International audienceThis paper introduces a new approximate solution of the optimal nonlinear filter suitable for nonlinear oceanic and atmospheric data assimilation problems. The method is based on a local linearization in a low-rank kernel representation of the state's probability density function. In the resulting low-rank kernel particle Kalman (LRKPK) filter, the standard (weight type) particle filter correction is complemented by a Kalman-type correction for each particle using the covariance matrix of the kernel mixture. The LRKPK filter's solution is then obtained as the weighted average of several low-rank square root Kalman filters operating in parallel. The Kalman-type correction reduces the risk of ensemble degeneracy, which e...
Abstract—Among existing ocean data assimilation method-ologies, reduced-state Kalman filters are a w...
International audienceThe main purpose of this chapter is to review the fundamentals of the Kalman F...
In sequential data assimilation problems, the Kalman filter (KF) is optimal for linear Gaussian mode...
Data assimilation in high-resolution atmosphere or ocean models is complicated because of the nonlin...
Data assimilation in high-resolution atmosphere or ocean models is complicated because of the nonlin...
International audienceIn this paper, two data assimilation methods based on sequential Monte Carlo s...
Data assimilation is a methodology which can optimise the extraction of reliable information from ob...
Data assimilation has been widely applied in atmospheric and oceanic forecasting systems and particl...
Particle filters contain the promise of fully nonlinear data assimilation. They have been applied in...
Data assimilation is a methodology, which can optimise the extraction of reliable information from o...
Particle filters are a class of data-assimilation schemes which, unlike current operational data-ass...
A data-assimilation method is introduced for large-scale applications in the ocean and the atmospher...
Nonlinear data assimilation methods like particle filters aim to improve the numerical weather predi...
The second-order exact particle filter NETF (nonlinear ensemble transform filter) is combined with l...
This book contains two review articles on nonlinear data assimilation that deal with closely related...
Abstract—Among existing ocean data assimilation method-ologies, reduced-state Kalman filters are a w...
International audienceThe main purpose of this chapter is to review the fundamentals of the Kalman F...
In sequential data assimilation problems, the Kalman filter (KF) is optimal for linear Gaussian mode...
Data assimilation in high-resolution atmosphere or ocean models is complicated because of the nonlin...
Data assimilation in high-resolution atmosphere or ocean models is complicated because of the nonlin...
International audienceIn this paper, two data assimilation methods based on sequential Monte Carlo s...
Data assimilation is a methodology which can optimise the extraction of reliable information from ob...
Data assimilation has been widely applied in atmospheric and oceanic forecasting systems and particl...
Particle filters contain the promise of fully nonlinear data assimilation. They have been applied in...
Data assimilation is a methodology, which can optimise the extraction of reliable information from o...
Particle filters are a class of data-assimilation schemes which, unlike current operational data-ass...
A data-assimilation method is introduced for large-scale applications in the ocean and the atmospher...
Nonlinear data assimilation methods like particle filters aim to improve the numerical weather predi...
The second-order exact particle filter NETF (nonlinear ensemble transform filter) is combined with l...
This book contains two review articles on nonlinear data assimilation that deal with closely related...
Abstract—Among existing ocean data assimilation method-ologies, reduced-state Kalman filters are a w...
International audienceThe main purpose of this chapter is to review the fundamentals of the Kalman F...
In sequential data assimilation problems, the Kalman filter (KF) is optimal for linear Gaussian mode...