Fluctuations in Quantum Unique Ergodicity at the Spectral Edge

Abstract

We study the eigenvector mass distribution of an N× N Wigner matrix on a set of coordinates I satisfying | I | c N for some constant c >0. For eigenvectors corresponding to eigenvalues at the spectral edge, we show that the sum of the mass on these coordinates converges to a Gaussian in the N → ∞ limit, after a suitable rescaling and centering. The proof proceeds by a two moment matching argument. We directly compare edge eigenvector observables of an arbitrary Wigner matrix to those of a Gaussian matrix, which may be computed explicitly.