Error covariance estimation methods based on analysis residuals: theoretical foundation and convergence properties derived from simplified observation networks

Ménard, Richard

doi:10.1002/qj.2650

Cited by 61 publications

(102 citation statements)

References 25 publications

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“…In this paper, we go further by using principles of error covariance estimation to obtain a near optimal Kalman gain. In addition we impose the innovation covariance consistency [15] and show that all diagnostics of analysis error variance nearly agree with one another. These include the Hollingsworth and Lönnberg [13], the Desroziers et al [14] and new diagnostics that we will introduce.…”

Section: Argued That the Diagnostic E[(o −â)(â − B) T ]mentioning

confidence: 94%

“…In our next step, iter 1, we first re-estimate the correlation length by applying a maximum likelihood method, as in Ménard [15], using the iter 0 error variances that are consistent with the optimal ratioγ obtained in iter 0 and the innovation variance consistency. Then, with this new correlation length, we estimate a new optimal ratioγ (iter 1), which turn out to be very close to the value obtained in iter 0.…”

Section: Methodsmentioning

confidence: 99%

“…should be equal to the analysis error covariance in observation space but, again, only if the gain is optimal and the innovation covariance consistency is respected [15]. The impasse of the estimation of the true analysis error seems to be tied with using active observations, i.e., using the same observations as those used to create the analysis.…”

Section: Argued That the Diagnostic E[(o −â)(â − B) T ]mentioning

confidence: 99%

“…where K is the gain matrix built from the prescribed error covariances, H is the observation operator for the active observation set, d is the active innovation vector, [14,15,18].…”

Section: Diagnostic Of Analysis Error Covariance In Passive Observatimentioning

confidence: 99%

“…This implies that the gain matrix using the prescribed error covariances, K in Equation (1), must be identical to the gain using the true error covariances, i.e., K = BH T (HBH T + R) −1 [14,15]. It is important to mention that necessary and sufficient conditions to obtain the true error covariances HBH T and R in observation space, are: 1-the Kalman gain condition, H K = HK true and 2-the innovation covariance consistency,…”

Section: Error Covariance Diagnostics In Active Observation Space Formentioning

confidence: 99%

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Evaluation of Analysis by Cross-Validation, Part II: Diagnostic and Optimization of Analysis Error Covariance

Ménard

Deshaies-Jacques

2018

Atmosphere

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Abstract:We present a general theory of estimation of analysis error covariances based on cross-validation as well as a geometric interpretation of the method. In particular, we use the variance of passive observation-minus-analysis residuals and show that the true analysis error variance can be estimated, without relying on the optimality assumption. This approach is used to obtain near optimal analyses that are then used to evaluate the air quality analysis error using several different methods at active and passive observation sites. We compare the estimates according to the method of Hollingsworth-Lönnberg, Desroziers et al., a new diagnostic we developed, and the perceived analysis error computed from the analysis scheme, to conclude that, as long as the analysis is near optimal, all estimates agree within a certain error margin.

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Section: Argued That the Diagnostic E[(o −â)(â − B) T ]mentioning

confidence: 94%

Section: Methodsmentioning

confidence: 99%

Section: Argued That the Diagnostic E[(o −â)(â − B) T ]mentioning

confidence: 99%

“…where K is the gain matrix built from the prescribed error covariances, H is the observation operator for the active observation set, d is the active innovation vector, [14,15,18].…”

Section: Diagnostic Of Analysis Error Covariance In Passive Observatimentioning

confidence: 99%

Section: Error Covariance Diagnostics In Active Observation Space Formentioning

confidence: 99%

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Evaluation of Analysis by Cross-Validation, Part II: Diagnostic and Optimization of Analysis Error Covariance

Ménard

Deshaies-Jacques

2018

Atmosphere

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Comparing diagnosed observation uncertainties with independent estimates: A case study using aircraft‐based observations and a convection‐permitting data assimilation system

Mirza

Dance

Rooney

et al. 2021

Atmospheric Science Letters

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Aircraft can report in situ observations of the ambient temperature by using aircraft meteorological data relay (AMDAR) or these can be derived using modeselect enhanced tracking data (Mode-S EHS). These observations may be assimilated into numerical weather prediction models to improve the initial conditions for forecasts. The assimilation process weights the observation according to the expected uncertainty in its measurement and representation. The goal of this paper is to compare observation uncertainties diagnosed from data assimilation statistics with independent estimates. To quantify these independent estimates, we use metrological comparisons, made with in-situ research-grade instruments, as well as previous studies using collocation methods between aircraft (mostly AMDAR reports) and other observing systems such as radiosondes. In this study we diagnose a new estimate of the vertical structure of the uncertainty variances using observation-minus-background and observation-minus-analysis statistics from a Met Office limited area three-dimensional variational data assimilation system (3 km horizontal grid-length, 3-hourly cycle). This approach for uncertainty estimation is simple to compute but has several limitations. Nevertheless, the resulting diagnosed variances have a vertical structure that is like that provided by the independent estimates of uncertainty. This provides confidence in the uncertainty estimation method, and in the diagnosed uncertainty estimates themselves. In the future our methodology, along with other results, could provide ways to estimate the uncertainty for the assimilation of aircraft-based temperature observations.

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The conditioning of least‐squares problems in variational data assimilation

Tabeart

Dance

Haben

et al. 2018

Numerical Linear Algebra App

103

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SummaryIn variational data assimilation a least-squares objective function is minimised to obtain the most likely state of a dynamical system. This objective function combines observation and prior (or background) data weighted by their respective error statistics. In numerical weather prediction, data assimilation is used to estimate the current atmospheric state, which then serves as an initial condition for a forecast. New developments in the treatment of observation uncertainties have recently been shown to cause convergence problems for this least-squares minimisation. This is important for operational numerical weather prediction centres due to the time constraints of producing regular forecasts. The condition number of the Hessian of the objective function can be used as a proxy to investigate the speed of convergence of the least-squares minimisation. In this paper we develop novel theoretical bounds on the condition number of the Hessian. These new bounds depend on the minimum eigenvalue of the observation error covariance matrix and the ratio of background error variance to observation error variance. Numerical tests in a linear setting show that the location of observation measurements has an important effect on the condition number of the Hessian.We identify that the conditioning of the problem is related to the complex interactions between observation error covariance and background error covariance matrices. Increased understanding of the role of each constituent matrix in the conditioning of the Hessian will prove useful for informing the choice of correlated observation error covariance matrix and observation location, particularly for practical applications.

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Error covariance estimation methods based on analysis residuals: theoretical foundation and convergence properties derived from simplified observation networks

Cited by 61 publications

References 25 publications

Evaluation of Analysis by Cross-Validation, Part II: Diagnostic and Optimization of Analysis Error Covariance

Evaluation of Analysis by Cross-Validation, Part II: Diagnostic and Optimization of Analysis Error Covariance

Comparing diagnosed observation uncertainties with independent estimates: A case study using aircraft‐based observations and a convection‐permitting data assimilation system

The conditioning of least‐squares problems in variational data assimilation

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