English

Rainbow saturation of graphs

Combinatorics 2019-10-24 v2

Abstract

In this paper we study the following problem proposed by Barrus, Ferrara, Vandenbussche, and Wenger. Given a graph HH and an integer tt, what is satt(n,R(H))\operatorname{sat}_{t}\left(n, \mathfrak{R}{(H)}\right), the minimum number of edges in a tt-edge-coloured graph GG on nn vertices such that GG does not contain a rainbow copy of HH, but adding to GG a new edge in any colour from {1,2,,t}\{1,2,\ldots,t\} creates a rainbow copy of HH? Here, we completely characterize the growth rates of satt(n,R(H))\operatorname{sat}_{t}\left(n, \mathfrak{R}{(H)}\right) as a function of nn, for any graph HH belonging to a large class of connected graphs and for any te(H)t\geq e(H). This classification includes all connected graphs of minimum degree 22. In particular, we prove that satt(n,R(Kr))=Θ(nlogn)\operatorname{sat}_{t}\left(n, \mathfrak{R}{(K_r)}\right)=\Theta(n\log n), for any r3r\geq 3 and t(r2)t\geq {r \choose 2}, thus resolving a conjecture of Barrus, Ferrara, Vandenbussche, and Wenger. We also pose several new problems and conjectures.

Keywords

Cite

@article{arxiv.1710.08025,
  title  = {Rainbow saturation of graphs},
  author = {António Girão and David Lewis and Kamil Popielarz},
  journal= {arXiv preprint arXiv:1710.08025},
  year   = {2019}
}

Comments

20 pages

R2 v1 2026-06-22T22:22:03.998Z