Approximate K-conjugacies and C*-approximate conjugacies of minimal dynamical systems
Abstract
In this article, we extend H. Matui and H. Lin's notions of approximate K-conjugacies and C*-strongly approximate conjugacies to general minimal dynamical systems. In particular, upon modifying a result of the existence of minimal skew products, we answer a question of H. Lin and show that, associated with any Cantor minimal system (K,α), there is a class R0(α) of minimal skew products on K×, such that for any two rigid homeomorphisms α∈ R0(α) and β∈ R0(β), the notions of approximate K-conjugacy and C*-strongly approximate conjugacy coincide, which are also equivalent to a K-version of Tomiyama's commutative diagram, where is an (infinite) connected finite CW-complex with torsion free K-groups and the so-called Lipschitz-minimal-property (LMP).
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