On the asymptotic distribution of the singular values of powers of random matrices

Abstract

We consider powers of random matrices with independent entries. Let Xij, i,j 1, be independent complex random variables with Xij=0 and |Xij|2=1 and let X denote an n× n matrix with [ X]ij=Xij, for 1 i, j n. Denote by s1(m)... sn(m) the singular values of the random matrix W:=n- m2 Xm and define the empirical distribution of the squared singular values by Fn(m)(x)=1nΣk=1nI\sk(m)2 x\, where I\B\ denotes the indicator of an event B. We prove that under a Lindeberg condition for the fourth moment that the expected spectral distribution Fn(m)(x)= Fn(m)(x) converges to the distribution function G(m)(x) defined by its moments αk(m):=∫ Rxk\,d\,G(x)= 1mk+1km+kk.