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The Hartree equation for infinitely many particles. II. Dispersion and scattering in 2D
Published 2 Oct 2013 in math-ph, math.AP, and math.MP | (1310.0604v1)
Abstract: We consider the nonlinear Hartree equation for an interacting gas containing infinitely many particles and we investigate the large-time stability of the stationary states of the form $f(-\Delta)$, describing an homogeneous Fermi gas. Under suitable assumptions on the interaction potential and on the momentum distribution $f$, we prove that the stationary state is asymptotically stable in dimension 2. More precisely, for any initial datum which is a small perturbation of $f(-\Delta)$ in a Schatten space, the system weakly converges to the stationary state for large times.
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