Bisecting and D-secting families for set systems

Abstract

Let n be any positive integer and F be a family of subsets of [n]. A family F' is said to be D-secting for F if for every A ∈ F, there exists a subset A' ∈ F' such that |A A'| - |A ([n] A')|=i, where i ∈ D, D ⊂eq \-n,-n+1,…,0,…,n\. A D-secting family F' of F, where D=\-1,0,1\, is a bisecting family ensuring the existence of a subset A' ∈ F' such that |A A'| ∈ \ |A|2, |A|2\, for each A ∈ F. In this paper, we study D-secting families for F with restrictions on D, and the cardinalities of F and the subsets of F.