Classification of tile digit sets as product-forms

Abstract

Let A be an expanding matrix on Rs with integral entries. A fundamental question in the fractal tiling theory is to understand the structure of the digit set D⊂ Zs so that the integral self-affine set T(A, D) is a translational tile on Rs. In our previous paper, we classified such tile digit sets D⊂ Z by expressing the mask polynomial P D into product of cyclotomic polynomials. In this paper, we first show that a tile digit set in Zs must be an integer tile (i.e. D L = Zs for some discrete set L). This allows us to combine the technique of Coven and Meyerowitz on integer tiling on R1 together with our previous results to characterize explicitly all tile digit sets D⊂ Z with A = pαq (p, q distinct primes) as modulo product-form of some order, an advance of the previously known results for A = pα and pq.