Spectrum and pseudospectrum for quadratic polynomials in Ginibre matrices

Abstract

For a fixed quadratic polynomial p in n non-commuting variables, and n independent N× N complex Ginibre matrices X1N,…, XnN, we establish the convergence of the empirical spectral distribution of PN =p(X1N,…, XnN) to the Brown measure of p evaluated at n freely independent circular elements c1,…, cn in a non-commutative probability space. The main step of the proof is to obtain quantitative control on the pseudospectrum of PN. Via the well-known linearization trick this hinges on anti-concentration properties for certain matrix-valued random walks, which we find can fail for structural reasons of a different nature from the arithmetic obstructions that were illuminated in works on the Littlewood--Offord problem for discrete scalar random walks.