Given a C*-algebra $A$, a discrete abelian group $X$ and a homomorphism $Theta: X o$ Out$A$ defining the dual action group $Gammasubset$ aut$A$, the paper contains results on existence and characterization of Hilbert ${A,Gamma}$, where the action is given by $hat{X}$. They are stated at the (abstract) C*-level and can therefore be considered as a refinement of the extension results given for von Neumann algebras for example by Jones [Mem.Am.Math.Soc. 28 Nr 237 (1980)] or Sutherland [Publ.Res.Inst.Math.Sci. 16 (1980) 135]. A Hilbert extension exists iff there is a generalized 2-cocycle. These results generalize those in [Commun.Math.Phys. 15 (1969) 173], which are formulated in the context of superselection theory, where it is assumed that t...
The category of Hilbert modules with abelian C*-algebra of scalars and the category of fields of Hil...
International audienceA Hilbertian (co)algebra is defined as a (co)semigroup object in the monoidal ...
AbstractA Cuntz algebra OH is associated functorially with an infinite-dimensional Hilbert space H. ...
Given a C*-algebra $A$, a discrete abelian group $X$ and a homomorphism $Theta: X o$ Out$A$ defining...
17 pages, no figures.-- MSC1991 codes: 47L65, 22D25, 46L40 (primary), 81T05 (secondary).MR#: MR19056...
17 pages, no figures.-- MSC1991 codes: 47L65, 22D25, 46L40 (primary), 81T05 (secondary).MR#: MR19056...
17 pages, no figures.-- MSC1991 codes: 47L65, 22D25, 46L40 (primary), 81T05 (secondary).MR#: MR19056...
17 pages, no figures.-- MSC1991 codes: 47L65, 22D25, 46L40 (primary), 81T05 (secondary).MR#: MR19056...
17 pages, no figures.-- MSC1991 codes: 47L65, 22D25, 46L40 (primary), 81T05 (secondary).MR#: MR19056...
Automorphism groups #GAMMA# of C*-algebras A are considered, where #gamma#_1 x #gamma#_2 and #gamma#...
Suppose that H is a finite dimensional discrete quantum group and K is a Hilbert space. This paper s...
54 pages, no figures.-- MSC2000 codes: 22D25, 46L08, 18D10, 47L25.-- Dedicated to Detlev Buchholz on...
54 pages, no figures.-- MSC2000 codes: 22D25, 46L08, 18D10, 47L25.-- Dedicated to Detlev Buchholz on...
SIGLEAvailable from TIB Hannover: RR 1596(383) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Te...
Let T be a dual representation of a suitable subsemigroup S of a locally compact abelian group G by ...
The category of Hilbert modules with abelian C*-algebra of scalars and the category of fields of Hil...
International audienceA Hilbertian (co)algebra is defined as a (co)semigroup object in the monoidal ...
AbstractA Cuntz algebra OH is associated functorially with an infinite-dimensional Hilbert space H. ...
Given a C*-algebra $A$, a discrete abelian group $X$ and a homomorphism $Theta: X o$ Out$A$ defining...
17 pages, no figures.-- MSC1991 codes: 47L65, 22D25, 46L40 (primary), 81T05 (secondary).MR#: MR19056...
17 pages, no figures.-- MSC1991 codes: 47L65, 22D25, 46L40 (primary), 81T05 (secondary).MR#: MR19056...
17 pages, no figures.-- MSC1991 codes: 47L65, 22D25, 46L40 (primary), 81T05 (secondary).MR#: MR19056...
17 pages, no figures.-- MSC1991 codes: 47L65, 22D25, 46L40 (primary), 81T05 (secondary).MR#: MR19056...
17 pages, no figures.-- MSC1991 codes: 47L65, 22D25, 46L40 (primary), 81T05 (secondary).MR#: MR19056...
Automorphism groups #GAMMA# of C*-algebras A are considered, where #gamma#_1 x #gamma#_2 and #gamma#...
Suppose that H is a finite dimensional discrete quantum group and K is a Hilbert space. This paper s...
54 pages, no figures.-- MSC2000 codes: 22D25, 46L08, 18D10, 47L25.-- Dedicated to Detlev Buchholz on...
54 pages, no figures.-- MSC2000 codes: 22D25, 46L08, 18D10, 47L25.-- Dedicated to Detlev Buchholz on...
SIGLEAvailable from TIB Hannover: RR 1596(383) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Te...
Let T be a dual representation of a suitable subsemigroup S of a locally compact abelian group G by ...
The category of Hilbert modules with abelian C*-algebra of scalars and the category of fields of Hil...
International audienceA Hilbertian (co)algebra is defined as a (co)semigroup object in the monoidal ...
AbstractA Cuntz algebra OH is associated functorially with an infinite-dimensional Hilbert space H. ...