Fooling sets and rank
Combinatorics
2014-01-17 v3 Computational Complexity
Abstract
An matrix is called a \textit{fooling-set matrix of size } if its diagonal entries are nonzero and for every . Dietzfelbinger, Hromkovi{\v{c}}, and Schnitger (1996) showed that , regardless of over which field the rank is computed, and asked whether the exponent on can be improved. We settle this question. In characteristic zero, we construct an infinite family of rational fooling-set matrices with size . In nonzero characteristic, we construct an infinite family of matrices with .
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