1. Dynamical ionization bounds for atoms
- Author
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Mathieu Lewin, Enno Lenzmann, Mathematisches Institut, University of Basel (Unibas), Analyse, Géométrie et Modélisation (AGM - UMR 8088), Centre National de la Recherche Scientifique (CNRS)-CY Cergy Paris Université (CY), European Project: 258023,EC:FP7:ERC,ERC-2010-StG_20091028,MNIQS(2010), and CY Cergy Paris Université (CY)-Centre National de la Recherche Scientifique (CNRS)
- Subjects
Quantum dynamics ,ionization bound ,[PHYS.MPHY]Physics [physics]/Mathematical Physics [math-ph] ,FOS: Physical sciences ,Electron ,01 natural sciences ,81Q05 ,Schrödinger equation ,symbols.namesake ,Mathematics - Analysis of PDEs ,Hartree equation ,[MATH.MATH-MP]Mathematics [math]/Mathematical Physics [math-ph] ,35Q41 ,Ionization ,Quantum mechanics ,0103 physical sciences ,Atom ,FOS: Mathematics ,[MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP] ,Ball (mathematics) ,0101 mathematics ,010306 general physics ,Mathematical Physics ,Mathematics ,Numerical Analysis ,Applied Mathematics ,010102 general mathematics ,Mathematical Physics (math-ph) ,positive commutator ,35Q55 ,Nonlinear system ,81Q10 ,symbols ,RAGE theorem ,Analysis ,Analysis of PDEs (math.AP) - Abstract
International audience; We study the long-time behavior of the 3-dimensional repulsive nonlinear Hartree equation with an external attractive Coulomb potential $-Z/|x|$, which is a nonlinear model for the quantum dynamics of an atom. We show that, after a sufficiently long time, the average number of electrons in any finite ball is always smaller than 4Z (respectively 2Z in the radial case). This is a time-dependent generalization of a celebrated result by E.H. Lieb on the maximum negative ionization of atoms in the stationary case. Our proof involves a novel positive commutator argument (based on the cubic weight $|x|^3$) and our findings are reminiscent of the RAGE theorem. In addition, we prove a similar universal bound on the local kinetic energy. In particular, our main result means that, in a weak sense, any solution is attracted to a bounded set in the energy space, whatever the size of the initial datum. Moreover, we extend our main result to Hartree--Fock theory and to the linear many-body Schrödinger equation for atoms.
- Published
- 2013
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