r-wise fractional L-intersecting family

Abstract

Let L = \a1b1, … , asbs\, where for every i ∈ [s], aibi ∈ [0,1) is an irreducible fraction. Let F = \A1, … , Am\ be a family of subsets of [n]. We say F is a r-wise fractional L-intersecting family if for every distinct i1,i2, …,ir ∈ [m], there exists an ab ∈ L such that |Ai1 Ai2 … Air| ∈ \ ab|Ai1|, ab |Ai2|,…, ab |Air| \. In this paper, we introduce and study the notion of r-wise fractional L-intersecting families. This is a generalization of notion of fractional L-intersecting families studied in [Niranjan et.al, Fractional L-intersecting families, The Electronic Journal of Combinatorics, 2019].