Fooling sets and rank
Abstract
An n× n matrix M is called a fooling-set matrix of size n if its diagonal entries are nonzero and Mk, M,k = 0 for every k . Dietzfelbinger, Hromkovic, and Schnitger (1996) showed that n (rk M)2, regardless of over which field the rank is computed, and asked whether the exponent on 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 = rk M+12. In nonzero characteristic, we construct an infinite family of matrices with n= (1+o(1))(rk M)2.
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