Strong counterexamples to a supersaturation question of Ma-Yuan

Abstract

For a graph F, let hF(n,q) be the minimum number of copies of F in an n-vertex graph with ex(n,F)+q edges, where ex(n,F) is the maximum number of edges in an n-vertex F-free graph. Let c(n,F) be the minimum number of copies obtained by adding one edge to an extremal F-free graph. Mubayi's supersaturation conjecture predicts, under a stability hypothesis, that hF(n,q) q\,c(n,F). Ma and Yuan recently constructed stable graph counterexamples for every fixed q4; they asked whether the one-edge equality hF(n,1)=c(n,F) might still hold for every graph F containing a cycle. We give a negative answer to their question. For each integer t6, let Ht be obtained from the t-vertex path by replacing each edge with a 3t-page book, using disjoint page vertices for different path edges. Then hHt(n,1)<c(n,Ht) for infinitely many values of n. Moreover, by taking t large, the ratio hHt(n,1)/c(n,Ht) can be made arbitrarily small along infinitely many values of n.