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  1. A special construction of Berezin'sL-Kernel.C. N. Ktorides & L. C. Papaloucas - 1987 - Foundations of Physics 17 (2):201-207.
    We consider Berezin's algebraic considerations regarding the quantization of phase space polynomials. After making a connection with Prugovečki's stochastic quantization approach, we give a particular construction of Berezin's L-Kernel in terms of Prugovečki's ξ-functions.
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  • The transitions among classical mechanics, quantum mechanics, and stochastic quantum mechanics.Franklin E. Schroeck - 1982 - Foundations of Physics 12 (9):825-841.
    Various formalisms for recasting quantum mechanics in the framework of classical mechanics on phase space are reviewed and compared. Recent results in stochastic quantum mechanics are shown to avoid the difficulties encountered by the earlier approach of Wigner, as well as to avoid the well-known incompatibilities of relativity and ordinary quantum theory. Specific mappings among the various formalisms are given.
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  • The stochastic quantum mechanics approach to the unification of relativity and quantum theory.E. Prugovečki - 1984 - Foundations of Physics 14 (12):1147-1162.
    The stochastic phase-space solution of the particle localizability problem in relativistic quantum mechanics is reviewed. It leads to relativistically covariant probability measures that give rise to covariant and conserved probability currents. The resulting particle propagators are used in the formulation of stochastic geometries underlying a concept of quantum spacetime that is operationally based on stochastically extended quantum test particles. The epistemological implications of the intrinsic stochasticity of such quantum spacetime frameworks for microcausality, the EPR paradox, etc., are discussed.
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  • Time-energy uncertainty and relativistic canonical commutation relations in quantum spacetime.Eduard Prugovečki - 1982 - Foundations of Physics 12 (6):555-564.
    It is shown that the time operatorQ 0 appearing in the realization of the RCCR's [Qμ,Pv]=−jhgμv, on Minkowski quantum spacetime is a self adjoint operator on Hilbert space of square integrable functions over Σ m =σ×v m , where σ is a timelike hyperplane. This result leads to time-energy uncertainty relations that match their space-momentum counterparts. The operators Qμ appearing in Born's metric operator in quantum spacetime emerge as internal spacetime operators for exciton states, and the condition that the metric (...)
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  • General aspects of stochastic quantum field theory for extended particles.Eduard Prugovečki - 1981 - Foundations of Physics 11 (7-8):501-527.
    Theories of free fields describing spin zero and1/2 extended particles are derived within the stochastic quantum field theory (SQFT) framework. Covariant SQFT analogs of free Schwinger functions and Feynman propagators are obtained, and explicit expressions for charge and four-momentum operators are derived which exhibit a remarkable formal resemblance to their local counterparts. It is shown that the essential results of the LSZ formalism for interacting fields also have their counterpart in SQFT, and that the same holds true of Wightman's reconstruction (...)
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  • Stochastic phase spaces, fuzzy sets, and statistical metric spaces.W. Guz - 1984 - Foundations of Physics 14 (9):821-848.
    This paper is devoted to the study of the notion of the phase-space representation of quantum theory in both the nonrelativisitic and the relativisitic cases. Then, as a derived concept, the stochastic phase space is introduced and its connections with fuzzy set theory and probabilistic topological (in particular, metric) spaces are discussed.
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