Tilings of convex polyhedral cones and topological properties of self-affine tiles

Abstract

Let a1,…, ar be vectors in a half-space of Rn. We call C=a1R++·s+ar R+ a convex polyhedral cone, and call \a1,…, ar\ a generator set of C. A generator set with the minimal cardinality is called a frame. We investigate the translation tilings of convex polyhedral cones. Let T⊂ Rn be a compact set such that T is the closure of its interior, and J⊂ Rn be a discrete set. We say (T,J) is a translation tiling of C if T+J=C and any two translations of T in T+J are disjoint in Lebesgue measure. We show that if the cardinality of a frame of C is larger than C, the dimension of C, then C does not admit any translation tiling; if the cardinality of a frame of C equals C, then the translation tilings of C can be reduced to the translation tilings of (Z+)n. As an application, we characterize all the self-affine tiles possessing polyhedral corners, which generalizes a result of Odlyzko [A. M. Odlyzko, Non-negative digit sets in positional number systems, Proc. London Math. Soc., 37(1978), 213-229.].