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Main Author: Vasselli, Ezio
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2405.05603
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author Vasselli, Ezio
author_facet Vasselli, Ezio
contents We construct a class of fixed-time models in which the commutations relations of a Dirac field with a bosonic field are non-trivial and depend on the choice of a given distribution ("twisting factor"). If the twisting factor is fundamental solution of a differential operator, then applying the differential operator to the bosonic field yields a generator of the local gauge transformations of the Dirac field. Charged vectors generated by the Dirac field define states of the bosonic field which in general are not local excitations of the given reference state. The Hamiltonian density of the bosonic field presents a non-trivial interaction term: besides creating and annihilating bosons, it acts on momenta of fermionic wave functions. When the twisting factor is the Coulomb potential, the bosonic field contributes to the divergence of an electric field and its Laplacian generates local gauge transformations of the Dirac field. In this way we get a fixed-time model fulfilling the equal time commutation relations of the interacting Coulomb gauge.
format Preprint
id arxiv_https___arxiv_org_abs_2405_05603
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Twisting factors and fixed-time models in quantum field theory
Vasselli, Ezio
Mathematical Physics
Quantum Physics
We construct a class of fixed-time models in which the commutations relations of a Dirac field with a bosonic field are non-trivial and depend on the choice of a given distribution ("twisting factor"). If the twisting factor is fundamental solution of a differential operator, then applying the differential operator to the bosonic field yields a generator of the local gauge transformations of the Dirac field. Charged vectors generated by the Dirac field define states of the bosonic field which in general are not local excitations of the given reference state. The Hamiltonian density of the bosonic field presents a non-trivial interaction term: besides creating and annihilating bosons, it acts on momenta of fermionic wave functions. When the twisting factor is the Coulomb potential, the bosonic field contributes to the divergence of an electric field and its Laplacian generates local gauge transformations of the Dirac field. In this way we get a fixed-time model fulfilling the equal time commutation relations of the interacting Coulomb gauge.
title Twisting factors and fixed-time models in quantum field theory
topic Mathematical Physics
Quantum Physics
url https://arxiv.org/abs/2405.05603