Multidimensional self-affine sets: non-empty interior and the set of uniqueness (Q2787136)

The authors establish two results. Firstly, given a contractive matrix \(M\in \mathbb{R}^{d\times d}\) and a cyclic vector \(u\in \mathbb{R}^d\), the attractor \(A_M\) of the self-affine iterated function system \(\{M v - u, M v + u\}\) has non-empty interior if \(|\det M| \geq 2^{-1/d}\). Secondly, given the set of points \(\mathcal{U}_M\subseteq A_M\) which have a unique address, the Hausdorff dimension of \(\mathcal{U}_M\) is strictly positive if \(M\) belongs to certain classes of matrices.