English

Generators of Noncommutative Dynamics

Operator Algebras 2007-05-23 v1 Dynamical Systems

Abstract

For a fixed C*-algebra A, we consider all noncommutative dynamical systems that can be generated by A. More precisely, an A-dynamical system is a triple (i,B,\alpha) where α\alpha is a *-endomorphism of a C*-algebra B, and i: A --> B is the inclusion of A as a C^*-subalgebra with the property that B is generated by Aα(A)α2(A)...A\cup \alpha(A)\cup \alpha^2(A)\cup.... There is a natural hierarchy in the class of A-dynamical systems, and there is a universal one that dominates all others, denoted (i,PA,\alpha). We establish certain properties of (i,PA,α)(i,PA,\alpha) and give applications to some concrete issues of noncommutative dynamics. For example, we show that every contractive completely positive linear map ϕ:AA\phi: A\to A gives rise to to a unique A-dynamical system (i,B,\alpha) that is "minimal" with respect to ϕ\phi, and we show that its C*-algebra B can be embedded in the multiplier algebra of AKA\otimes {\mathcal K}.

Keywords

Cite

@article{arxiv.math/0201137,
  title  = {Generators of Noncommutative Dynamics},
  author = {William Arveson},
  journal= {arXiv preprint arXiv:math/0201137},
  year   = {2007}
}

Comments

LaTeX, 15 pages typeset