Tiling groupoids and Bratteli diagrams

Abstract

Let T be an aperiodic and repetitive tiling of Rd with finite local complexity. Let O be its tiling space with canonical transversal X. The tiling equivalence relation RX is the set of pairs of tilings in X which are translates of each others, with a certain (etale) topology. In this paper RX is reconstructed as a generalized "tail equivalence" on a Bratteli diagram, with its standard AF-relation as a subequivalence relation. Using a generalization of the Anderson-Putnam complex, O is identified with the inverse limit of a sequence of finite CW-complexes. A Bratteli diagram B is built from this sequence, and its set of infinite paths dB is homeomorphic to X. The diagram B is endowed with a horizontal structure: additional edges that encode the adjacencies of patches in T. This allows to define an etale equivalence relation RB on dB which is homeomorphic to RX, and contains the AF-relation of "tail equivalence".