6533b7d2fe1ef96bd125df37
RESEARCH PRODUCT
Analytic vectors, anomalies and star representations
Daniel SternheimerCarlos Alcaldesubject
Algebrasymbols.namesakeTheoretical physicsQuantization (physics)Star productLie algebrasymbolsComplex systemStatistical and Nonlinear PhysicsObservableHamiltonian (quantum mechanics)Mathematical PhysicsMathematicsdescription
It is hinted that anomalies are not really anomalous since (at least in characteristic examples) they can be related to a lack of common analytic vectors for the Hamiltonian and the observables. We reanalyze the notions of analytic vectors and of local representations of Lie algebras in this light, and show how the notion of preferred observables introduced in the deformation (star product) approach to quantization may help give an anomaly-free formulation to physical problems. Finally, some remarks are made concerning the applicability of these considerations to field theory, especially in two dimensions.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 1989-02-01 | Letters in Mathematical Physics |