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Coupling Techniques for Nonlinear Ensemble Filtering

Alessio Spantini, Ricardo Baptista, Youssef Marzouk

2022SIAM Review64 citationsDOIOpen Access PDF

Abstract

We consider filtering in high-dimensional non-Gaussian state-space models with intractable transition kernels, nonlinear and possibly chaotic dynamics, and sparse observations in space and time. We propose a novel filtering methodology that harnesses transportation of measures, convex optimization, and ideas from probabilistic graphical models to yield robust ensemble approximations of the filtering distribution in high dimensions. Our approach can be understood as the natural generalization of the ensemble Kalman filter (EnKF) to nonlinear updates, using stochastic or deterministic couplings. The use of nonlinear updates can reduce the intrinsic bias of the EnKF at a marginal increase in computational cost. We avoid any form of importance sampling and introduce non-Gaussian localization approaches for dimension scalability. Our framework achieves state-of-the-art tracking performance on challenging configurations of the Lorenz-96 model in the chaotic regime.

Topics & Concepts

Ensemble Kalman filterChaoticNonlinear systemComputer scienceGaussianKalman filterProbabilistic logicParticle filterState spaceAlgorithmGeneralizationMathematical optimizationDimension (graph theory)MathematicsExtended Kalman filterArtificial intelligencePhysicsPure mathematicsQuantum mechanicsMathematical analysisStatisticsTarget Tracking and Data Fusion in Sensor NetworksGaussian Processes and Bayesian InferenceMeteorological Phenomena and Simulations
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