Given an edge-coloured graph, we say that a subgraph is rainbow if all of its edges have different colours. Let ex(n,H,\operatorname{ex}(n,H,rainbow-F)F) denote the maximal number of copies of HH that a properly edge-coloured graph on nn vertices can contain if it has no rainbow subgraph isomorphic to FF. We determine the order of magnitude of ex(n,Cs,\operatorname{ex}(n,C_s,rainbow-Ct)C_t) for all s,ts,t with s3s\not =3. In particular, we answer a question of Gerbner, M\'esz\'aros, Methuku and Palmer by showing that ex(n,C2k,\operatorname{ex}(n,C_{2k},rainbow-C2k)C_{2k}) is Θ(nk1)\Theta(n^{k-1}) if k3k\geq 3 and Θ(n2)\Theta(n^2) if k=2k=2. We also determine the order of magnitude of ex(n,P,\operatorname{ex}(n,P_\ell,rainbow-C2k)C_{2k}) for all k,2k,\ell\geq 2, where PP_\ell denotes the path with \ell edges.

Keywords

Cite

@article{arxiv.2005.08073,
  title  = {The generalised rainbow Tur\'an problem for cycles},
  author = {Barnabás Janzer},
  journal= {arXiv preprint arXiv:2005.08073},
  year   = {2022}
}

Comments

14 pages

R2 v1 2026-06-23T15:35:47.537Z