Inclusive probability of particle creation on classical backgrounds

Abstract The quantum theories of boson and fermion fields with quadratic nonstationary Hamiltoanians are rigorously constructed. The representation of the algebra of observables is given by the Hamiltonian diagonalization procedure. The sufficient conditions for the existence of unitary dynamics at...

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Main Author: Peter Kazinski
Format: Article
Language:English
Published: SpringerOpen 2020-08-01
Series:European Physical Journal C: Particles and Fields
Online Access:http://link.springer.com/article/10.1140/epjc/s10052-020-8317-8
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spelling doaj-742bb024a1324140b9abec116d04661c2020-11-25T02:50:28ZengSpringerOpenEuropean Physical Journal C: Particles and Fields1434-60441434-60522020-08-0180812810.1140/epjc/s10052-020-8317-8Inclusive probability of particle creation on classical backgroundsPeter Kazinski0Physics Faculty, Tomsk State UniversityAbstract The quantum theories of boson and fermion fields with quadratic nonstationary Hamiltoanians are rigorously constructed. The representation of the algebra of observables is given by the Hamiltonian diagonalization procedure. The sufficient conditions for the existence of unitary dynamics at finite times are formulated and the explicit formula for the matrix elements of the evolution operator is derived. In particular, this gives the well-defined expression for the one-loop effective action. The ultraviolet and infrared divergencies are regularized by the energy cutoff in the Hamiltonian of the theory. The possible infinite particle production is regulated by the corresponding counterdiabatic terms. The explicit formulas for the average number of particles $$N_D$$ ND recorded by the detector and for the probability w(D) to record a particle by the detector are derived. It is proved that these quantities allow for no-regularization limit and, in this limit, $$N_D$$ ND is finite and $$w(D)\in [0,1)$$ w(D)∈[0,1) . As an example, the theory of a neutral boson field with stationary quadratic part of the Hamiltonian and nonstationary source is considered. The average number of particles produced by this source from the vacuum during a finite time evolution and the inclusive probability to record a created particle are obtained. The infrared and ultraviolet asymptotics of the average density of created particles are derived. As a particular case, quantum electrodynamics with a classical current is considered. The ultraviolet and infrared asymptotics of the average number of photons are derived. The asymptotics of the average number of photons produced by the adiabatically driven current is found.http://link.springer.com/article/10.1140/epjc/s10052-020-8317-8
collection DOAJ
language English
format Article
sources DOAJ
author Peter Kazinski
spellingShingle Peter Kazinski
Inclusive probability of particle creation on classical backgrounds
European Physical Journal C: Particles and Fields
author_facet Peter Kazinski
author_sort Peter Kazinski
title Inclusive probability of particle creation on classical backgrounds
title_short Inclusive probability of particle creation on classical backgrounds
title_full Inclusive probability of particle creation on classical backgrounds
title_fullStr Inclusive probability of particle creation on classical backgrounds
title_full_unstemmed Inclusive probability of particle creation on classical backgrounds
title_sort inclusive probability of particle creation on classical backgrounds
publisher SpringerOpen
series European Physical Journal C: Particles and Fields
issn 1434-6044
1434-6052
publishDate 2020-08-01
description Abstract The quantum theories of boson and fermion fields with quadratic nonstationary Hamiltoanians are rigorously constructed. The representation of the algebra of observables is given by the Hamiltonian diagonalization procedure. The sufficient conditions for the existence of unitary dynamics at finite times are formulated and the explicit formula for the matrix elements of the evolution operator is derived. In particular, this gives the well-defined expression for the one-loop effective action. The ultraviolet and infrared divergencies are regularized by the energy cutoff in the Hamiltonian of the theory. The possible infinite particle production is regulated by the corresponding counterdiabatic terms. The explicit formulas for the average number of particles $$N_D$$ ND recorded by the detector and for the probability w(D) to record a particle by the detector are derived. It is proved that these quantities allow for no-regularization limit and, in this limit, $$N_D$$ ND is finite and $$w(D)\in [0,1)$$ w(D)∈[0,1) . As an example, the theory of a neutral boson field with stationary quadratic part of the Hamiltonian and nonstationary source is considered. The average number of particles produced by this source from the vacuum during a finite time evolution and the inclusive probability to record a created particle are obtained. The infrared and ultraviolet asymptotics of the average density of created particles are derived. As a particular case, quantum electrodynamics with a classical current is considered. The ultraviolet and infrared asymptotics of the average number of photons are derived. The asymptotics of the average number of photons produced by the adiabatically driven current is found.
url http://link.springer.com/article/10.1140/epjc/s10052-020-8317-8
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