Products of random matrices: Dimension and growth in norm

Abstract

Suppose that X1,\...,Xn,\... are i.i.d. rotationally invariant N-by-N matrices. Let n=Xn\... X1. It is known that n-1 |n| converges to a nonrandom limit. We prove that under certain additional assumptions on matrices Xi the speed of convergence to this limit does not decrease when the size of matrices, N, grows.