Kerr-Newman electron as spinning soliton
Alexander Burinskii
TL;DR
This paper models the electron as a spinning, regularized Kerr-Newman soliton with a Higgs field, revealing a quantum spin, a Compton-sized bubble, and a stringy boundary structure.
Contribution
It develops a new regularized Kerr-Newman electron model using chiral fields and Higgs mechanism, connecting classical solutions with quantum properties.
Findings
The soliton forms a relativistically rotating bubble of Compton radius.
The boundary is a domain wall between flat interior and Kerr-Newman exterior.
The Wilson loop quantizes the electron's spin.
Abstract
Measurable parameters of the electron indicate that its background should be described by the Kerr-Newman (KN) solution. Spin/mass ratio of the electron is extreme large, and the black hole horizons disappear, opening a topological defect of spacetime -- the Kerr singular ring of the Compton size, which may be interpreted as a closed fundamental string to the low energy string theory. The singular and twosheeted structure of the corresponding Kerr space has to be regularized, and we consider the old problem of regular source of the KN solution. As a development of the earlier Keres-Israel-Hamity-L\'opez model, we describe the model of smooth and regular source forming a gravitating and relativistically rotating soliton based on the chiral field model and the Higgs mechanism of broken symmetry. The model reveals some new remarkable properties: 1) the soliton forms a relativistically…
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