Dense induced subgraphs of dense bipartite graphs

Abstract

We prove that every bipartite graph of sufficiently large average degree has either a Kt,t-subgraph or an induced subgraph of average degree at least t and girth at least 6. We conjecture that "6" can be replaced by "k", which strengthens a conjecture of Thomassen. In support of this conjecture, we show that it holds for regular graphs.