For nonlinear state space model involving random variables with arbitrary probability distributions, the state estimation given a sequence of observations is based on an appropriate criterion such as the minimum mean square error (MMSE). This leads to linear approximation in the state space of the extended Kalman filter (EKF) and the unscented Kalman filter (UKF), which work reasonably well only for mildly nonlinear systems. We propose a Bayesian filtering technique based on the MMSE criterion in the framework of the virtual linear fractional transformation (LFT) model, which is characterized by a linear part and a simple nonlinear structure in the feedback loop. LFT is an exact representation for any differentiable nonlinear mapping, so th...
Using Kalman techniques, it is possible to perform optimal estimation in linear Gaussian state-space...
Bayesian state estimation is a flexible framework to address relevant problems at the heart of exist...
For non-linear systems (NLSs), the state estimation problem is an essential and important problem. T...
For nonlinear state space model involving random variables with arbitrary probability distributions,...
In this paper, we propose Bayesian filtering technique for continuous-time dynamical models with sam...
This dissertation presents solutions to two open problems in estimation theory. The first is a tract...
In principle, general approaches to optimal nonlinear filtering can be described in a unified way fr...
A class of nonlinear transformation-based filters (NLTF) for state estimation is proposed. The nonli...
AbstractFor many nonlinear dynamic systems, the choice of nonlinear Bayesian filtering algorithms is...
This paper presents a generalization of the Kalman filter for linear and nonlinear fractional order ...
AbstractFor nonlinear state space models to resolve the state estimation problem is difficult or the...
This thesis is on filtering in state space models. First, we examine approximate Kalman filters for ...
The conditional probability density function (pdf) is the most complete statistical representation o...
International audienceWe propose a new nonlinear Bayesian filtering algorithm where the prediction s...
The focus of this paper is Bayesian state and parameter estimation using nonlinear models. A recentl...
Using Kalman techniques, it is possible to perform optimal estimation in linear Gaussian state-space...
Bayesian state estimation is a flexible framework to address relevant problems at the heart of exist...
For non-linear systems (NLSs), the state estimation problem is an essential and important problem. T...
For nonlinear state space model involving random variables with arbitrary probability distributions,...
In this paper, we propose Bayesian filtering technique for continuous-time dynamical models with sam...
This dissertation presents solutions to two open problems in estimation theory. The first is a tract...
In principle, general approaches to optimal nonlinear filtering can be described in a unified way fr...
A class of nonlinear transformation-based filters (NLTF) for state estimation is proposed. The nonli...
AbstractFor many nonlinear dynamic systems, the choice of nonlinear Bayesian filtering algorithms is...
This paper presents a generalization of the Kalman filter for linear and nonlinear fractional order ...
AbstractFor nonlinear state space models to resolve the state estimation problem is difficult or the...
This thesis is on filtering in state space models. First, we examine approximate Kalman filters for ...
The conditional probability density function (pdf) is the most complete statistical representation o...
International audienceWe propose a new nonlinear Bayesian filtering algorithm where the prediction s...
The focus of this paper is Bayesian state and parameter estimation using nonlinear models. A recentl...
Using Kalman techniques, it is possible to perform optimal estimation in linear Gaussian state-space...
Bayesian state estimation is a flexible framework to address relevant problems at the heart of exist...
For non-linear systems (NLSs), the state estimation problem is an essential and important problem. T...