Paths of length five with equal-degree endpoints

Abstract

Addressing a question posed by Erdos and Hajnal, Chen and Ma proved that, for all n 600, the complete bipartite graph Kn,n+1 is the unique graph on 2n+1 vertices with at least n2+n edges that contains no two vertices of equal degree joined by a path of length three. In this paper, we extend this result and show that, for all n 11, Kn,n+1 is the unique (2n+1)-vertex graph with at least n2+n edges that avoids two equal-degree vertices joined by a path of length five. This confirms the very next case of a general conjecture of Chen and Ma on paths of odd length with equal-degree endpoints.