TL;DR
This paper investigates the asymptotic behavior of a bilocal composite field in a nucleus-electron system, demonstrating that it conforms to proper commutation relations within the atom's sub-Fock space.
Contribution
It provides a theoretical analysis of the asymptotic properties of composite fields in atomic systems, establishing their local field behavior and commutation relations.
Findings
The composite field satisfies proper commutation relations.
The local field description is valid in the sub-Fock-space.
Asymptotic limits of bilocal fields are characterized.
Abstract
The space-like asymptotic limit of the bilocal composite field of the state consisting of a nucleus and an electron is studied. It is shown that the resulting local field of an atom satisfies the proper commutation relations in the sub-Fock-space of the atom.
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Taxonomy
TopicsSpectral Theory in Mathematical Physics · Quantum and Classical Electrodynamics · Random Matrices and Applications