Some New Bounds For Cover-Free Families Through Biclique Cover

Abstract

An (r,w;d) cover-free family (CFF) is a family of subsets of a finite set such that the intersection of any r members of the family contains at least d elements that are not in the union of any other w members. The minimum number of elements for which there exists an (r,w;d)-CFF with t blocks is denoted by N((r,w;d),t). In this paper, we show that the value of N((r,w;d),t) is equal to the d-biclique covering number of the bipartite graph It(r,w) whose vertices are all w- and r-subsets of a t-element set, where a w-subset is adjacent to an r-subset if their intersection is empty. Next, we introduce some new bounds for N((r,w;d),t). For instance, we show that for r≥ w and r≥ 2 N((r,w;1),t) ≥ cr+w w+1+r+w-1 w+1+ 3 r+w-4 w-2 r (t-w+1), where c is a constant satisfies the well-known bound N((r,1;1),t)≥ cr2 r t. Also, we determine the exact value of N((r,w;d),t) for some values of d. Finally, we show that N((1,1;d),4d-1)=4d-1 whenever there exists a Hadamard matrix of order 4d.