Non universality of fluctuations of outlier eigenvectors for block diagonal deformations of Wigner matrices

Abstract

In this paper, we investigate the fluctuations of a unit eigenvector associated to an outlier in the spectrum of a spiked N× N complex Deformed Wigner matrix MN: MN =WN/N + AN where WN is an N × N Hermitian Wigner matrix whose entries have a law μ satisfying a Poincar\'e inequality and the matrix AN is a block diagonal matrix, with an eigenvalue θ of multiplicity one, generating an outlier in the spectrum of MN. We prove that the fluctuations of the norm of the projection of a unit eigenvector corresponding to the outlier of MN onto a unit eigenvector corresponding to θ are not universal.