Measure of Self-Affine Sets and Associated Densities

Abstract

Let B be an n× n real expanding matrix and D be a finite subset of Rn with 0∈D. The self-affine set K=K(B,D) is the unique compact set satisfying the set-valued equation BK=d∈D(K+d). In the case where card(D)= B, we relate the Lebesgue measure of K(B,D) to the upper Beurling density of the associated measure μ=s∞Σ_0,…c,s-1∈Dδ_0+B1+…b+Bs-1s-1. If, on the other hand, card(D)< B and B is a similarity matrix, we relate the Hausdorff measure Hs(K), where s is the similarity dimension of K, to a corresponding notion of upper density for the measure μ.