English

The existence problem for dynamics of dissipative systems in quantum probability

Classical Analysis and ODEs 2007-05-23 v2 Operator Algebras

Abstract

Motivated by existence problems for dissipative systems arising naturally in lattice models from quantum statistical mechanics, we consider the following CC^{\ast}-algebraic setting: A given hermitian dissipative mapping δ\delta is densely defined in a unital CC^{\ast}-algebra A\mathfrak{A}. The identity element in A{\frak A} is also in the domain of δ\delta. Completely dissipative maps δ\delta are defined by the requirement that the induced maps, (aij)(δ(aij))(a_{ij})\to (\delta (a_{ij})), are dissipative on the nn by nn complex matrices over A{\frak A} for all nn. We establish the existence of different types of maximal extensions of completely dissipative maps. If the enveloping von Neumann algebra of A{\frak A} is injective, we show the existence of an extension of δ\delta which is the infinitesimal generator of a quantum dynamical semigroup of completely positive maps in the von Neumann algebra. If δ\delta is a given well-behaved *-derivation, then we show that each of the maps δ\delta and δ-\delta is completely dissipative.

Keywords

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