On the dimension of Furstenberg measure for SL2(R) random matrix products

Abstract

Let μ be a measure on SL2(R) generating a non-compact and totally irreducible subgroup, let >0 denote its Lyapunov exponent, and let be the associated stationary (Furstenberg) measure for the action on the projective line. We prove that if μ is supported on finitely many matrices with algebraic entries, then \[ =\1,hRW(μ)2\ \] where hRW(μ) is the random walk entropy of μ, and denotes pointwise dimension. In particular, for every δ>0, there is a neighborhood U of the identity in SL2(R) such that if a measure μ∈P(U) is supported on algebraic matrices with all atoms of size at least δ, and generates a group which is non-compact and totally irreducible, then its stationary measure satisfies =1.