The extremal function for cycles of length mod k

Abstract

Burr and Erdos conjectured that for each k, ∈ Z+ such that k Z + contains even integers, there exists ck() such that any graph of average degree at least ck() contains a cycle of length mod k. This conjecture was proved by Bollob\'as, and many successive improvements of upper bounds on ck() appear in the literature. In this short note, for 1 ≤ ≤ k, we show that ck() is proportional to the largest average degree of a C-free graph on k vertices, which determines ck() up to an absolute constant. In particular, using known results on Tur\'an numbers for even cycles, we obtain ck() = O( k2/) for all even , which is tight for ∈ \4,6,10\. Since the complete bipartite graph K - 1,n - + 1 has no cycle of length 2 mod k, it also shows ck() = () for = ( k).