Maximum size intersecting families of bounded minimum positive co-degree

Abstract

Let H be an r-uniform hypergraph. The minimum positive co-degree of H, denoted by δr-1+(H), is the minimum k such that if S is an (r-1)-set contained in a hyperedge of H, then S is contained in at least k hyperedges of H. For r≥ k fixed and n sufficiently large, we determine the maximum possible size of an intersecting r-uniform n-vertex hypergraph with minimum positive co-degree δr-1+(H) ≥ k and characterize the unique hypergraph attaining this maximum. This generalizes the Erd os-Ko-Rado theorem which corresponds to the case k=1. Our proof is based on the delta-system method.