A generalization of diversity for intersecting families

Abstract

Let F⊂eq [n]r be an intersecting family of sets and let (F) be the maximum degree in F, i.e., the maximum number of edges of F containing a fixed vertex. The diversity of F is defined as d(F) := |F| - (F). Diversity can be viewed as a measure of distance from the `trivial' maximum-size intersecting family given by the Erd os-Ko-Rado Theorem. Indeed, the diversity of this family is 0. Moreover, the diversity of the largest non-trivial intersecting family \`a la Hilton-Milner is 1. It is known that the maximum possible diversity of an intersecting family F⊂eq [n]r is n-3r-2 as long as n is large enough. We introduce a generalization called the C-weighted diversity of F as dC(F) := |F| - C · (F). We determine the maximum value of dC(F) for intersecting families F ⊂eq [n]r and characterize the maximal families for C∈ [0,73) as well as give general bounds for all C. Our results imply, for large n, a recent conjecture of Frankl and Wang concerning a related diversity-like measure. Our primary technique is a variant of Frankl's Delta-system method.