On the rate of convergence to the semi-circular law

Abstract

Let X=(Xjk) denote a Hermitian random matrix with entries Xjk, which are independent for 1 j k. We consider the rate of convergence of the empirical spectral distribution function of the matrix X to the semi-circular law assuming that E Xjk=0, E Xjk2=1 and that the distributions of the matrix elements Xjk have a uniform sub exponential decay in the sense that there exists a constant >0 such that for any 1 j k n and any t 1 we have \|Xjk|>t\ -1\-t\. By means of a recursion argument it is shown that the Kolmogorov distance between the empirical spectral distribution of the Wigner matrix W=1 n X and the semicircular law is of order O(n-1b n) with some positive constant b>0.