C4-free subgraphs with large average degree

Abstract

Motivated by a longstanding conjecture of Thomassen, we study how large the average degree of a graph needs to be to imply that it contains a C4-free subgraph with average degree at least t. K\"uhn and Osthus showed that an average degree bound which is double exponential in t is sufficient. We give a short proof of this bound, before reducing it to a single exponential. That is, we show that any graph G with average degree at least 2ct2 t (for some constant c>0) contains a C4-free subgraph with average degree at least t. Finally, we give a construction which improves the lower bound for this problem, showing that this initial average degree must be at least t3-o(1).