On Ramsey-type problems for paths and cycles with few colour changes

Abstract

In 1967, Gerencser and Gyárfás determined the exact values of the two-colour Ramsey numbers of paths. In a footnote, they made the following observation: Every 2-edge-coloured complete graph contains a Hamilton path with at most one colour change. Later, this led to a challenging and still wide open conjecture about covering edge-coloured complete graphs with monochromatic paths. Inspired by the original statement, we study paths and cycles with few colour changes in 3-edge-coloured complete graphs. For this, we introduce a new Ramsey-type parameter: For q,k ∈ N and a graph G, let Rqk(G) denote the smallest N ∈ N such that every q-edge-coloured complete graph on N vertices contains a copy of G with at most k vertices that are incident to edges in G of different colours. For paths, we show that R31(Pn) = 3n2 + O(1), and for even cycles, we show that R32(Cn) = 3n2 + o(n).

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