用于二维NSE数据同化的基于轻推算法的高阶同步:用于全局插值可观测值的改进范例

A. Biswas, K. Brown, V. Martinez
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引用次数: 1

摘要

本文考虑了具有周期边界条件的二维(2D) Navier-Stokes方程(NSE)的一种基于推力的数据同化方案,并研究了该算法产生的信号与观测值所对应的真实信号在所有高阶Sobolev拓扑中的同步性。这项工作补充了先前文献中的结果,其中确定了在这些条件下保证同步的条件,在一般可观测值的情况下,仅相对于$H^1$-拓扑,或者在光谱可观测值的情况下,对解析Gevrey拓扑。为了适应更强拓扑中的同步特性,由Azouani、Olson和Titi最初引入的一般内插可观察算子框架被扩展为更丰富的算子类。一个重要的努力是致力于开发这个更扩展的框架,特别是,它们的基本近似性质,这些算子的子类的识别相关的获得同步,以及这些算子的结构和系统之间的详细关系关于同步性质。该框架的主要特点之一是其“无网格”方面,它允许观测数据本身决定域的细分。最后,得到了二维NSE在所有高阶Sobolev范数下的吸收球半径的估计,从而适当地推广了先前已知的界;这种估计是在高阶拓扑中建立算法的同步特性所必需的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Higher-order synchronization of a nudging-based algorithm for data assimilation for the 2D NSE: a refined paradigm for global interpolant observables
This paper considers a nudging-based scheme for data assimilation for the two-dimensional (2D) Navier-Stokes equations (NSE) with periodic boundary conditions and studies the synchronization of the signal produced by this algorithm with the true signal, to which the observations correspond, in all higher-order Sobolev topologies. This work complements previous results in the literature where conditions were identified under which synchronization is guaranteed either with respect to only the $H^1$--topology, in the case of general observables, or to the analytic Gevrey topology, in the case of spectral observables. To accommodate the property of synchronization in the stronger topologies, the framework of general interpolant observable operators, originally introduced by Azouani, Olson, and Titi, is expanded to a far richer class of operators. A significant effort is dedicated to the development of this more expanded framework, specifically, their basic approximation properties, the identification of subclasses of such operators relevant to obtaining synchronization, as well as the detailed relation between the structure of these operators and the system regarding the syncrhonization property. One of the main features of this framework is its "mesh-free" aspect, which allows the observational data itself to dictate the subdivision of the domain. Lastly, estimates for the radius of the absorbing ball of the 2D NSE in all higher-order Sobolev norms are obtained, thus properly generalizing previously known bounds; such estimates are required for establishing the synchronization property of the algorithm in the higher-order topologies.
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