Groups acting on products of trees, tiling systems and analytic K-theory

Abstract

Let T1 and T2 be homogeneous trees of even degree 4. A BM group is a torsion free discrete subgroup of (T1) × (T2) which acts freely and transitively on the vertex set of T1 × T2. This article studies dynamical systems associated with BM groups. A higher rank Cuntz-Krieger algebra A() is associated both with a 2-dimensional tiling system and with a boundary action of a BM group . An explicit expression is given for the K-theory of A(). In particular K0=K1. A complete enumeration of possible BM groups is given for a product homogeneous trees of degree 4, and the K-groups are computed.