English

Classification of homomorphisms and dynamical systems

Operator Algebras 2007-05-23 v3 Functional Analysis

Abstract

Let AA be a unital simple C*-algebra with tracial rank zero and XX be a compact metric space. Suppose that h1,h2:C(X)Ah_1, h_2: C(X)\to A are two unital monomorphisms. We show that h1h_1 and h2h_2 are approximately unitarily equivalent if and only if [h1]=[h2]inKL(C(X),A)andτh1(f)=τh2(f) [h_1]=[h_2] {\rm in} KL(C(X),A) {\rm and} \tau\circ h_1(f)=\tau\circ h_2(f) for every fC(X)f\in C(X) and every trace τ\tau of A.A. Adopting a theorem of Tomiyama, we introduce a notion of approximate conjugacy for minimal dynamical systems. Let XX be a compact metric space and α,β:XX\alpha, \beta: X\to X be two minimal homeomorphisms. Using the above mentioned result, we show that two dynamical systems are approximately conjugate in that sense if and only if a KK-theoretical condition is satisfied. In the case that XX is the Cantor set, this notion coincides with strong orbit equivalence of Giordano, Putnam and Skau and the KK-theoretical condition is equivalent to saying that the associate crossed product C*-algebras are isomorphic. Another application of the above mentioned result is given for CC^*-dynamical systems related to a problem of Kishimoto. Let AA be a unital simple AH-algebra with no dimension growth and with real rank zero, and let αAut(A).\alpha\in Aut(A). We prove that if αr\alpha^r fixes a large subgroup of K0(A)K_0(A) and has the tracial Rokhlin property then AαZA\rtimes_{\alpha}\Z is again a unital simple AH-algebra with no dimension growth and with real rank zero.

Keywords

Cite

@article{arxiv.math/0404018,
  title  = {Classification of homomorphisms and dynamical systems},
  author = {Huaxin Lin},
  journal= {arXiv preprint arXiv:math/0404018},
  year   = {2007}
}