Universality for transversal powers of Hamilton cycles

Abstract

Let k 2 and let G = \G1, …, Gm\ be a collection of graphs on a common vertex set of cardinality n. We show that if each graph in G has minimum degree at least (1-12k + o(1))n, then for every edge-colouring of the kth power of a Hamilton cycle Cnk with m colours, there is a copy of Cnk in G such that e ∈ G(e) for every edge e in Cnk. This generalises a result of Bowtell, Morris, Pehova, and Staden, who provided asymptotically best possible minimum degree conditions for the Hamilton cycle.

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