Operator Quantization of Dynamical Systems With Irreducible First and Second Class Constraints
19866 pages
Published in:
- Phys.Lett.B 180 (1986) 157-162,
- Phys.Lett.B 236 (1990) 528 (erratum)
- Published: 1986
View in:
Citations per year
Abstract: (Elsevier)
An operator version is suggested of the generalized canonical quantization method of dynamical systems subjected to irreducible first- and second-class constraints. An operator analog of classical Dirac brackets is realized. Generating equations for the generalized algebra of first- and second-class constraints, as well as for the unitarizing hamiltonian are formulated. In the first-class constraint sector new generating equations are presented directly in terms of operator Dirac brackets.- quantization: constraint
- Hamiltonian formalism
- algebra: gauge
- path integral
References(12)
Figures(0)
- [1]
- [2]
- [3]
- [4]
- [5]
- [6]
- [7]
- [8]
- [9]
- [10]
- [11]
- [12]