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Abstract
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We consider an ensemble of mass collisionless particles, which interact mutually
either by an
attraction of Newton’s law of gravitation or by an electrostatic
repulsion
of Coulomb’s law, under a background downward gravity in a horizontally periodic
3D half-space, whose inflow distribution at the boundary is prescribed. We
investigate a
nonlinear asymptotic stability of its generic steady states in
the
dynamical kinetic PDE theory of the
Vlasov–Poisson equations. We
construct Lipschitz continuous
space-inhomogeneous steady states and establish
exponentially fast asymptotic stability of these steady states with respect to a
small
perturbation in a weighted Sobolev topology. In our proof, we crucially use
the Lipschitz continuity in the velocity of the steady states. Moreover, we
establish well-posedness and regularity estimates for both steady and dynamic
problems.
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Keywords
Vlasov–Poisson, Landau damping, gravity
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Mathematical Subject Classification
Primary: 35Q20
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Milestones
Received: 4 February 2023
Revised: 16 November 2023
Accepted: 28 March 2024
Published: 18 December 2024
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Publishers). |
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