On the Erdos-Ko-Rado Theorem and the Bollobas Theorem for t-intersecting families

Abstract

A family F is t-intersecting if any two members have at least t common elements. Erd os, Ko, and Rado proved that the maximum size of a t-intersecting family of subsets of size k is equal to n-t k-t if n≥ n0(k,t). Alon, Aydinian, and Huang considered families generalizing intersecting families, and proved the same bound. In this paper, we give a strengthening of their result by considering families generalizing t-intersecting families for all t ≥ 1. In 2004, Talbot generalized Bollob\'as's Two Families Theorem to t-intersecting families. In this paper, we proved a slight generalization of Talbot's result by using the probabilistic method.