Gaussian mixtures are a common density representation in nonlinear, non-Gaussian Bayesian state estimation. Selecting an appropriate number of Gaussian components, however, is difficult as one has to trade of computational complexity against estimation accuracy. In this paper, an adaptive Gaussian mixture filter based on statistical linearization is proposed. Depending on the nonlinearity of the considered estimation problem, this filter dynamically increases the number of components via splitting. For this purpose, a measure is introduced that allows for quantifying the locally induced linearization error at each Gaussian mixture component. The deviation between the nonlinear and the linearized state space model is evaluated for determinin...
The use of Gaussian mixture model representations for nonlinear estimation is an attractive tool for...
Abstract—A new Gaussian mixture filter has been developed, one that uses a re-sampling step in order...
Non-Gaussianity of signals/noise often results in significant performance degradation for systems, w...
Abstract—Gaussian mixtures are a common density represen-tation in nonlinear, non-Gaussian Bayesian ...
In this work, we present a novel method for approximating a normal distribution with a weighted sum ...
In this paper, the Prior Density Splitting Mixture Estimator (PDSME), a new Gaussian mixture filteri...
In nonlinear filtering, special types of Gaussian mixture filters are a straightforward extension of...
A Bayesian filtering algorithm is developed for a class of state-space systems that can be modelled ...
By restricting to Gaussian distributions, the optimal Bayesian filtering problem can be transformed ...
In nonlinear filtering, special types of Gaussian mixture filters are a straightforward extension of...
This paper addresses the efficient state estimation for mixed linear/nonlinear dynamic systems with ...
The Probability Hypothesis Density (PHD) filter is a multipletarget filter for recursively estimatin...
In many real–life Bayesian estimation problems, it is appro-priate to consider non-Gaussian noise di...
The Probability Hypothesis Density (PHD) filter is a multiple-target filter for recursively estimati...
Filtering or measurement updating for nonlinear stochastic dynamic systems requires approximate calc...
The use of Gaussian mixture model representations for nonlinear estimation is an attractive tool for...
Abstract—A new Gaussian mixture filter has been developed, one that uses a re-sampling step in order...
Non-Gaussianity of signals/noise often results in significant performance degradation for systems, w...
Abstract—Gaussian mixtures are a common density represen-tation in nonlinear, non-Gaussian Bayesian ...
In this work, we present a novel method for approximating a normal distribution with a weighted sum ...
In this paper, the Prior Density Splitting Mixture Estimator (PDSME), a new Gaussian mixture filteri...
In nonlinear filtering, special types of Gaussian mixture filters are a straightforward extension of...
A Bayesian filtering algorithm is developed for a class of state-space systems that can be modelled ...
By restricting to Gaussian distributions, the optimal Bayesian filtering problem can be transformed ...
In nonlinear filtering, special types of Gaussian mixture filters are a straightforward extension of...
This paper addresses the efficient state estimation for mixed linear/nonlinear dynamic systems with ...
The Probability Hypothesis Density (PHD) filter is a multipletarget filter for recursively estimatin...
In many real–life Bayesian estimation problems, it is appro-priate to consider non-Gaussian noise di...
The Probability Hypothesis Density (PHD) filter is a multiple-target filter for recursively estimati...
Filtering or measurement updating for nonlinear stochastic dynamic systems requires approximate calc...
The use of Gaussian mixture model representations for nonlinear estimation is an attractive tool for...
Abstract—A new Gaussian mixture filter has been developed, one that uses a re-sampling step in order...
Non-Gaussianity of signals/noise often results in significant performance degradation for systems, w...