On a quantum algebraic approach to a generalized phase space

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Foundations of Physics 11 (3-4):179-203 (1981)
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Abstract

We approach the relationship between classical and quantum theories in a new way, which allows both to be expressed in the same mathematical language, in terms of a matrix algebra in a phase space. This makes clear not only the similarities of the two theories, but also certain essential differences, and lays a foundation for understanding their relationship. We use the Wigner-Moyal transformation as a change of representation in phase space, and we avoid the problem of “negative probabilities” by regarding the solutions of our equations as constants of the motion, rather than as statistical weight factors. We show a close relationship of our work to that of Prigogine and his group. We bring in a new nonnegative probability function, and we propose extensions of the theory to cover thermodynamic processes involving entropy changes, as well as the usual reversible processes

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10.1007/bf00726266

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Citations of this work

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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The implicate order, algebras, and the spinor.F. A. M. Frescura & B. J. Hiley - 1980 - Foundations of Physics 10 (1-2):7-31.

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