The existence problem for dynamics of dissipative systems in quantum probability
Abstract
Motivated by existence problems for dissipative systems arising naturally in lattice models from quantum statistical mechanics, we consider the following -algebraic setting: A given hermitian dissipative mapping is densely defined in a unital -algebra . The identity element in is also in the domain of . Completely dissipative maps are defined by the requirement that the induced maps, , are dissipative on the by complex matrices over for all . We establish the existence of different types of maximal extensions of completely dissipative maps. If the enveloping von Neumann algebra of is injective, we show the existence of an extension of which is the infinitesimal generator of a quantum dynamical semigroup of completely positive maps in the von Neumann algebra. If is a given well-behaved *-derivation, then we show that each of the maps and is completely dissipative.
Cite
@article{arxiv.math/0207084,
title = {The existence problem for dynamics of dissipative systems in quantum probability},
author = {Palle E. T. Jorgensen},
journal= {arXiv preprint arXiv:math/0207084},
year = {2007}
}
Comments
24 pages, LaTeX/REVTeX v. 4.0, submitted to J. Math. Phys.; PACS 02., 02.10.Hh, 02.30.Tb, 03.65.-w, 05.30.-d