Minimal dynamical systems on the product of the Cantor set and the circle II

Abstract

Let X be the Cantor set and φ be a minimal homeomorphism on X×. We show that the crossed product C*-algebra C*(X×,φ) is a simple A-algebra provided that the associated cocycle takes its values in rotations on . Given two minimal systems (X×,φ) and (Y×,) such that φ and arise from cocycles with values in isometric homeomorphisms on , we show that two systems are approximately K-conjugate when they have the same K-theoretical information.

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