Subgraph densities in a surface

Abstract

Given a fixed graph H that embeds in a surface , what is the maximum number of copies of H in an n-vertex graph G that embeds in ? We show that the answer is (nf(H)), where f(H) is a graph invariant called the `flap-number' of H, which is independent of . This simultaneously answers two open problems posed by Eppstein (1993). When H is a complete graph we give more precise answers.