EKR sets for large n and r

Abstract

Let ⊂[n]r be a compressed, intersecting family and let X⊂[n]. Let (X)=A∈:A X and n,r=[n]r(1). Motivated by the Erdos-Ko-Rado theorem, Borg asked for which X⊂[2,n] do we have |(X)||n,r(X)| for all compressed, intersecting families ? We call X that satisfy this property EKR. Borg classified EKR sets X such that |X| r. Barber classified X, with |X| r, such that X is EKR for sufficiently large n, and asked how large n must be. We prove n is sufficiently large when n grows quadratically in r. In the case where has a maximal element, we are able to sharpen this bound to n>2r implies |(X)||n,r(X)|. We conclude by giving a generating function that speeds up computation of |(X)| in comparison with the na\"ive methods.