The smallest singular value of signed random combinatorial matrices

Abstract

Let Mn be an n× n signed random combinatorial matrix whose rows are independent and uniformly distributed over the set of \-1,0,1\-vectors with exactly n/2 zero coordinates. Despite the dependence induced by the row constraints, we prove that there exist constants C,c > 0 such that for any 0, align* P(sn(Mn) n-1/2) C+e-cn. align* In particular, the probability that Mn is singular is exponentially small. Our approach builds on the Combinatorial Least Common Denominator (CLCD) introduced by Tran and develops the method in the present constrained setting.