On the structure of graphs with given odd girth and large minimum degree

Abstract

We study minimum degree conditions for which a graph with given odd girth has a simple structure. For example, the classical work of Andr\'asfai, Erd os, and S\'os implies that every n-vertex graph with odd girth 2k+1 and minimum degree bigger than 22k+1n must be bipartite. We consider graphs with a weaker condition on the minimum degree. Generalizing results of H\"aggkvist and of H\"aggkvist and Jin for the cases k=2 and 3, we show that every n-vertex graph with odd girth 2k+1 and minimum degree bigger than 34kn is homomorphic to the cycle of length 2k+1. This is best possible in the sense that there are graphs with minimum degree 34kn and odd girth 2k+1 which are not homomorphic to the cycle of length 2k+1. Similar results were obtained by Brandt and Ribe-Baumann.