English

A rainbow connectivity threshold for random graph families

Combinatorics 2021-07-15 v2

Abstract

Given a family G\mathcal G of graphs on a common vertex set XX, we say that G\mathcal G is rainbow connected if for every vertex pair u,vXu,v \in X, there exists a path from uu to vv that uses at most one edge from each graph in G\mathcal G. We consider the case that G\mathcal G contains ss graphs, each sampled randomly from G(n,p)G(n,p), with n=Xn = |X| and p=clognsnp = \frac{c \log n}{sn}, where c>1c > 1 is a constant. We show that when ss is sufficiently large, G\mathcal G is a.a.s. rainbow connected, and when ss is sufficiently small, G\mathcal G is a.a.s. not rainbow connected. We also calculate a threshold of ss for the rainbow connectivity of G\mathcal G, and we show that this threshold is concentrated on at most three values, which are larger than the diameter of the union of G\mathcal G by about logn(loglogn)2\frac{\log n}{(\log \log n)^2}. The same results also hold in a more traditional random rainbow setting, where we take a random graph GG(n,p)G\in G(n,p) with p=clognnp=\frac{c \log n}{n} (c>1c>1) and color each edge of GG with a color chosen uniformly at random from the set [s][s] of ss colors.

Keywords

Cite

@article{arxiv.2107.05670,
  title  = {A rainbow connectivity threshold for random graph families},
  author = {Peter Bradshaw and Bojan Mohar},
  journal= {arXiv preprint arXiv:2107.05670},
  year   = {2021}
}

Comments

15 pages

R2 v1 2026-06-24T04:07:21.646Z