A rainbow connectivity threshold for random graph families
Abstract
Given a family of graphs on a common vertex set , we say that is rainbow connected if for every vertex pair , there exists a path from to that uses at most one edge from each graph in . We consider the case that contains graphs, each sampled randomly from , with and , where is a constant. We show that when is sufficiently large, is a.a.s. rainbow connected, and when is sufficiently small, is a.a.s. not rainbow connected. We also calculate a threshold of for the rainbow connectivity of , and we show that this threshold is concentrated on at most three values, which are larger than the diameter of the union of by about . The same results also hold in a more traditional random rainbow setting, where we take a random graph with () and color each edge of with a color chosen uniformly at random from the set of colors.
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