Potential artifacts in conservation laws and invariants inferred from sequential state estimation

IF 4.1 3区地球科学 Q2 METEOROLOGY & ATMOSPHERIC SCIENCES

Ocean Science Pub Date : 2023-08-21 DOI:10.5194/os-19-1253-2023

C. Wunsch, S. Williamson, P. Heimbach

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引用次数: 0

Abstract

Abstract. In sequential estimation methods often used in oceanic and general climate calculations of the state and of forecasts, observations act mathematically and statistically as source or sink terms in conservation equations for heat, salt, mass, and momentum. These artificial terms obscure the inference of the system's variability or secular changes. Furthermore, for the purposes of calculating changes in important functions of state variables such as total mass and energy or volumetric current transports, results of both filter and smoother-based estimates are sensitive to misrepresentation of a large variety of parameters, including initial conditions, prior uncertainty covariances, and systematic and random errors in observations. Here, toy models of a coupled mass–spring oscillator system and of a barotropic Rossby wave system are used to demonstrate many of the issues that arise from such misrepresentations. Results from Kalman filter estimates and those from finite interval smoothing are analyzed. In the filter (and prediction) problem, entry of data leads to violation of conservation and other invariant rules. A finite interval smoothing method restores the conservation rules, but uncertainties in all such estimation results remain. Convincing trend and other time-dependent determinations in “reanalysis-like” estimates require a full understanding of models, observations, and underlying error structures. Application of smoother-type methods that are designed for optimal reconstruction purposes alleviate some of the issues.

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从顺序状态估计中推断出的守恒定律和不变量中的潜在工件

摘要在通常用于海洋和一般气候状态计算和预报的顺序估计方法中，观测在数学和统计上充当热、盐、质量和动量守恒方程中的源项或汇项。这些人为的术语模糊了对系统可变性或长期变化的推断。此外，为了计算状态变量(如总质量和能量或体积电流输运)的重要函数的变化，滤波和基于平滑的估计结果对大量参数的错误表示很敏感，包括初始条件、先验不确定性协方差以及观测中的系统和随机误差。在这里，一个耦合的质量-弹簧振荡器系统和一个正压罗斯比波系统的玩具模型被用来演示由这种错误表述引起的许多问题。分析了卡尔曼滤波估计和有限区间平滑估计的结果。在过滤(和预测)问题中，数据的输入会导致违反守恒和其他不变规则。有限区间平滑法恢复了守恒规则，但所有这些估计结果仍然存在不确定性。在“类似再分析”的估计中，令人信服的趋势和其他依赖于时间的决定需要对模型、观测和潜在的误差结构有充分的了解。为优化重建目的而设计的平滑型方法的应用缓解了一些问题。

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来源期刊

Ocean Science 地学-海洋学

CiteScore

5.90

自引率

6.20%

发文量

审稿时长

6-12 weeks

期刊介绍： Ocean Science (OS) is a not-for-profit international open-access scientific journal dedicated to the publication and discussion of research articles, short communications, and review papers on all aspects of ocean science: experimental, theoretical, and laboratory. The primary objective is to publish a very high-quality scientific journal with free Internet-based access for researchers and other interested people throughout the world. Electronic submission of articles is used to keep publication costs to a minimum. The costs will be covered by a moderate per-page charge paid by the authors. The peer-review process also makes use of the Internet. It includes an 8-week online discussion period with the original submitted manuscript and all comments. If accepted, the final revised paper will be published online. Ocean Science covers the following fields: ocean physics (i.e. ocean structure, circulation, tides, and internal waves); ocean chemistry; biological oceanography; air–sea interactions; ocean models – physical, chemical, biological, and biochemical; coastal and shelf edge processes; paleooceanography.