On Lebesgue measure of integral self-affine sets

Abstract

Let A be an expanding integer n× n matrix and D be a finite subset of Zn. The self-affine set T=T(A,D) is the unique compact set satisfying the equality A(T)=d∈ D (T+d). We present an effective algorithm to compute the Lebesgue measure of the self-affine set T, the measure of intersection T (T+u) for u∈ Zn, and the measure of intersection of self-affine sets T(A,D1) T(A,D2) for different sets D1,D2⊂ Zn.