Dirac and reduced quantization: A Lagrangian approach and application to coset spaces

A Lagrangian treatment of the quantization of first class Hamiltonian systems with constraints and Hamiltonian linear and quadratic in the momenta, respectively, is performed. The ‘‘first reduce and then quantize’’ and the ‘‘first quantize and then reduce’’ (Dirac’s) methods are compared. A source of ambiguities in this latter approach is pointed out and its relevance on issues concerning self‐consistency and equivalence with the ‘‘first reduce’’ method is emphasized. One of the main results is the relation between the propagator obtained à la Dirac and the propagator in the full space. As an application of the formalism developed, quantization on coset spaces of compact Lie groups is presented. In this case it is shown that a natural selection of a Dirac quantization allows for full self‐consistency and equivalence. Finally, the specific case of the propagator on a two‐dimensional sphere S 2 viewed as the coset space SU(2)/U(1) is worked out.