English

Continuous and discrete flows on operator algebras

Operator Algebras 2019-05-09 v1 Dynamical Systems

Abstract

Let (N,R,θ)(N,\R,\theta) be a centrally ergodic W* dynamical system. When NN is not a factor, we show that, for each t0t\not=0, the crossed product induced by the time tt automorphism θt\theta_t is not a factor if and only if there exist a rational number rr and an eigenvalue ss of the restriction of θ\theta to the center of NN, such that rst=2πrst=2\pi. In the C* setting, minimality seems to be the notion corresponding to central ergodicity. We show that if (A,R,α)(A,\R,\alpha) is a minimal unital C* dynamical system and AA is either prime or commutative but not simple, then, for each t0t\not=0, the crossed product induced by the time tt automorphism αt\alpha_t is not simple if and only if there exist a rational number rr and an eigenvalue ss of the restriction of α\alpha to the center of AA, such that rst=2πrst=2\pi.

Cite

@article{arxiv.math/0510111,
  title  = {Continuous and discrete flows on operator algebras},
  author = {Benjamín Itzá-Ortiz},
  journal= {arXiv preprint arXiv:math/0510111},
  year   = {2019}
}

Comments

7 pages