Chio Condensation and Random Sign Matrices

Abstract

This is to suggest a new approach to the old and open problem of counting the number fn of Z-singular n x n matrices with entries from -1,+1: Comparison of two measures, none of them the uniform measure, one of them closely related to it, the other asymptotically under control by a recent theorem of Bourgain, Vu and Wood. We will define a measure Pchio on the set -1,0,+1([n-1]2) of all (n-1)x(n-1)-matrices with entries from -1,0,+1 which (owing to a determinant identity published by M. F. Chio in 1853) is closely related to the uniform measures on -1,+1([n]2) and 0,1([n-1]2) and at the same time it intriguingly mimics the so-called lazy coin flip distribution Plcf on -1,0,+1([n-1]2), with the resemblance fading more and more as the events get smaller. This is relevant in view of a recent theorem of J. Bourgain, V. H. Vu and P. M. Wood (J. Funct. Anal. 258 (2010), 559--603) which proves that if the entries of an n x n matrix whose -1,0,+1-entries are governed by Plcf and fully independent (they are not when governed by Pchio), then an asymptotically optimal bound on the singularity probability over Z can be proved. We will characterize Pchio graph-theoretically and use the characterization to prove that given a B in -1,0,+1([n-1]2), deciding whether Pchio[B] = Plcf[B] is equivalent to deciding an evasive graph property, hence the time complexity of this decision is Omega(n2). Moreover, we will prove k-wise independence properties of Pchio. Many questions suggest themselves that call for further work. In particular, the present paper will close with more constrained equivalent formulations of the conjecture fn/2(n2) ~ (1/2 + o(1))n.