Counting substructures III: quadruple systems

Abstract

For various quadruple systems F, we give asymptotically sharp lower bounds on the number of copies of F in a quadruple system with a prescribed number of vertices and edges. Our results extend those of Furedi, Keevash, Pikhurko, Simonovits and Sudakov who proved under the same conditions that there is one copy of F. Our proofs use the hypergraph removal Lemma and stability results for the corresponding Turan problem proved by the above authors.