Intersections and Distinct Intersections in Cross-intersecting Families

Abstract

Let F,G be two cross-intersecting families of k-subsets of \1,2,…,n\. Let F G, I(F,G) denote the families of all intersections F G with F∈ F,G∈ G, and all distinct intersections F G with F≠ G, F∈ F,G∈ G, respectively. For a fixed T⊂ \1,2,…,n\, let ST be the family of all k-subsets of \1,2,…,n\ containing T. In the present paper, we show that |F G| is maximized when F=G=S\1\ for n≥ 2k2+8k, while surprisingly |I(F, G)| is maximized when F=S\1,2\ S\3,4\ S\1,4,5\ S\2,3,6\ and G=S\1,3\ S\2,4\ S\1,4,6\ S\2,3,5\ for n≥ 100k2. The maximum number of distinct intersections in a t-intersecting family is determined for n≥ 3(t+2)3k2 as well.