Long properly colored cycles in edge colored complete graphs

Abstract

Let Knc denote a complete graph on n vertices whose edges are colored in an arbitrary way. Let mon (Knc) denote the maximum number of edges of the same color incident with a vertex of Knc. A properly colored cycle (path) in Knc is a cycle (path) in which adjacent edges have distinct colors. B. Bollob\'as and P. Erd\"os (1976) proposed the following conjecture: if mon (Knc)< n2 , then Knc contains a properly colored Hamiltonian cycle. Li, Wang and Zhou proved that if mon (Knc)< n2 , then Knc contains a properly colored cycle of length at least n+23+1. In this paper, we improve the bound to n2 + 2.