H^k $空间中动力学Fokker-Planck方程的亚矫顽力和全局亚椭圆性

IF 1 4区数学 Q1 MATHEMATICS

Kinetic and Related Models Pub Date : 2020-12-11 DOI:10.3934/krm.2023027

Chao Zhang

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引用次数: 3

摘要

本文的目的是将Villani回忆录\cite{Villani}中$H^1$空间中动力学Fokker-Planck方程的准矫顽力结果推广到高阶Sobolev空间。与$L^2$和$H^1$设置一样，$H^k$中对于相关的操作符缺乏矫顽力。为了纠正这个问题，我们将用一些精心选择的混合项和在$k$上通过归纳法构造的合适系数来修改通常的$H^k$范数。与此同时，一个类似的策略，但带有依赖于时间的系数(c.f. \cite{Herau})，通常被称为hsamrau的方法，可以用来证明$H^k$中的全局亚椭圆性。我们的正则性估计中的指数在短时间内是最优的。此外，正如我们最近的工作\cite{GLWZ}，这里的一般结果可以应用于平均场设置，以获得独立于维度的估计;特别介绍了居里-魏斯模型的应用。

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Hypocoercivity and global hypoellipticity for the kinetic Fokker-Planck equation in $ H^k $ spaces

The purpose of this paper is to extend the hypocoercivity results for the kinetic Fokker-Planck equation in $H^1$ space in Villani's memoir \cite{Villani} to higher order Sobolev spaces. As in the $L^2$ and $H^1$ setting, there is lack of coercivity in $H^k$ for the associated operator. To remedy this issue, we shall modify the usual $H^k$ norm with certain well-chosen mixed terms and with suitable coefficients which are constructed by induction on $k$. In parallel, a similar strategy but with coefficients depending on time (c.f. \cite{Herau}), usually referred as H\'erau's method, can be employed to prove global hypoellipticity in $H^k$. The exponents in our regularity estimates are optimal in short time. Moreover, as in our recent work \cite{GLWZ}, the general results here can be applied in the mean-field setting to get estimates independent of the dimension; in particular, an application to the Curie-Weiss model is presented.

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来源期刊

Kinetic and Related Models 数学-数学

CiteScore

2.10

自引率

10.00%

发文量

审稿时长

>12 weeks

期刊介绍： KRM publishes high quality papers of original research in the areas of kinetic equations spanning from mathematical theory to numerical analysis, simulations and modelling. It includes studies on models arising from physics, engineering, finance, biology, human and social sciences, together with their related fields such as fluid models, interacting particle systems and quantum systems. A more detailed indication of its scope is given by the subject interests of the members of the Board of Editors. Invited expository articles are also published from time to time.