Monochromatic cycle partitions in local edge colourings

Abstract

An edge colouring of a graph is said to be an r-local colouring if the edges incident to any vertex are coloured with at most r colours. Generalising a result of Bessy and Thomass\'e, we prove that the vertex set of any 2-locally coloured complete graph may be partitioned into two disjoint monochromatic cycles of different colours. Moreover, for any natural number r, we show that the vertex set of any r-locally coloured complete graph may be partitioned into O(r2 r) disjoint monochromatic cycles. This generalises a result of Erdos, Gy\'arf\'as and Pyber.