对 $H^2$ 原始方程的数据同化

Ken Furukawa
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引用次数: 0

摘要

本文证明,原始方程的解是由$H^2$中相应的数据同化(DA)方程预测的。虽然,DA方程不包括基解及其初始条件的直接信息,但当外力在观测之前就已知时,DA方程的解会指数收敛到基解(原始解)。此外,当外力不完全已知,但其空间密度观测值可用时,DA是稳定的,即DA解位于基解的一个足够小的邻域内。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Data Assimilation to the Primitive Equations in $H^2$
In this paper we prove that the solution to the primitive equations is predicted by the corresponding data assimilation(DA) equations in $H^2$. Although, the DA equation does not include the direct information about the base solution and its initial conditions, the solution to the DA equation exponentially convergence to the base(original) solution when the external forces are known even before they are observed. Additionally, when the external force is not completely known but its spatially dense observations are available, then the DA is stable, $i.e.$ the DA solution lies in a sufficiently small neighborhood of the base solution.
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