The Schmidt-Kalman filter (SKF) achieves filtering consistency in the presence of biases in system dynamic and measurement models through accounting for their impacts when updating the state estimate and covariance. However, the performance of the SKF may break down when the measurements are subject to non-Gaussian and heavy-tail noise. To address this, we impose the Wishart prior distribution on the precision matrix of measurement noise, such that the measurement likelihood now has heavier tails than the Gaussian distribution to deal with the potential occurrence of outliers. Variational inference is invoked to establish analytically tractable methods for computing the posterior of the system state, system biases, and the measurement noise...
In this paper we discuss efficient methods of the state estimation which are robust against unknown ...
Kalman filter is one of the best filter utilized as a part of the state estimation taking into accou...
This paper proposes a new robust Kalman filter algorithm under outliers and system uncertainties. Th...
Existing robust state estimation methods are generally unable to distinguish model uncertainties (st...
Existing robust state estimation methods are generally unable to distinguish model uncertainties (st...
Kalman filter (KF), which is an algorithm that is utilized to estimate unknown variables based on no...
A Kalman Filtering algorithm which is robust to observational outliers is developed by assuming that...
Filtering and smoothing algorithms for linear discrete-time state-space models with skewed and heavy...
Measurement-outliers caused by non-linear observation model or random disturbance will lead to the a...
This thesis is on filtering in state space models. First, we examine approximate Kalman filters for ...
In time series analysis state space models are very popular. Often it is interesting to sequentially...
In this paper, a novel variational Bayesian (VB)-based adaptive Kalman filter (VBAKF) for linear Gau...
We propose an algorithm to perform causal inference of the state of a dynamical model when the measu...
Abstract—The Kalman filter is widely used in many different fields. Many practical applications and ...
Many applications require reliable, high precision state estimation while mitigating measurement out...
In this paper we discuss efficient methods of the state estimation which are robust against unknown ...
Kalman filter is one of the best filter utilized as a part of the state estimation taking into accou...
This paper proposes a new robust Kalman filter algorithm under outliers and system uncertainties. Th...
Existing robust state estimation methods are generally unable to distinguish model uncertainties (st...
Existing robust state estimation methods are generally unable to distinguish model uncertainties (st...
Kalman filter (KF), which is an algorithm that is utilized to estimate unknown variables based on no...
A Kalman Filtering algorithm which is robust to observational outliers is developed by assuming that...
Filtering and smoothing algorithms for linear discrete-time state-space models with skewed and heavy...
Measurement-outliers caused by non-linear observation model or random disturbance will lead to the a...
This thesis is on filtering in state space models. First, we examine approximate Kalman filters for ...
In time series analysis state space models are very popular. Often it is interesting to sequentially...
In this paper, a novel variational Bayesian (VB)-based adaptive Kalman filter (VBAKF) for linear Gau...
We propose an algorithm to perform causal inference of the state of a dynamical model when the measu...
Abstract—The Kalman filter is widely used in many different fields. Many practical applications and ...
Many applications require reliable, high precision state estimation while mitigating measurement out...
In this paper we discuss efficient methods of the state estimation which are robust against unknown ...
Kalman filter is one of the best filter utilized as a part of the state estimation taking into accou...
This paper proposes a new robust Kalman filter algorithm under outliers and system uncertainties. Th...