Dimension of diagonal self-affine measures with exponentially separated projections

Abstract

Let μ be a self-affine measure associated with a diagonal affine iterated function system (IFS) = \ (x1, …, xd) ( ri, 1x1 + ti,1, …, ri,dxd + ti,d) \i∈ on Rd and a probability vector p = (pi)i∈. For 1 ≤ j ≤ d , denote the j -th the Lyapunov exponent by j := Σi∈ - pi | ri,j |, and define the IFS induced by on the j-th coordinate as j := \ x ri,jx + ti,j\i∈. We prove that if j1 ≠ j2 for 1 ≤ j1 < j2 ≤ d , and j is exponentially separated for 1 ≤ j ≤ d , then the dimension of μ is the minimum of d and its Lyapunov dimension. This confirms a conjecture of Rapaport by removing the additional assumption that the linear parts of the maps in are contained in a 1-dimensional subgroup. One of the main ingredients of the proof involves disintegrating μ into random measures with convolution structure. In the course of the proof, we establish new results on dimension and entropy increase for these random measures.