In this manuscript, a general method for deriving filtering algorithms that involve a network of interconnected Bayesian filters is proposed. This method is based on the idea that the processing accomplished inside each of the Bayesian filters and the interactions between them can be represented as message passing algorithms over a proper graphical model. The usefulness of our method is exemplified by developing new filtering techniques, based on the interconnection of a particle filter and an extended Kalman filter, for conditionally linear Gaussian systems. Numerical results for two specific dynamic systems evidence that the devised algorithms can achieve a better complexity-accuracy tradeoff than marginalized particle filtering and mult...
Abstract—Increasingly, for many application areas, it is becoming important to include elements of n...
This dissertation presents solutions to two open problems in estimation theory. The first is a tract...
Particle filters (PFs) are powerful sampling-based inference/learning algorithms for dynamic Bayesia...
In this manuscript, a general method for deriving filtering algorithms that involve a network of int...
In this manuscript a novel online technique for Bayesian filtering, dubbed turbo filtering, is illus...
Recently, a novel method for developing filtering algorithms, based on the interconnection of two Ba...
This book aims to give readers a unified Bayesian treatment starting from the basics (Baye's rule) t...
In this paper, a factor graph approach is employed to investigate the recursive filtering problem fo...
This thesis is about bayesian networks, particle filters and their application to digital communicat...
The particle filtering algorithm was introduced in the 1990s as a numerical solution to the Bayesian...
Abstract—The Probability Hypothesis Density (PHD) filter is a recent solution to the multi-target fi...
Kalman Filters (KF) is a recursive estimation algorithm, a special case of Bayesian estimators under...
This M.Sc. thesis intends to evaluate various algorithms based on Bayesian statistical theory and va...
This paper presents a particle filtering strategy in order to estimate the state of Jump Markov Syst...
Bayes Rule provides a conceptually simple, closed form, solution to the sequential Bayesian nonlinea...
Abstract—Increasingly, for many application areas, it is becoming important to include elements of n...
This dissertation presents solutions to two open problems in estimation theory. The first is a tract...
Particle filters (PFs) are powerful sampling-based inference/learning algorithms for dynamic Bayesia...
In this manuscript, a general method for deriving filtering algorithms that involve a network of int...
In this manuscript a novel online technique for Bayesian filtering, dubbed turbo filtering, is illus...
Recently, a novel method for developing filtering algorithms, based on the interconnection of two Ba...
This book aims to give readers a unified Bayesian treatment starting from the basics (Baye's rule) t...
In this paper, a factor graph approach is employed to investigate the recursive filtering problem fo...
This thesis is about bayesian networks, particle filters and their application to digital communicat...
The particle filtering algorithm was introduced in the 1990s as a numerical solution to the Bayesian...
Abstract—The Probability Hypothesis Density (PHD) filter is a recent solution to the multi-target fi...
Kalman Filters (KF) is a recursive estimation algorithm, a special case of Bayesian estimators under...
This M.Sc. thesis intends to evaluate various algorithms based on Bayesian statistical theory and va...
This paper presents a particle filtering strategy in order to estimate the state of Jump Markov Syst...
Bayes Rule provides a conceptually simple, closed form, solution to the sequential Bayesian nonlinea...
Abstract—Increasingly, for many application areas, it is becoming important to include elements of n...
This dissertation presents solutions to two open problems in estimation theory. The first is a tract...
Particle filters (PFs) are powerful sampling-based inference/learning algorithms for dynamic Bayesia...