Two-dimensional self-affine sets with interior points, and the set of uniqueness

Abstract

Let M be a 2×2 real matrix with both eigenvalues less than~1 in modulus. Consider two self-affine contraction maps from R2 R2, equation* Tm(v) = M v - u \ \ and\ \ Tp(v) = M v + u, equation* where u≠0. We are interested in the properties of the attractor of the iterated function system (IFS) generated by Tm and Tp, i.e., the unique non-empty compact set A such that A = Tm(A) Tp(A). Our two main results are as follows: 1. If both eigenvalues of M are between 2-1/4≈ 0.8409 and 1 in absolute value, and the IFS is non-degenerate, then A has non-empty interior. 2. For almost all non-degenerate IFS, the set of points which have a unique address is of positive Hausdorff dimension -- with the exceptional cases fully described as well. This paper continues our work begun in [11].