论文信息 - Generic Quantum Markov Semigroups: the Fock Case

Generic Quantum Markov Semigroups: the Fock Case

We introduce the class of generic quantum Markov semigroups. Within this class we study the class corresponding to the Fock case which is further split into four subclasses each of which contains both bounded and unbounded generators, depending on some global characteristics of the intensities of jumps. For the first two of these classes we find an explicit solution which reduces the problem of finding the quantum semigroup to the calculation of two classical semigroups, one of which is diagonal (in a suitable basis) and the other one is triangular (in the same basis). In the bounded case our formula gives the unique solution. In the unbounded case it gives one solution, which we conjecture to be the minimal one.

Luigi Accardi | Skander Hachicha | H. Ouerdiane

[1] Raffaella Carbone. OPTIMAL LOG-SOBOLEV INEQUALITY AND HYPERCONTRACTIVITY FOR POSITIVE SEMIGROUPS ON $M_2({\mathbb C})$ , 2004 .

[2] A. Chebotarev. Sufficient conditions for dissipative dynamical semigroups to be conservative , 1989 .

[3] Igor Volovich,et al. Quantum Theory and Its Stochastic Limit , 2002 .

[4] A. Chebotarev. Lecture on Quantum Probability , 2000 .

[5] HILLE–YOSIDA ESTIMATE AND NONCONSERVATIVITY CRITERIA FOR QUANTUM DYNAMICAL SEMIGROUPS , 2004 .

[6] Luigi Accardi,et al. Quantum Interacting Particle Systems , 2002 .

[7] F. Fagnola,et al. Quantum Markov Semigroups and their Stationary States , 2003 .

[8] Sufficient Conditions for Conservativity of Minimal Quantum Dynamical Semigroups , 1997, funct-an/9711006.