Number of A+B C solutions in abelian groups and application to counting independent sets in hypergraphs

Abstract

The paper deals with a problem of Additive Combinatorics. Let G be a finite abelian group of order N. We prove that the number of subset triples A,B,C⊂ G such that for any x∈ A, y∈ B and z∈ C one has x+y z equals 3· 4N+N3N+1 + O((3-c*)N) for some absolute constant c*>0. This provides a tight estimate for the number of independent sets in a special 3-uniform linear hypergraph and gives a support for the natural conjecture concerning the maximal possible number of independent sets in such hypergraphs on n vertices.