The classical limit of the time dependent Hartree-Fock equation. I. The
  Weyl symbol of the solution

Beals; Bove; Bove; Braun; Calderón; Folland; Gasser; Hörmander; Hörmander; Pezzotti; Robert; Robert; Rondeaux; Taylor; Unterberger; Zworski

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The classical limit of the time dependent Hartree-Fock equation. I. The Weyl symbol of the solution

Authors: Beals
Bove
Bove
Braun
Calderón
Folland
Gasser
Hörmander
Hörmander
Pezzotti
Robert
Robert
Rondeaux
Taylor
Unterberger
Zworski
Publication date: 28 December 2011
Publisher: 'Mathematical Sciences Publishers'
Doi

Abstract

We study the time evolution of the Weyl symbol of a solution of the time dependent Hartree Fock equation, assuming that for t=0, it has a Weyl symbol which is integrable in the phase space, such as all its derivatives. We prove that the solution has the same property for all t, and we give an asymptotic expansion, in L1 sense, of this Weyl symbol

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info:doi/10.2140%2Fapde.2013.6...

Last time updated on 04/12/2019