Long-term accuracy of numerical approximations of SPDEs with the stochastic Navier–Stokes equations as a paradigm

IF 2.3 2区 数学 Q1 MATHEMATICS, APPLIED
Nathan E Glatt-Holtz, Cecilia F Mondaini
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引用次数: 0

Abstract

This work introduces a general framework for establishing the long time accuracy for approximations of Markovian dynamical systems on separable Banach spaces. Our results illuminate the role that a certain uniformity in Wasserstein contraction rates for the approximating dynamics bears on long time accuracy estimates. In particular, our approach yields weak consistency bounds on ${\mathbb{R}}^{+}$ while providing a means to sidestepping a commonly occurring situation where certain higher order moment bounds are unavailable for the approximating dynamics. Additionally, to facilitate the analytical core of our approach, we develop a refinement of certain ‘weak Harris theorems’. This extension expands the scope of applicability of such Wasserstein contraction estimates to a variety of interesting stochastic partial differential equation examples involving weaker dissipation or stronger nonlinearity than would be covered by the existing literature. As a guiding and paradigmatic example, we apply our formalism to the stochastic 2D Navier–Stokes equations and to a semi-implicit in time and spectral Galerkin in space numerical approximation of this system. In the case of a numerical approximation, we establish quantitative estimates on the approximation of invariant measures as well as prove weak consistency on ${\mathbb{R}}^{+}$. To develop these numerical analysis results, we provide a refinement of $L^{2}_{x}$ accuracy bounds in comparison to the existing literature, which are results of independent interest.
以随机纳维-斯托克斯方程为范例的 SPDE 数值近似的长期准确性
这项研究引入了一个通用框架,用于确定可分离巴拿赫空间上马尔可夫动力系统近似的长时间精度。我们的结果阐明了近似动力学的瓦瑟斯坦收缩率的某种统一性对长时间精度估计的影响。特别是,我们的方法在${/mathbb{R}}^{+}$上得到了弱一致性约束,同时提供了一种方法来避开常见的情况,即近似动力学无法获得某些高阶矩约束。此外,为了促进我们方法的分析核心,我们对某些 "弱哈里斯定理 "进行了改进。这种扩展将这种瓦瑟斯坦收缩估计的适用范围扩大到各种有趣的随机偏微分方程实例,其中涉及的耗散或非线性比现有文献所涵盖的更弱。作为一个指导性的范例,我们将我们的形式主义应用于随机二维 Navier-Stokes 方程以及该系统的时间半隐式和空间谱 Galerkin 数值近似。在数值近似的情况下,我们建立了对近似不变度量的定量估计,并证明了 ${mathbb{R}}^{+}$ 上的弱一致性。为了发展这些数值分析结果,我们提供了与现有文献相比较的 $L^{2}_{x}$ 精度约束的改进,这些都是独立关注的结果。
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来源期刊
IMA Journal of Numerical Analysis
IMA Journal of Numerical Analysis 数学-应用数学
CiteScore
5.30
自引率
4.80%
发文量
79
审稿时长
6-12 weeks
期刊介绍: The IMA Journal of Numerical Analysis (IMAJNA) publishes original contributions to all fields of numerical analysis; articles will be accepted which treat the theory, development or use of practical algorithms and interactions between these aspects. Occasional survey articles are also published.
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