Minimum degree conditions for monochromatic cycle partitioning

Abstract

A classical result of Erdos, Gy\'arf\'as and Pyber states that any r-edge-coloured complete graph has a partition into O(r2 r) monochromatic cycles. Here we determine the minimum degree threshold for this property. More precisely, we show that there exists a constant c such that any r-edge-coloured graph on n vertices with minimum degree at least n/2 + c · r n has a partition into O(r2) monochromatic cycles. We also provide constructions showing that the minimum degree condition and the number of cycles are essentially tight.