Rainbow Hamilton cycles in randomly coloured randomly perturbed dense graphs

Abstract

Given an n-vertex graph G with minimum degree at least d n for some fixed d > 0, the distribution G G(n,p) over the supergraphs of G is referred to as a (random) perturbation of G. We consider the distribution of edge-coloured graphs arising from assigning each edge of the random perturbation G G(n,p) a colour, chosen independently and uniformly at random from a set of colours of size r := r(n). We prove that such edge-coloured graph distributions a.a.s. admit rainbow Hamilton cycles whenever the edge-density of the random perturbation satisfies p := p(n) ≥ C/n, for some fixed C > 0, and r = (1 + o(1))n. The number of colours used is clearly asymptotically best possible. In particular, this improves upon a recent result of Anastos and Frieze (2019) in this regard. As an intermediate result, which may be of independent interest, we prove that randomly edge-coloured sparse pseudo-random graphs a.a.s. admit an almost spanning rainbow path.