English

Fooling sets and rank

Combinatorics 2014-01-17 v3 Computational Complexity

Abstract

An n×nn\times n matrix MM is called a \textit{fooling-set matrix of size nn} if its diagonal entries are nonzero and Mk,M,k=0M_{k,\ell} M_{\ell,k} = 0 for every kk\ne \ell. Dietzfelbinger, Hromkovi{\v{c}}, and Schnitger (1996) showed that n(\mboxrkM)2n \le (\mbox{rk} M)^2, regardless of over which field the rank is computed, and asked whether the exponent on \mboxrkM\mbox{rk} M can be improved. We settle this question. In characteristic zero, we construct an infinite family of rational fooling-set matrices with size n=(\mboxrkM+12)n = \binom{\mbox{rk} M+1}{2}. In nonzero characteristic, we construct an infinite family of matrices with n=(1+o(1))(\mboxrkM)2n= (1+o(1))(\mbox{rk} M)^2.

Keywords

Cite

@article{arxiv.1208.2920,
  title  = {Fooling sets and rank},
  author = {Mirjam Friesen and Aya Hamed and Troy Lee and Dirk Oliver Theis},
  journal= {arXiv preprint arXiv:1208.2920},
  year   = {2014}
}

Comments

10 pages. Now resolves the open problem also in characteristic 0

R2 v1 2026-06-21T21:50:34.203Z