An upper bound on the smallest singular value of dense random combinatorial matrices

Abstract

Let M be an n× n random matrix with entries in \0, 1\, where each row is independently and uniformly sampled from the set of all vectors in \0, 1\n containing exactly d ones, with d=pn for some fixed constant p∈ (0,1/2]. A recent result of Tran states that the smallest singular value sn(M) is bounded below by cp n-1/2 with high probability. In this note, we establish a complementary upper bound for sn(M), proving that \[ ∀ >0 P(sn(M) d2 n) 1-Cp(+1d), \]where Cp is a positive constant depending only on p. This result confirms that the least singular value sn(M) of dense random combinatorial matrices is typically of the order n-1/2.