Triangle-free Graphs with Large Minimum Common Degree

Abstract

Let G be a graph. For x∈ V(G), let N(x)=\y∈ V(G) xy∈ E(G)\. The minimum common degree of G, denoted by δ2(G), is defined as the minimum of |N(x) N(y)| over all non-edges xy of G. In 1982, H\"aggkvist showed that every triangle-free graph with minimum degree greater than 3n8 is homomorphic to a cycle of length 5. In this paper, we prove that every triangle-free graph with minimum common degree greater than n8 is homomorphic to a cycle of length 5, which implies H\"aggkvist's result. The balanced blow-up of the M\"obius ladder graph shows that it is best possible.