The extremal number of cycles with all diagonals

Abstract

In 1975, Erdos asked the following natural question: What is the maximum number of edges that an n-vertex graph can have without containing a cycle with all diagonals? Erdos observed that the upper bound O(n5/3) holds since the complete bipartite graph K3,3 can be viewed as a cycle of length six with all diagonals. In this paper, we resolve this old problem. We prove that there exists a constant C such that every n-vertex with Cn3/2 edges contains a cycle with all diagonals. Since any cycle with all diagonals contains cycles of length four, this bound is best possible using well-known constructions of graphs without a four-cycle based on finite geometry. Among other ideas, our proof involves a novel lemma about finding an `almost-spanning' robust expander which might be of independent interest.