Conditioning of hybrid variational data assimilation

IF 1.8 3区数学 Q1 MATHEMATICS

Numerical Linear Algebra with Applications Pub Date : 2023-09-26 DOI:10.1002/nla.2534

Shaerdan Shataer, Amos S. Lawless, Nancy K. Nichols

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Abstract

Abstract In variational assimilation, the most probable state of a dynamical system under Gaussian assumptions for the prior and likelihood can be found by solving a least‐squares minimization problem. In recent years, we have seen the popularity of hybrid variational data assimilation methods for Numerical Weather Prediction. In these methods, the prior error covariance matrix is a weighted sum of a climatological part and a flow‐dependent ensemble part, the latter being rank deficient. The nonlinear least squares problem of variational data assimilation is solved using iterative numerical methods, and the condition number of the Hessian is a good proxy for the convergence behavior of such methods. In this article, we study the conditioning of the least squares problem in a hybrid four‐dimensional variational data assimilation (Hybrid 4D‐Var) scheme by establishing bounds on the condition number of the Hessian. In particular, we consider the effect of the ensemble component of the prior covariance on the conditioning of the system. Numerical experiments show that the bounds obtained can be useful in predicting the behavior of the true condition number and the convergence speed of an iterative algorithm

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混合变分数据同化的条件作用

摘要在变分同化中，可以通过求解最小二乘最小化问题来求动力系统在高斯先验和似然假设下的最可能状态。近年来，数值天气预报的混合变分同化方法得到了广泛的应用。在这些方法中，先验误差协方差矩阵是气候部分和流量相关集合部分的加权和，后者是秩不足的。用迭代数值方法求解了变分数据同化的非线性最小二乘问题，用Hessian条件数很好地反映了该方法的收敛性。本文通过建立Hessian条件数的界，研究了混合四维变分数据同化(hybrid 4D - Var)格式中最小二乘问题的条件。特别地，我们考虑了先验协方差的集合分量对系统条件的影响。数值实验表明，所得到的边界可用于预测迭代算法的真条件数和收敛速度

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来源期刊

Numerical Linear Algebra with Applications 数学-数学

CiteScore

3.40

自引率

2.30%

发文量

审稿时长

12 months

期刊介绍： Manuscripts submitted to Numerical Linear Algebra with Applications should include large-scale broad-interest applications in which challenging computational results are integral to the approach investigated and analysed. Manuscripts that, in the Editor’s view, do not satisfy these conditions will not be accepted for review. Numerical Linear Algebra with Applications receives submissions in areas that address developing, analysing and applying linear algebra algorithms for solving problems arising in multilinear (tensor) algebra, in statistics, such as Markov Chains, as well as in deterministic and stochastic modelling of large-scale networks, algorithm development, performance analysis or related computational aspects. Topics covered include: Standard and Generalized Conjugate Gradients, Multigrid and Other Iterative Methods; Preconditioning Methods; Direct Solution Methods; Numerical Methods for Eigenproblems; Newton-like Methods for Nonlinear Equations; Parallel and Vectorizable Algorithms in Numerical Linear Algebra; Application of Methods of Numerical Linear Algebra in Science, Engineering and Economics.