English

Asymptotic Stability I: Completely Positive Maps

Operator Algebras 2007-05-23 v4 Dynamical Systems

Abstract

We show that for every "locally finite" unit-preserving completely positive map P acting on a C*-algebra, there is a corresponding *-automorphism \alpha of another unital C*-algebra such that the two sequences P, P^2,P^3,... and \alpha, \alpha^2,\alpha^3,... have the same {\em asymptotic} behavior. The automorphism \alpha is uniquely determined by P up to conjugacy. Similar results hold for normal completely positive maps on von Neumann algebras, as well as for one-parameter semigroups. These results can be viewed as operator algebraic counterparts of the classical Perron-Frobenius theorem on the structure of square matrices with nonnegative entries.

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Cite

@article{arxiv.math/0304488,
  title  = {Asymptotic Stability I: Completely Positive Maps},
  author = {William Arveson},
  journal= {arXiv preprint arXiv:math/0304488},
  year   = {2007}
}

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