Quantum Stochastic Cocycles and Completely Bounded Semigroups on Operator Spaces II
Abstract
Quantum stochastic cocycles provide a basic model for timehomogeneous Markovian evolutions in a quantum setting, and a direct counterpart in continuous time to quantum random walks, in both the Schrödinger and Heisenberg pictures. This paper is a sequel to one in which correspondences were established between classes of quantum stochastic cocycle on an operator space or C^{∗}algebra, and classes of Schuraction `global' semigroup on associated matrix spaces over the operator space. In this paper we investigate the stochastic generation of cocycles via the generation of their corresponding global semigroups, with the primary purpose of strengthening the scope of applicability of semigroup theory to the analysis and construction of quantum stochastic cocycles. An explicit description is given of the affine relationship between the stochastic generator of a completely bounded cocycle and the generator of any one of its associated global semigroups. Using this, the structure of the stochastic generator of a completely positive quasicontractive quantum stochastic cocycle on a C^{∗}algebra whose expectation semigroup is norm continuous is derived, giving a comprehensive stochastic generalisation of the ChristensenEvans extension of the GKS&L theorem of Gorini, Kossakowski and Sudarshan, and Lindblad. The transformation also provides a new existence theorem for cocycles with unbounded structure map as stochastic generator. The latter is applied to a model of interacting particles known as the quantum exclusion Markov process, in particular on integer lattices in dimensions one and two.
 Publication:

Communications in Mathematical Physics
 Pub Date:
 April 2021
 DOI:
 10.1007/s0022002103970x
 arXiv:
 arXiv:2012.05635
 Bibcode:
 2021CMaPh.383..153L
 Keywords:

 Mathematics  Functional Analysis;
 Mathematical Physics;
 Mathematics  Operator Algebras;
 Mathematics  Probability;
 Primary 81S25;
 46L53;
 Secondary 46N50;
 47D06
 EPrint:
 44 pages