A family of *-algebras allowing Wick ordering: Fock representations and universal enveloping $C^*$-algebras
arXiv:math/0010308
Abstract
We consider an abstract Wick ordering as a family of relations on elements a_i and define *-algebras by these relations. The relations are given by a fixed operator T:h\otimes h --> h \otimes h, where h is one-particle space, and they naturally define both a *-algebra and an inner-product space H_T, <.,.>_T. If a_i^* denotes the adjoint, i.e., <a_iÏ,Ï>_T=<Ï,a_i^*Ï>_T, then we identify when <.,.>_T is positive semidefinite (the positivity question). In the case of deformations of the CCR-relations (the q_{ij}-CCR and the twisted CCR's), we work out the universal C*-algebras A, and we prove that, in these cases, the Fock representations of the A's are faithful.
9 pages, LaTeX2e document class "crckbked", NATO workshop proceedings (Kluwer) submission