Books vs Triangles

Abstract

A book of size b in a graph is an edge that lies in b triangles. Consider a graph G with n vertices and n2/4 +1 edges. Rademacher proved that G contains at least n/2 triangles, and Erdos conjectured and Edwards proved that G contains a book of size at least n/6. We prove the following "linear combination" of these two results. Suppose that α∈ (1/2, 1) and the maximum size of a book in G is less than α n/2. Then G contains at least α(1-α) n2/4 - o(n2) triangles as n approaches infinity. This is asymptotically sharp. On the other hand, for every α∈ (1/3, 1/2), there exists β>0 such that G contains at least β n3 triangles. It remains an open problem to determine the largest possible β in terms of α. Our proof uses the Ruzsa-Szemeredi theorem.