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arxiv: quant-ph/9712058 · v1 · submitted 1997-12-31 · 🪐 quant-ph · gr-qc· hep-th· math-ph· math.MP

Towards the Born-Weyl Quantization of Fields

classification 🪐 quant-ph gr-qchep-thmath-phmath.MP
keywords fieldtheorycovariantdonder-weylodingerquantizationschranalogue
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Elements of the quantization in field theory based on the covariant polymomentum Hamiltonian formalism (the De Donder-Weyl theory), a possibility of which was originally discussed in 1934 by Born and Weyl, are developed. The approach is based on a recently proposed graded Poisson bracket on differential forms in field theory (see e.g. hep-th/9709229). A covariant analogue of the Schr\"odinger equation for a hypercomplex wave function on the space of field and space-time variables is put forward. It is shown to lead to the De Donder-Weyl Hamilton-Jacobi equations in quasiclassical limit. A possible relation to the functional Schr\"odinger picture in quantum field theory is outlined.

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