In this article, we develop a new Rao-Blackwellized Monte Carlo smoothing algorithm for conditionally linear Gaussian models. The algorithm is based on the forward-filtering backward-simulation Monte Carlo smoother concept and performs the backward simulation directly in the marginal space of the non-Gaussian state component while treating the linear part analytically. Unlike the previously proposed backward-simulation based Rao-Blackwellized smoothing approaches, it does not require sampling of the Gaussian state component and is also able to overcome certain normalization problems of two-filter smoother based approaches. The performance of the algorithm is illustrated in a simulated application. © 2012 IFAC
We develop methods for performing smoothing computations in general state-space models. The methods ...
We develop methods for performing smoothing computations in general state-space models. The methods...
We present a novel method in the family of particle MCMC methods that we refer to as particle Gibbs ...
Sequential Monte Carlo (SMC) methods, such as the particle filter, are by now one of the standard co...
International audienceThis paper focuses on Sequential Monte Carlo approximations of smoothing distr...
Abstract This paper focuses on sequential Monte Carlo approximations of smoothing distributions in c...
We consider the smoothing problem for a class of conditionally linear Gaussian state-space (CLGSS) m...
We consider the smoothing problem for a class of conditionally linear Gaussian state-space (CLGSS) m...
Abstract in UndeterminedSmoothing in state-space models amounts to computing the conditional distrib...
for performing inference in non-linear non-Gaussian state-space models. The class of “Rao-Blackwelli...
In this paper, the fixed-lag smoothing problem for conditionally linear Gaussian state-space models ...
Particle methods are a category of Monte Carlo algorithms that have become popular for performing in...
In this work we apply sequential Monte Carlo methods, i.e., particle filters and smoothers, to estim...
In this paper, we consider Rao-Blackwellization of linear substructures in sigma-point-based Gaussia...
Článek je věnován odhadu stavu stochastických dynamických systémů. Důraz je v článku kladen numerick...
We develop methods for performing smoothing computations in general state-space models. The methods ...
We develop methods for performing smoothing computations in general state-space models. The methods...
We present a novel method in the family of particle MCMC methods that we refer to as particle Gibbs ...
Sequential Monte Carlo (SMC) methods, such as the particle filter, are by now one of the standard co...
International audienceThis paper focuses on Sequential Monte Carlo approximations of smoothing distr...
Abstract This paper focuses on sequential Monte Carlo approximations of smoothing distributions in c...
We consider the smoothing problem for a class of conditionally linear Gaussian state-space (CLGSS) m...
We consider the smoothing problem for a class of conditionally linear Gaussian state-space (CLGSS) m...
Abstract in UndeterminedSmoothing in state-space models amounts to computing the conditional distrib...
for performing inference in non-linear non-Gaussian state-space models. The class of “Rao-Blackwelli...
In this paper, the fixed-lag smoothing problem for conditionally linear Gaussian state-space models ...
Particle methods are a category of Monte Carlo algorithms that have become popular for performing in...
In this work we apply sequential Monte Carlo methods, i.e., particle filters and smoothers, to estim...
In this paper, we consider Rao-Blackwellization of linear substructures in sigma-point-based Gaussia...
Článek je věnován odhadu stavu stochastických dynamických systémů. Důraz je v článku kladen numerick...
We develop methods for performing smoothing computations in general state-space models. The methods ...
We develop methods for performing smoothing computations in general state-space models. The methods...
We present a novel method in the family of particle MCMC methods that we refer to as particle Gibbs ...