Strong counterexamples to Mubayi's supersaturation conjecture in every uniformity

Abstract

The supersaturation problem asks, for a fixed r-graph F, for the minimum number of copies of F in an n-vertex r-graph with (n, F)+q edges. Mubayi conjectured a local form of supersaturation under a stability hypothesis: if F is non-r-partite and stable, meaning roughly that the extremal F-free construction is unique and all near-extremal F-free r-graphs are close to it, then this minimum should be at least q c(n, F), where c(n, F) is the minimum number of copies created by adding one edge to the extremal F-free r-graph. We disprove this conjectured local lower bound in every uniformity. For every r2 and every K>1, we construct a stable r-graph F such that, for all sufficiently large n and every 1 q δn, there is an n-vertex r-graph with (n, F)+q edges and at most K-1q c(n, F) copies of F. Thus the conjectured lower bound can already fail at q=1, and the failure can be by an arbitrarily large constant factor in every uniformity.