Dirac-type Problem of Rainbow matchings and Hamilton cycles in Random Graphs

Abstract

Given a family of graphs G1,…,Gn on the same vertex set [n], a rainbow Hamilton cycle is a Hamilton cycle on [n] such that each Gc contributes exactly one edge. We prove that if G1,…,Gn are independent samples of G(n,p) on the same vertex set [n], then for each >0, whp, every collection of spanning subgraphs Hc⊂eq Gc, with δ(Hc)≥(12+)np, admits a rainbow Hamilton cycle. A similar result is proved for rainbow perfect matchings in a family of n/2 graphs on the same vertex set [n].

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