Existence of Global-In-Time Solutions to a Generalized Dirac-Fock Type Evolution Equation |
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Authors: | Christian?Hainzl Mathieu?Lewinand Email author" target="_blank">Christof?SparberEmail author |
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Institution: | (1) Department of Mathematics, University of Copenhagen, Universitetsparken 5, 2100 Copenhagen, Denmark;(2) Department of Numerical Mathematics, University of Münster, Einsteinstrasse 62, D48149;(3) Münster Wolfgang Pauli Institute Vienna c/o Faculty of Mathematics, Vienna University, Nordbergstrasse 15, A1090 Vienna, Austria |
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Abstract: | We consider a generalized DiracFock type evolution equation deduced from nophoton Quantum Electrodynamics, which describes the selfconsistent timeevolution of relativistic electrons, the observable ones as well as those filling up the Dirac sea. This equation has been originally introduced by Dirac in 1934 in a simplified form. Since we work in a Hartree-Fock type approximation, the elements describing the physical state of the electrons are infinite rank projectors. Using the Bogoliubov-Dirac-Fock formalism, introduced by ChaixIracane (J. Phys. B., 22, 37913814, 1989), and recently established by Hainzl-Lewin-Séré, we prove the existence of globalintime solutions of the considered evolution equation. |
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Keywords: | QED vacuum polarization Dirac equation HartreeFock model semilinear evolution equations |
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