English

On maximal isolation sets in the uniform intersection matrix

Combinatorics 2019-07-29 v1 Computational Complexity

Abstract

Let Ak,tA_{k,t} be the matrix that represents the adjacency matrix of the intersection bipartite graph of all subsets of size tt of {1,2,...,k}\{1,2,...,k\}. We give constructions of large isolation sets in Ak,tA_{k,t}, where, for a large enough kk, our constructions are the best possible. We first prove that the largest identity submatrix in Ak,tA_{k,t} is of size k2t+2k-2t+2. Then we provide constructions of isolations sets in Ak,tA_{k,t} for any t2t\geq 2, as follows: \begin{itemize} \item If k=2t+rk = 2t+r and 0r2t30 \leq r \leq 2t-3, there exists an isolation set of size 2r+3=2k4t+32r+3 = 2k-4t+3. \item If k4t3k \geq 4t-3, there exists an isolation set of size kk. \end{itemize} The construction is maximal for k4t3k\geq 4t-3, since the Boolean rank of Ak,tA_{k,t} is kk in this case. As we prove, the construction is maximal also for k=2t,2t+1k = 2t, 2t+1. Finally, we consider the problem of the maximal triangular isolation submatrix of Ak,tA_{k,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 ((2tt)1)×((2tt)1)({2t \choose t}-1) \times ({2t \choose t}-1), for any t1t \geq 1 and a large enough kk. This construction is tight, as there is a matching upper bound, which can be derived from a theorem of Frankl about skew matrices.

Keywords

Cite

@article{arxiv.1907.11632,
  title  = {On maximal isolation sets in the uniform intersection matrix},
  author = {Michal Parnas and Adi Shraibman},
  journal= {arXiv preprint arXiv:1907.11632},
  year   = {2019}
}
R2 v1 2026-06-23T10:32:07.140Z