We investigate a new sampling scheme aimed at improving the performance of particle filters whenever (a) there is a significant mismatch between the assumed model dynamics and the actual system, or (b) the posterior probability tends to concentrate in relatively small regions of the state space. The proposed scheme pushes some particles toward specific regions where the likelihood is expected to be high, an operation known as nudging in the geophysics literature. We reinterpret nudging in a form applicable to any particle filtering scheme, as it does not involve any changes in the rest of the algorithm. Since the particles are modified, but the importance weights do not account for this modification, the use of nudging leads to additional b...
Particle filters have become a popular algorithm in data assimilation for their ability to handle n...
Particle filters contain the promise of fully nonlinear data assimilation. They have been applied i...
Particle filters have, in recent years, been found to perform well in highly nonlinear problems as w...
Documento depositado en el repositorio arXiv.org. Versión: arXiv:1708.07801v2 [stat.CO]We investigat...
Particle Filters are Monte-Carlo methods used for Bayesian Inference. Bayesian Inference is based on...
AbstractWe present an efficient particle filtering algorithm for multi-scale systems, that is adapte...
In this thesis, several important topics in the area of particle filtering for applications in Data ...
We investigate the performance of a class of particle filters (PFs) that can automatically tune thei...
Data assimilation refers to the methodology of combining dynamical models and observed data with the...
The Kalman filter provides an effective solution to the linear Gaussian filtering problem. However w...
In this work we show how it is possible to derive a new set of nudging equations, a tool still used ...
Particle filters contain the promise of fully nonlinear data assimilation. They have been applied in...
In general, particle filters need large numbers of model runs in order to avoid filter degeneracy in...
Particle filters contain the promise of fully nonlinear data assimilation. They have been applied in...
Sequential Monte Carlo methods have been a major breakthrough in the field of numerical signal proce...
Particle filters have become a popular algorithm in data assimilation for their ability to handle n...
Particle filters contain the promise of fully nonlinear data assimilation. They have been applied i...
Particle filters have, in recent years, been found to perform well in highly nonlinear problems as w...
Documento depositado en el repositorio arXiv.org. Versión: arXiv:1708.07801v2 [stat.CO]We investigat...
Particle Filters are Monte-Carlo methods used for Bayesian Inference. Bayesian Inference is based on...
AbstractWe present an efficient particle filtering algorithm for multi-scale systems, that is adapte...
In this thesis, several important topics in the area of particle filtering for applications in Data ...
We investigate the performance of a class of particle filters (PFs) that can automatically tune thei...
Data assimilation refers to the methodology of combining dynamical models and observed data with the...
The Kalman filter provides an effective solution to the linear Gaussian filtering problem. However w...
In this work we show how it is possible to derive a new set of nudging equations, a tool still used ...
Particle filters contain the promise of fully nonlinear data assimilation. They have been applied in...
In general, particle filters need large numbers of model runs in order to avoid filter degeneracy in...
Particle filters contain the promise of fully nonlinear data assimilation. They have been applied in...
Sequential Monte Carlo methods have been a major breakthrough in the field of numerical signal proce...
Particle filters have become a popular algorithm in data assimilation for their ability to handle n...
Particle filters contain the promise of fully nonlinear data assimilation. They have been applied i...
Particle filters have, in recent years, been found to perform well in highly nonlinear problems as w...