On self-affine tiles that are homeomorphic to a ball

Abstract

Let M be a 3× 3 integer matrix which is expanding in the sense that each of its eigenvalues is greater than 1 in modulus and let D ⊂ Z3 be a digit set containing | M| elements. Then the unique nonempty compact set T=T(M,D) defined by the set equation MT=T+D is called an integral self-affine tile if its interior is nonempty. If D is of the form D=\0,v,…, (| M|-1)v\ we say that T has a collinear digit set. The present paper is devoted to the topology of integral self-affine tiles with collinear digit sets. In particular, we prove that a large class of these tiles is homeomorphic to a closed 3-dimensional ball. Moreover, we show that in this case T carries a natural CW complex structure that is defined in terms of the intersections of T with its neighbors in the lattice tiling \T+z\,:\, z∈ Z3\ induced by T. This CW complex structure is isomorphic to the CW complex defined by the truncated octahedron.