C*-algebras of minimal dynamical systems of the product of a Cantor set and an odd dimensional sphere

Abstract

Let β : Sn Sn, for n = 2k + 1, k ≥ 1, be one of the known examples of a non-uniquely ergodic minimal diffeomorphism of an odd dimensional sphere. For every such minimal dynamical system (Sn, β) there is a Cantor minimal system (X, α) such that the corresponding product system (X x Sn, α x β) is minimal and the resulting crossed product C*-algebra C(X x Sn) α x β Z is tracially approximately an interval algebra (TAI). This entails classification for such C*-algebras. Moreover, the minimal Cantor system (X, α) is such that each tracial state on C(X x Sn) β Z induces the same state on the K0-group and such that the embedding of C(Sn) β Z into C(X x Sn) α x β Z preserves the tracial state space. This implies C(Sn) β Z is TAI after tensoring with the universal UHF algebra, which in turn shows that the C*-algebras of these examples of minimal diffeomorphisms of odd dimensional spheres are classified by their tracial state spaces.