The Isotropic Semicircle Law and Deformation of Wigner Matrices

Abstract

We analyse the spectrum of additive finite-rank deformations of N × N Wigner matrices H. The spectrum of the deformed matrix undergoes a transition, associated with the creation or annihilation of an outlier, when an eigenvalue di of the deformation crosses a critical value 1. This transition happens on the scale |di| - 1 N-1/3. We allow the eigenvalues di of the deformation to depend on N under the condition |di - 1| ≥ ( N)C N N-1/3. We make no assumptions on the eigenvectors of the deformation. In the limit N ∞, we identify the law of the outliers and prove that the non-outliers close to the spectral edge have a universal distribution coinciding with that of the extremal eigenvalues of a Gaussian matrix ensemble. A key ingredient in our proof is the isotropic local semicircle law, which establishes optimal high-probability bounds on the quantity < v,[(H - z)-1 - m(z) 1] w >, where m(z) is the Stieltjes transform of Wigner's semicircle law and v, w are arbitrary deterministic vectors.