Strong \(L^2 H^2\) Convergence of the JKO Scheme for the Fokker–Planck Equation

IF 2.6 1区 数学 Q1 MATHEMATICS, APPLIED
Filippo Santambrogio, Gayrat Toshpulatov
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引用次数: 0

Abstract

Following a celebrated paper by Jordan, Kinderleherer and Otto, it is possible to discretize in time the Fokker–Planck equation \(\partial _t\varrho =\Delta \varrho +\nabla \cdot (\varrho \nabla V)\) by solving a sequence of iterated variational problems in the Wasserstein space, and the sequence of piecewise constant curves obtained from the scheme is known to converge to the solution of the continuous PDE. This convergence is uniform in time valued in the Wasserstein space and also strong in \(L^1\) in space-time. We prove in this paper, under some assumptions on the domain (a bounded and smooth convex domain) and on the initial datum (which is supposed to be bounded away from zero and infinity and belong to \(W^{1,p}\) for an exponent p larger than the dimension), that the convergence is actually strong in \(L^2_tH^2_x\), hence strongly improving open the previously known results in terms of the order of derivation in space. The technique is based on some inequalities, obtained with optimal transport techniques, that can be proven on the discrete sequence of approximate solutions, and that mimic the corresponding continuous computations.

福克-普朗克方程的 JKO 方案的强(L^2 H^2)收敛性
在乔丹、金德勒和奥托的一篇著名论文之后,通过求解瓦瑟斯坦空间中的迭代变分问题序列,可以将福克-普朗克方程 \(\partial _t\varrho =\Delta \varrho +\nabla \cdot (\varrho \nabla V)\)在时间上离散化。这种收敛在 Wasserstein 空间的时间值上是均匀的,在时空中也是\(L^1\)强的。我们在本文中证明,根据对域(一个有界的光滑凸域)和初始基准(假定它远离零和无穷大有界,并且在指数 p 大于维度时属于 \(W^{1,p}\))的一些假设,这种收敛性在 \(L^2_tH^2_x\)中实际上是强的,因此在空间推导阶次方面极大地改进了之前已知的结果。该技术基于最优传输技术得到的一些不等式,这些不等式可以在离散的近似解序列上得到证明,并模拟相应的连续计算。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
5.10
自引率
8.00%
发文量
98
审稿时长
4-8 weeks
期刊介绍: The Archive for Rational Mechanics and Analysis nourishes the discipline of mechanics as a deductive, mathematical science in the classical tradition and promotes analysis, particularly in the context of application. Its purpose is to give rapid and full publication to research of exceptional moment, depth and permanence.
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