A unified relative entropy framework yields quantitative strong and weak convergence for diffusive, high-field, and strong-magnetic-field limits of Vlasov-Fokker-Planck equations with Riesz-type interactions.
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A new quantitative bound for the high-dimensional entropic central limit theorem is derived by extending the Johnson-Barron projection method and applying a Wang-type dimension-free Harnack inequality under the Poincaré inequality assumption.
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A unified relative entropy framework for macroscopic limits of Vlasov--Fokker--Planck equations
A unified relative entropy framework yields quantitative strong and weak convergence for diffusive, high-field, and strong-magnetic-field limits of Vlasov-Fokker-Planck equations with Riesz-type interactions.
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Quantitative bounds for high dimensional entropic CLT
A new quantitative bound for the high-dimensional entropic central limit theorem is derived by extending the Johnson-Barron projection method and applying a Wang-type dimension-free Harnack inequality under the Poincaré inequality assumption.