Exact Regularity and the Cohomology of Tiling Spaces

Abstract

The Exact Regularity Property was introduced recently as a property of homological Pisot substitutions in one dimension. In this paper, we consider exact regularity for arbitrary tiling spaces. Let T be a d dimensional repetitive tiling, and let T be its hull. If Hd(T, Q) = Qk, then there exist k patches whose appearance govern the number of appearances of every other patch. This gives uniform estimates on the convergence of all patch frequencies to the ergodic limit. If the tiling T comes from a substitution, then we can quantify that convergence rate. If T is also one-dimensional, we put constraints on the measure of any cylinder set in T.