On subgraphs of C2k-free graphs and a problem of K\"uhn and Osthus

Abstract

Let c denote the largest constant such that every C6-free graph G contains a bipartite and C4-free subgraph having c fraction of edges of G. Gyori et al. showed that 38 c 25. We prove that c=38. More generally, we show that for any >0, and any integer k 2, there is a C2k-free graph G1 which does not contain a bipartite subgraph of girth greater than 2k with more than (1-122k-2)22k-1(1+) fraction of the edges of G1. There also exists a C2k-free graph G2 which does not contain a bipartite and C4-free subgraph with more than (1-12k-1)1k-1(1+) fraction of the edges of G2. One of our proofs uses the following statement, which we prove using probabilistic ideas, generalizing a theorem of Erdos: For any >0, and any integers a, b, k 2, there exists an a-uniform hypergraph H of girth greater than k which does not contain any b-colorable subhypergraph with more than (1-1ba-1)(1+) fraction of the hyperedges of H. We also prove further generalizations of this theorem. In addition, we give a new and very short proof of a result of K\"uhn and Osthus, which states that every bipartite C2k-free graph G contains a C4-free subgraph with at least 1/(k-1) fraction of the edges of G. We also answer a question of K\"uhn and Osthus about C2k-free graphs obtained by pasting together C2l's (with k>l3).