Maximal fractional cross-intersecting families

Abstract

Given an irreducible fraction cd ∈ [0,1], a pair (A,B) is called a cd-cross-intersecting pair of 2[n] if A, B are two families of subsets of [n] such that for every pair A ∈A and B∈B, |A B|= cd|B|. Mathew, Ray, and Srivastava [ Fractional cross intersecting families, Graphs and Comb., 2019] proved that |A||B| 2n if (A, B) is a cd-cross-intersecting pair of 2[n] and characterized all the pairs (A,B) with |A||B|=2n, such a pair also is called a maximal cd-cross-intersecting pair of 2[n], when cd∈\0,12, 1\. In this note, we characterize all the maximal cd-cross-intersecting pairs (A,B) when 0<cd<1 and cd= 12, this result answers a question proposed by Mathew, Ray, and Srivastava (2019).