On Dirac equations on phase spaces

Abstract

We consider Dirac equations on relativistic phase spaces T* Rp-1,1, where Rp-1,1 is Minkowski space with p=2,4. We use the geometric quantization approach in which the wave functions are polarized sections of a complex line bundle Lv over T* Rp-1,1. The covariant derivatives with connection Avac in this bundle define canonical commutation relations. Fermions are charged with respect to the field Avac, so lifting the Dirac equations from space-time Rp-1,1 to phase space T* Rp-1,1 results in their solutions being localized in the space Rp-1 or in space-time Rp-1,1. We describe the explicit form of these solutions.