Convergence to the Landau equation from the truncated BBGKY hierarchy in the weak-coupling limit

We consider the evolution of the one-particle function in the weak-coupling limit in three space dimensions, obtained by truncating the BBGKY hierarchy under a propagation of chaos approximation. For this dynamics, we rigorously show the convergence to a solution of the Landau equation, keeping the...

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Bibliographic Details
Published in:arXiv.org 2019-05
Main Author: Winter, Raphael
Format: Article
Language:English
Subjects:
BBGKY hierarchy
Convergence
Coupling
Particle interactions
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Summary:We consider the evolution of the one-particle function in the weak-coupling limit in three space dimensions, obtained by truncating the BBGKY hierarchy under a propagation of chaos approximation. For this dynamics, we rigorously show the convergence to a solution of the Landau equation, keeping the full singularity of the Landau kernel. This resolves the issue arising from [10], where the singular region has been removed artificially. Since the singularity appears in the Landau equation due to the geometry of particle interactions, it is an intrinsic physical property of the weak-coupling limit which is crucial to the understanding of the transition from particle systems to the Landau equation.
ISSN:2331-8422