Homotopy and the Homomorphism Threshold of Odd Cycles

Abstract

Consider a family F of C2r+1-free graphs, where r≥ 2. Suppose that each graph in F has minimum degree linear in its number of vertices. Thomassen showed that such a family has bounded chromatic number, or, equivalently, that all graphs in F are homomorphic to a complete graph of bounded size. Considering instead homomorphic images which are themselves C2r+1-free, we construct a family of dense C2r+1-free graphs with no C2r+1-free homomorphic image of bounded size. This provides the first nontrivial lower bound on the homomorphism threshold of odd cycles of length at least 5 and answers a question of Ebsen and Schacht. Our proof introduces a new technique to describe the topological structure of a graph. We establish a graph-theoretic analogue of homotopy equivalence, which allows us to analyze the relative placement of odd closed walks in a graph. This notion has unexpected connections to the neighborhood complex, leading to multiple interesting questions.