Universality for transversal Hamilton cycles in random graphs

Abstract

A tuple (G1,…,Gn) of graphs on the same vertex set of size n is said to be Hamilton-universal if for every map : [n][n] there exists a Hamilton cycle whose i-th edge comes from G(i). Bowtell, Morris, Pehova and Staden proved an analog of Dirac's theorem in this setting, namely that if δ(Gi)≥ (1/2+o(1))n then (G1,…,Gn) is Hamilton-universal. Combining McDiarmid's coupling and a colorful version of the Friedman-Pippenger tree embedding technique, we establish a similar result in the setting of sparse random graphs, showing that there exists C such that if the Gi are independent random graphs sampled from G(n,p), where p≥ C n/n, then (G1,…,Gn) is Hamilton-universal with high probability.