This paper establishes practical stability results for an important range of approximate discrete-time filtering problems involving mismatch between the true system and the approximating filter model. Using local consistency assumption, the practical stability established is in the sense of an asymptotic bound on the amount of bias introduced by the model approximation. Significantly, these practical stability results do not require the approximating model to be of the same model type as the true system. Our analysis applies to a wide range of estimation problems and justifies the common practice of approximating intractable infinite dimensional nonlinear filters by simpler computationally tractable filters
Recently, it has been pointed out by several authors that the uniform convergence of the stochastic ...
This work is concerned with robustness, convergence, and stability of adaptive filtering (AF) type a...
We are interested in the optimal filter in a continuous time setting. We want to show that the optim...
This paper establishes practical stability results for an important range of approximate discrete-ti...
International audienceIt has recently been proved by J.M.C. Clark et al. that the relative entropy (...
This work is concerned with robustness, convergence, and stability of adaptive filtering (AF) type a...
This paper establishes a practical stability result for discrete-time output feedback control involv...
This article develops a comprehensive framework for stability analysis of a broad class of commonly ...
International audienceWe propose a new approach to study the stability of the optimal filter w.r.t. ...
The stochastic discrete time filter also known as the Bayesian or optimal filter has a wide range of...
AbstractWe propose a new approach to study the stability of the optimal filter w.r.t. its initial co...
Exponential stability of the nonlinear filtering equation is revisited, when the signal is a finite ...
We propose a new approach to study the stability of the optimal filter w.r.t. its initial condition,...
In this paper, we consider the filtering of diffusion processes observed in non-Gaussian noise, when...
We consider a discrete-time linear system with correlated Gaussian plant and observation noises and ...
Recently, it has been pointed out by several authors that the uniform convergence of the stochastic ...
This work is concerned with robustness, convergence, and stability of adaptive filtering (AF) type a...
We are interested in the optimal filter in a continuous time setting. We want to show that the optim...
This paper establishes practical stability results for an important range of approximate discrete-ti...
International audienceIt has recently been proved by J.M.C. Clark et al. that the relative entropy (...
This work is concerned with robustness, convergence, and stability of adaptive filtering (AF) type a...
This paper establishes a practical stability result for discrete-time output feedback control involv...
This article develops a comprehensive framework for stability analysis of a broad class of commonly ...
International audienceWe propose a new approach to study the stability of the optimal filter w.r.t. ...
The stochastic discrete time filter also known as the Bayesian or optimal filter has a wide range of...
AbstractWe propose a new approach to study the stability of the optimal filter w.r.t. its initial co...
Exponential stability of the nonlinear filtering equation is revisited, when the signal is a finite ...
We propose a new approach to study the stability of the optimal filter w.r.t. its initial condition,...
In this paper, we consider the filtering of diffusion processes observed in non-Gaussian noise, when...
We consider a discrete-time linear system with correlated Gaussian plant and observation noises and ...
Recently, it has been pointed out by several authors that the uniform convergence of the stochastic ...
This work is concerned with robustness, convergence, and stability of adaptive filtering (AF) type a...
We are interested in the optimal filter in a continuous time setting. We want to show that the optim...