Correspondence between the classical and quantum canonical transformation groups from an operator formulation of the wigner function

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Foundations of Physics 24 (6):873-884 (1994)
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Abstract

An explicit expression of the “Wigner operator” is derived, such that the Wigner function of a quantum state is equal to the expectation value of this operator with respect to the same state. This Wigner operator leads to a representation-independent procedure for establishing the correspondence between the inhomogeneous symplectic group applicable to linear canonical transformations in classical mechanics and the Weyl-metaplectic group governing the symmetry of unitary transformations in quantum mechanics

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10.1007/bf02067652

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The Wigner distribution function—50th birthday.R. F. O'Connell - 1983 - Foundations of Physics 13 (1):83-92.
Quantum mechanics without wave functions.Lipo Wang & R. F. O'Connell - 1988 - Foundations of Physics 18 (10):1023-1033.

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