Synopses & Reviews
This work highlights emergent research in the area of quantum probability. Several papers present a qualitative analysis of quantum dynamical semigroups and new results on q-deformed oscillator algebras, while others stress the application of classical stochastic processes in quantum modelling. All of the contributions have been thoroughly refereed and are an outgrowth of an international workshop in Stochastic Analysis and Mathematical Physics. The book targets an audience of mathematical physicists as well as specialists in probability theory, stochastic analysis, and operator algebras. Contributors to the volume include: R. Carbone, A.M. Chebotarev, M. Corgini, A.B. Cruzeiro, F. Fagnola, C. Fernández, J.C. García, A. Guichardet, E.B. Nielsen, R. Quezada, O. Rask, R. Rebolledo, K.B. Sinha, J.A. Van Casteren, W. von Waldenfels, L. Wu, J.C. Zambrini
Synopsis
The seminar on Stochastic Analysis and Mathematical Physics started in 1984 at the Catholic University of Chile in Santiago and has been an on going research activity. Since 1995, the group has organized international workshops as a way of promoting a broader dialogue among experts in the areas of classical and quantum stochastic analysis, mathematical physics and physics. This volume, consisting primarily of contributions to the Third Inter national Workshop on Stochastic Analysis and Mathematical Physics (in Spanish ANESTOC), held in Santiago, Chile, in October 1998, focuses on an analysis of quantum dynamics and related problems in probability the ory. Various articles investigate quantum dynamical semigroups and new results on q-deformed oscillator algebras, while others examine the appli cation of classical stochastic processes in quantum modeling. As in previous workshops, the topic of quantum flows and semigroups occupied an important place. In her paper, R. Carbone uses a spectral type analysis to obtain exponential rates of convergence towards the equilibrium of a quantum dynamical semigroup in the 2 sense. The method is illus trated with a quantum extension of a classical birth and death process. Quantum extensions of classical Markov processes lead to subtle problems of domains. This is in particular illustrated by F. Fagnola, who presents a pathological example of a semigroup for which the largest * -subalgebra (of the von Neumann algebra of bounded linear operators of 2 (lR+, IC)), con tained in the domain of its infinitesimal generator, is not a-weakly dense."
Table of Contents
[SEE ATTACHED] Preface * 1. R. Carbone, Exponential $L^2$-Convergence of Some Quantum Markov Semigroups Related to Birth-and-Death Processes * 2. A.Chebotarev, J. Garc\'ia, and R. Quezada, Conservativity of Quantum Dynamical Evolution Systems * 3. M. Corgini, Upper Bounds on Bogoliubov's Inner Product: Quantum Systems of Anharmonic Oscillators * 4. A. B. Cruzeiro, Liming Wu, J. C. Zambrini, Bernstein Processes Associated with a Markov Process * 5. F. Fagnola, A Simple Singular Quantum Markov Semigroup * 6. C. Fern\'andez and K.B. Sinha, On a Theory of Resonance in Quantum Mechanical Scattering * 7. A. Guichardet, Representation of the q-Deformed Oscillator Algebra * 8. E.B. Nielsen and O. Rask, On the Existence of Exponentials of Quadratic Polynomials of Field Operators on Fock Space * 9. R. Rebolledo, The Wave Map of Feller Semigroups * 10. J.A. Van Casteren, On the Korovkin Property and Feller Semigroups * 11. W. von Waldenfels, An Example of the Singular Coupling Limit