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Strong semiclassical limit from Hartree and Hartree-Fock to Vlasov-Poisson equation

Laurent Laflèche, Chiara Saffirio

5/3/20 Published in : arXiv:2003.02926

In this paper we consider the semiclassical limit from the Hartree to the Vlasov equation with general singular interaction potential including the Coulomb and gravitational interactions, and we prove explicit bounds in the strong topologies of Schatten norms. Moreover, in the case of Fermions, we provide estimates on the size of the exchange term in the Hartree-Fock equation and also obtain a rate of convergence for the semiclassical limit from Hartree-Fock to Vlasov equation in Schatten norms. Our results hold for general initial data in some Sobolev space and are global in time.

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  • Quantum Systems

Sharp gradient stability for the Sobolev inequality

Mapping Spaces for DG Hopf Cooperads and Homotopy Automorphisms of the Rationalization of En-operads

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