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Paper detail

C*-Algebraic Characterization of Bounded Orbit Injection Equivalence for Minimal Free Cantor Systems

Bounded orbit injection equivalence is an equivalence relation defined on minimal free Cantor systems which is a candidate to generalize flip Kakutani equivalence to actions of the Abelian free groups on more than one generator. This paper characterizes bounded orbit injection equivalence in terms of a mild strengthening of Rieffel-Morita equivalence of the associated C*-crossed-product algebras. Moreover, we construct an ordered group which is an invariant for bounded orbit injection equivalence, and does not agrees with the K\_0 group of the associated C*-crossed-product in general. This new invariant allows us to find sufficient conditions to strengthen bounded orbit injection equivalence to orbit equivalence and strong orbit equivalence.

preprint2009arXivOpen access
Frederic LatremoliereNicholas Ormes
math.OAmath.DS
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Frederic LatremoliereNicholas Ormes

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