On maximal isolation sets in the uniform intersection matrix

Abstract

Let Ak,t be the matrix that represents the adjacency matrix of the intersection bipartite graph of all subsets of size t of \1,2,...,k\. We give constructions of large isolation sets in Ak,t, where, for a large enough k, our constructions are the best possible. We first prove that the largest identity submatrix in Ak,t is of size k-2t+2. Then we provide constructions of isolations sets in Ak,t for any t≥ 2, as follows: itemize If k = 2t+r and 0 ≤ r ≤ 2t-3, there exists an isolation set of size 2r+3 = 2k-4t+3. If k ≥ 4t-3, there exists an isolation set of size k. itemize The construction is maximal for k≥ 4t-3, since the Boolean rank of Ak,t is k in this case. As we prove, the construction is maximal also for k = 2t, 2t+1. Finally, we consider the problem of the maximal triangular isolation submatrix of Ak,t that has ones in every entry on the main diagonal and below it, and zeros elsewhere. We give an optimal construction of such a submatrix of size (2t t-1) × (2t t-1), for any t ≥ 1 and a large enough k. This construction is tight, as there is a matching upper bound, which can be derived from a theorem of Frankl about skew matrices.