English

Small rainbow cliques in randomly perturbed dense graphs

Combinatorics 2022-07-18 v4

Abstract

For two graphs GG and HH, write GrbwHG \stackrel{\mathrm{rbw}}{\longrightarrow} H if GG has the property that every \emph{proper} colouring of its edges yields a \emph{rainbow} copy of HH. We study the thresholds for such so-called \emph{anti-Ramsey} properties in randomly perturbed dense graphs, which are unions of the form GG(n,p)G \cup \mathbb{G}(n,p), where GG is an nn-vertex graph with edge-density at least d>0d >0, and dd is independent of nn. In a companion article, we proved that the threshold for the property GG(n,p)rbwKG \cup \mathbb{G}(n,p) \stackrel{\mathrm{rbw}}{\longrightarrow} K_\ell is n1/m2(K/2)n^{-1/m_2(K_{\left\lceil \ell/2 \right\rceil})}, whenever 9\ell \geq 9. For smaller \ell, the thresholds behave more erratically, and for 474 \le \ell \le 7 they deviate downwards significantly from the aforementioned aesthetic form capturing the thresholds for \emph{large} cliques. In particular, we show that the thresholds for {4,5,7}\ell \in \{4, 5, 7\} are n5/4n^{-5/4}, n1n^{-1}, and n7/15n^{-7/15}, respectively. For {6,8}\ell \in \{6, 8\} we determine the threshold up to a (1+o(1))(1 + o(1))-factor in the exponent: they are n(2/3+o(1))n^{-(2/3 + o(1))} and n(2/5+o(1))n^{-(2/5 + o(1))}, respectively. For =3\ell = 3, the threshold is n2n^{-2}; this follows from a more general result about odd cycles in our companion paper.

Keywords

Cite

@article{arxiv.2006.00588,
  title  = {Small rainbow cliques in randomly perturbed dense graphs},
  author = {Elad Aigner-Horev and Oran Danon and Dan Hefetz and Shoham Letzter},
  journal= {arXiv preprint arXiv:2006.00588},
  year   = {2022}
}

Comments

41 pages, 12 figures; final journal version

R2 v1 2026-06-23T15:56:44.279Z