Approximate Spielman-Teng theorems for the least singular value of random combinatorial matrices

Abstract

An approximate Spielman-Teng theorem for the least singular value sn(Mn) of a random n× n square matrix Mn is a statement of the following form: there exist constants C,c >0 such that for all η ≥ 0, (sn(Mn) ≤ η) nCη + (-nc). The goal of this paper is to develop a simple and novel framework for proving such results for discrete random matrices. As an application, we prove an approximate Spielman-Teng theorem for \0,1\-valued matrices, each of whose rows is an independent vector with exactly n/2 zero components. This improves on previous work of Nguyen and Vu, and is the first such result in a `truly combinatorial' setting.