Some Remarks on g-invariant Fedosov Star Products and Quantum Momentum Mappings
Abstract
In these notes we consider the usual Fedosov star product on a symplectic manifold (M,ω) emanating from the fibrewise Weyl product , a symplectic torsion free connection ∇ on M, a formal series ∈ Z2 dR(M)[[]] of closed two-forms on M and a certain formal series s of symmetric contravariant tensor fields on M. For a given symplectic vector field X on M we derive necessary and sufficient conditions for the triple (∇,,s) determining the star product * on which the Lie derivative X with respect to X is a derivation of *. Moreover, we also give additional conditions on which X is even a quasi-inner derivation. Using these results we find necessary and sufficient criteria for a Fedosov star product to be g-invariant and to admit a quantum Hamiltonian. Finally, supposing the existence of a quantum Hamiltonian, we present a cohomological condition on that is equivalent to the existence of a quantum momentum mapping. In particular, our results show that the existence of a classical momentum mapping in general does not imply the existence of a quantum momentum mapping.
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