Covering Two-Edge-Coloured Complete Graphs with Two Disjoint Monochromatic Cycles

PETER ALLEN

doi:10.1017/S0963548308009164

Abstract

In 1998 Łuczak Rödl and Szemerédi [7] proved, by means of the Regularity Lemma, that there exists n0 such that, for any n ≥ n0 and two-edge-colouring of Kn, there exists a pair of vertex-disjoint monochromatic cycles of opposite colours covering the vertices of Kn. In this paper we make use of an alternative method of finding useful structure in a graph, leading to a proof of the same result with a much smaller value of n0. The proof gives a polynomial-time algorithm for finding the two cycles.

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Covering Two-Edge-Coloured Complete Graphs with Two Disjoint Monochromatic Cycles

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This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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Covering Two-Edge-Coloured Complete Graphs with Two Disjoint Monochromatic Cycles

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