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Pré-Publication, Document De Travail Année : 2019

MODULATED FREE ENERGY AND MEAN FIELD LIMIT

Résumé

This is the document corresponding to the talk the first author gave at IHÉS for the Laurent Schwartz seminar on November 19, 2019. It concerns our recent introduction of a modulated free energy in mean-field theory in BrJaWa [4]. This physical object may be seen as a combination of the modulated potential energy introduced by S. Serfaty [See Proc. Int. Cong. Math. (2018)] and of the relative entropy introduced in mean field limit theory by P.-E. Jabin, Z. Wang [See Inventiones 2018]. It allows to obtain, for the first time, a convergence rate in the mean field limit for Riesz and Coulomb repulsive kernels in the presence of viscosity using the estimates in Du [8] and Se1 [20]. The main objective in this paper is to explain how it is possible to cover more general repulsive kernels through a Fourier transform approach as announced in BrJaWa [4] first in the case σN → 0 when N → +∞ and then if σ > 0 is fixed. Then we end the paper with comments on the particle approximation of the Patlak-Keller-Segel system which is associated to an attractive kernel and refer to [C.R.
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hal-02397471 , version 1 (06-12-2019)

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Didier Bresch, Pierre-Emmanuel Jabin, Zhenfu Wang. MODULATED FREE ENERGY AND MEAN FIELD LIMIT. 2019. ⟨hal-02397471⟩
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