On problems of Erdos and Baumann-Briggs on minimising the density of s-cliques in graphs with forbidden subgraphs

Abstract

Using flag algebras, we prove that the minimum density of 8-cliques in a large graph without an independent set of size 3 is 491411/268435456+o(1), thus resolving a new case of an old problem of Erdos [Magyar Tud. Akad. Mat. Kutat\'o Int. K\"ozl. 7 (1962) 459-464]. Also, we establish some other results of this type; for example, we show that the minimum s-clique density in a large graph with no independent set of size 3 nor an induced 5-cycle is 21-s+o(1) when s=4,5,6. For each of these results, we also describe the structure of all extremal and almost extremal graphs of large order n. These results are applied to give an asymptotic solution to a number of cases of the problem of Baumann and Briggs [Electronic J Comb 32 (2025) P1.22] which asks for the minimum number of s-cliques in an n-vertex graph in which every k-set spans a t-clique.