Dimensions of projected sets and measures on typical self-affine sets

Abstract

Let T1,…, Tm be a family of d× d invertible real matrices with \|Ti\|<1/2 for 1≤ i≤ m. For a=(a1,…, am)∈ Rmd, let π a:\; =\1,…, m\ N Rd denote the coding map associated with the affine IFS \Tix+ai\i=1m. We show that for every Borel probability measure μ on , each of the following dimensions (lower and upper Hausdorff dimensions, lower and upper packing dimensions) of π a*μ is constant for Lmd-a.e.~ a∈ Rmd, where π a*μ stands for the push-forward of μ by π a. In particular, we give a necessary and sufficient condition on μ so that π a*μ is exact dimensional for Lmd-a.e.~ a∈ Rmd. Moreover, for every analytic set E⊂ , each of the Hausdorff, packing, lower and upper box-counting dimensions of π a(E) is constant for Lmd-a.e.~ a∈ Rmd. Formal dimension formulas of these projected measures and sets are given. The Hausdorff dimensions of exceptional sets are estimated.