Universality for a global property of the eigenvectors of Wigner matrices

Abstract

Let Mn be an n× n real (resp. complex) Wigner matrix and Unn Un* be its spectral decomposition. Set (y1,y2...,yn)T=Un*x, where x=(x1,x2,..., xn)T is a real (resp. complex) unit vector. Under the assumption that the elements of Mn have 4 matching moments with those of GOE (resp. GUE), we show that the process Xn(t)=β n2Σi=1 nt(|yi|2-1n) converges weakly to the Brownian bridge for any x such that ||x||∞→ 0 as n→ ∞, where β=1 for the real case and β=2 for the complex case. Such a result indicates that the othorgonal (resp. unitary) matrices with columns being the eigenvectors of Wigner matrices are asymptotically Haar distributed on the orthorgonal (resp. unitary) group from a certain perspective.