Repeated columns and an old chestnut

Abstract

Let t 1 be a given integer. Let F be a family of subsets of [m]=\1,2,…,m\. Assume that for every pair of disjoint sets S,T⊂ [m] with |S|=|T|=k, there do not exist 2t sets in F where t subsets of F contain S and are disjoint from T and t subsets of F contain T and are disjoint from S. We show that | F| is O(mk). Our main new ingredient is allowing, during the inductive proof, multisets of subsets of [m] where the multiplicity of a given set is bounded by t-1. We use a strong stability result of Anstee and Keevash. This is further evidence for a conjecture of Anstee and Sali. These problems can be stated in the language of matrices Let t· M denote t copies of the matrix M concatenated together. We have established the conjecture for those configurations t· F for any k× 2 (0,1)-matrix F.