Cycles in triangle-free graphs of large chromatic number

Abstract

More than twenty years ago Erdos conjectured~E1 that a triangle-free graph G of chromatic number k ≥ k0() contains cycles of at least k2 - different lengths as k → ∞. In this paper, we prove the stronger fact that every triangle-free graph G of chromatic number k ≥ k0() contains cycles of (164 - )k2 k consecutive lengths, and a cycle of length at least (14 - )k2 k. As there exist triangle-free graphs of chromatic number k with at most roughly 4k2 k vertices for large k, theses results are tight up to a constant factor. We also give new lower bounds on the circumference and the number of different cycle lengths for k-chromatic graphs in other monotone classes, in particular, for Kr-free graphs and graphs without odd cycles C2s+1.