Boundaries of Disk-like Self-affine Tiles

Abstract

Let T:= T(A, D) be a disk-like self-affine tile generated by an integral expanding matrix A and a consecutive collinear digit set D, and let f(x)=x2+px+q be the characteristic polynomial of A. In the paper, we identify the boundary ∂ T with a sofic system by constructing a neighbor graph and derive equivalent conditions for the pair (A, D) to be a number system. Moreover, by using the graph-directed construction and a device of pseudo-norm ω, we find the generalized Hausdorff dimension Hω (∂ T)=2 (M)/ |q| where (M) is the spectral radius of certain contact matrix M. Especially, when A is a similarity, we obtain the standard Hausdorff dimension H (∂ T)=2 / |q| where is the largest positive zero of the cubic polynomial x3-(|p|-1)x2-(|q|-|p|)x-|q|, which is simpler than the known result.