Quantization of a New Canonical, Covariant, and Symplectic Hamiltonian Density

David Chester; Xerxes D. Arsiwalla; Louis H. Kauffman; Michel Planat; Klee Irwin

doi:10.3390/sym16030316

Symmetry (Mar 2024)

Quantization of a New Canonical, Covariant, and Symplectic Hamiltonian Density

David Chester,
Xerxes D. Arsiwalla,
Louis H. Kauffman,
Michel Planat,
Klee Irwin

Affiliations

David Chester: Quantum Gravity Research, Topanga, CA 90290, USA
Xerxes D. Arsiwalla: Department of Information and Communication Technologies, Pompeu Fabra University, 08018 Barcelona, Spain
Louis H. Kauffman: Department of Mathematics, University of Illinois at Chicago, Chicago, IL 60607, USA
Michel Planat: Department of Micro NanoSciences and Systems, National Center for Scientific Research, FEMTO-ST Institute, University of Franche-Comté, F-25044 Besançon, France
Klee Irwin: Quantum Gravity Research, Topanga, CA 90290, USA

DOI: https://doi.org/10.3390/sym16030316
Journal volume & issue: Vol. 16, no. 3
p. 316

Abstract

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We generalize Koopman–von Neumann classical mechanics to poly symplectic fields and recover De Donder–Weyl’s theory. Compared with Dirac’s Hamiltonian density, it inspires a new Hamiltonian formulation with a canonical momentum field that is Lorentz-covariant with symplectic geometry. We provide commutation relations for the classical and quantum fields that generalize the Koopman–von Neumann and Heisenberg algebras. The classical algebra requires four fields that generalize spacetime, energy–momentum, frequency–wavenumber, and the Fourier conjugate of energy–momentum. We clarify how first and second quantization can be found by simply mapping between operators in classical and quantum commutator algebras.

Published in Symmetry

ISSN: 2073-8994 (Online)
Publisher: MDPI AG
Country of publisher: Switzerland
LCC subjects: Science: Mathematics
Website: http://www.mdpi.com/journal/symmetry/

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