Optical Equivalence Theorem for Unbounded Observables

Klauder JR, Streit L (1974)
J.Math.Phys 15(6): 760-763.

Journal Article | Published | English

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The optical equivalence theorem relating c‐number and q‐number formulations of quantum optics is rigorously extended to cover various unbounded operators, and in particular those operators that directly yield counting rates.
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Klauder JR, Streit L. Optical Equivalence Theorem for Unbounded Observables. J.Math.Phys. 1974;15(6):760-763.
Klauder, J. R., & Streit, L. (1974). Optical Equivalence Theorem for Unbounded Observables. J.Math.Phys, 15(6), 760-763.
Klauder, J. R., and Streit, L. (1974). Optical Equivalence Theorem for Unbounded Observables. J.Math.Phys 15, 760-763.
Klauder, J.R., & Streit, L., 1974. Optical Equivalence Theorem for Unbounded Observables. J.Math.Phys, 15(6), p 760-763.
J.R. Klauder and L. Streit, “Optical Equivalence Theorem for Unbounded Observables”, J.Math.Phys, vol. 15, 1974, pp. 760-763.
Klauder, J.R., Streit, L.: Optical Equivalence Theorem for Unbounded Observables. J.Math.Phys. 15, 760-763 (1974).
Klauder, JR, and Streit, Ludwig. “Optical Equivalence Theorem for Unbounded Observables”. J.Math.Phys 15.6 (1974): 760-763.
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