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Main Authors: Akhmedov, E. T., Diakonov, D. V., Lapushkin, V. I., Sadekov, D. I.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2512.24770
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author Akhmedov, E. T.
Diakonov, D. V.
Lapushkin, V. I.
Sadekov, D. I.
author_facet Akhmedov, E. T.
Diakonov, D. V.
Lapushkin, V. I.
Sadekov, D. I.
contents We re-examine the Klein paradox from a many-particle perspective in quantum field theory. Specifically, we compute the expectation value of the particle current induced by a sufficiently strong step-like electric potential in 1+1 dimensions. First, for a constant (eternal) potential, we calculate the current for different Fock space ground states corresponding to distinct mode bases. While one basis yields a zero current, another produces the standard nonzero value. We then consider a potential that is rapidly switched on, recovering the standard current in the asymptotic future. This result is generalized to potentials that interpolate between different constant values at spatial infinity. Finally, we analyze a potential acting for a finite duration and again reproduce the standard current. A physical interpretation of these results is provided.
format Preprint
id arxiv_https___arxiv_org_abs_2512_24770
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Lessons from the Klein paradox
Akhmedov, E. T.
Diakonov, D. V.
Lapushkin, V. I.
Sadekov, D. I.
High Energy Physics - Theory
We re-examine the Klein paradox from a many-particle perspective in quantum field theory. Specifically, we compute the expectation value of the particle current induced by a sufficiently strong step-like electric potential in 1+1 dimensions. First, for a constant (eternal) potential, we calculate the current for different Fock space ground states corresponding to distinct mode bases. While one basis yields a zero current, another produces the standard nonzero value. We then consider a potential that is rapidly switched on, recovering the standard current in the asymptotic future. This result is generalized to potentials that interpolate between different constant values at spatial infinity. Finally, we analyze a potential acting for a finite duration and again reproduce the standard current. A physical interpretation of these results is provided.
title Lessons from the Klein paradox
topic High Energy Physics - Theory
url https://arxiv.org/abs/2512.24770