论文信息 - Quantum geometry of noncommutative Bernoulli shifts

Quantum geometry of noncommutative Bernoulli shifts

We construct an example of a noncommutative dynamical system defined over a two dimensional noncommutative differential manifold with two positive Lyapunov exponents equal to ln d each. This dynamical system is isomorphic to the quantum Bernoulli shift on the half-chain with the quantum dynamical entropy equal to 2 ln d. This result can be interpreted as a noncommutative analog of the isomorphism between the classical one-sided Bernoulli shift and the expanding map of the circle and moreover as an example of the noncommutative Pesin theorem.

Robert Alicki | R. Alicki

[1] Dynamical entropy of a non-commutative version of the phase doubling , 1998 .

[2] M. Kuna,et al. On quantum characteristic exponents , 1993 .

[3] P. Tuyls,et al. An Algebraic Approach to the Kolmogorov-Sinai Entropy , 1996 .

[4] Dynamical entropy for quantum systems , 1988 .

[5] S. V. Fomin,et al. Ergodic Theory , 1982 .

[6] Mark Fannes,et al. Defining quantum dynamical entropy , 1994 .

[7] W. Thirring,et al. Anosov actions on noncommutative algebras , 1994 .

[8] Alain Connes,et al. Noncommutative geometry , 1988 .

[9] A. Connes,et al. Dynamical entropy ofC* algebras and von Neumann algebras , 1987 .

[10] Dan Voiculescu,et al. Dynamical approximation entropies and topological entropy in operator algebras , 1995 .