Gaussian Regularization of the Pseudospectrum and Davies' Conjecture

Abstract

A matrix A∈Cn× n is diagonalizable if it has a basis of linearly independent eigenvectors. Since the set of nondiagonalizable matrices has measure zero, every A∈ Cn× n is the limit of diagonalizable matrices. We prove a quantitative version of this fact conjectured by E.B. Davies: for each δ∈ (0,1), every matrix A∈ Cn× n is at least δ\|A\|-close to one whose eigenvectors have condition number at worst cn/δ, for some constants cn dependent only on n. Our proof uses tools from random matrix theory to show that the pseudospectrum of A can be regularized with the addition of a complex Gaussian perturbation. Along the way, we explain how a variant of a theorem of \'Sniady implies a conjecture of Sankar, Spielman and Teng on the optimal constant for smoothed analysis of condition numbers.