Random product of quasi-periodic cocycles

Abstract

Given a finite set of quasi-periodic cocycles the random product of them is defined as the random composition according to some probability measure. We prove that the set of Cr, 0≤ r ≤ ∞ (or analytic) k+1-tuples of quasi periodic cocycles taking values in SL2(R) such that the random product of them has positive Lyapunov exponent contains a C0 open and Cr dense subset which is formed by C0 continuity point of the Lyapunov exponent For k+1-tuples of quasi periodic cocycles taking values in GLd(R) for d>2, we prove that if one of them is diagonal, then there exists a Cr dense set of such k+1-tuples which has simples Lyapunov spectrum and are C0 continuity point of the Lyapunov exponent.