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Fisher information for solutions of the Boltzmann equation

Published 3 Sep 2025 in math.AP | (2509.03045v1)

Abstract: This note reviews a recent contribution about the Fisher information for the space-homogeneous Boltzmann equation by L. Silvestre, C. Villani and the author (arXiv, 2024). This classical functional from information theory is shown to be nonincreasing along the flow of the non-linear PDE for all physically relevant particle interactions. The proof consists in establishing a new functional inequality on the sphere of Log-Sobolev type. This new a priori estimate on solutions yields global-in-time well posedness of the equation, in particular in the case of very singular interactions, a left open question up to this work. L'information de Fisher des solutions de l'{\'e}quation de Boltzmann R{\'e}sum{\'e}.

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