On self-affine measures with equal Hausdorff and Lyapunov dimensions

Abstract

Let μ be a self-affine measure on Rd associated to a self-affine IFS \λ(x) = Aλx + vλ\λ∈ and a probability vector p=(pλ)λ>0. Assume the strong separation condition holds. Let γ1...γd and D be the Lyapunov exponents and dimension corresponding to \Aλ\λ∈ and pN, and let G be the group generated by \Aλ\λ∈. We show that if γm+1>γm=...=γd, if G acts irreducibly on the vector space of alternating m-forms, and if the Furstenberg measure μF satisfies HμF+D>(m+1)(d-m), then μ is exact dimensional with μ=D.