A solution to Erdos and Hajnal's odd cycle problem

Abstract

In 1981, Erdos and Hajnal asked whether the sum of the reciprocals of the odd cycle lengths in a graph with infinite chromatic number is necessarily infinite. Let C(G) be the set of cycle lengths in a graph G and let Codd(G) be the set of odd numbers in C(G). We prove that, if G has chromatic number k, then Σ∈ Codd(G)1/≥ (1/2-ok(1)) k. This solves Erdos and Hajnal's odd cycle problem, and, furthermore, this bound is asymptotically optimal. In 1984, Erdos asked whether there is some d such that each graph with chromatic number at least d (or perhaps even only average degree at least d) has a cycle whose length is a power of 2. We show that an average degree condition is sufficient for this problem, solving it with methods that apply to a wide range of sequences in addition to the powers of 2. Finally, we use our methods to show that, for every k, there is some d so that every graph with average degree at least d has a subdivision of the complete graph Kk in which each edge is subdivided the same number of times. This confirms a conjecture of Thomassen from 1984.