Dimension of diagonal self-affine sets and measures via non-conformal partitions

Abstract

Let :=\ (x1,...,xd)→(ri,1x1+ai,1,...,ri,dxd+ai,d)\ i∈ be an affine diagonal IFS on Rd. Suppose that for each 1 j1<j2 d there exists i∈ so that |ri,j1||ri,j2|, and that for each 1 j d the IFS \ t→ ri,jt+ai,j\ i∈ on the real line is exponentially separated. Under these assumptions we show that the Hausdorff dimension of the attractor of is equal to \ A,d\ , where A is the affinity dimension. This follows from a result regarding self-affine measures, which says that, under the additional assumption that the linear parts of the maps in are all contained in a 1-dimensional subgroup, the dimension of an associated self-affine measure μ is equal to the minimum of its Lyapunov dimension and d. Most of the proof is dedicated to an entropy increase result for convolutions of μ with general measures θ of non-negligible entropy, where entropy is measured with respect to non-conformal partitions corresponding to the Lyapunov exponents of μ. It turns out that with respect to these partitions, the entropy across scales of repeated self-convolutions of θ behaves quite differently compared to the conformal case. The analysis of this non-conformal multi-scale entropy is the main ingredient of the proof, and is also the main novelty of this paper.