In this paper we discuss fractional generalizations of the filtering problem. The ”fractional” nature comes from time-changed state or observation processes, basic ingredients of the filtering problem. The mathematical feature of the fractional filtering problem emerges as the Riemann-Liouville or Caputo-Djrbashian fractional derivative in the associated Zakai equation. We discuss fractional generalizations of the nonlinear filtering problem whose state and observation processes are driven by time-changed Brownian motion or/and Lévy process
An elementary approach is used to derive a Bayes-type formula, extending the Kallianpur--Striebel fo...
In this paper, we consider a continuous time filtering of a multi-dimensional Langevin stochastic d...
Mathematics Subject Classification: 26A33, 76M35, 82B31A stochastic solution is constructed for a fr...
In this paper we discuss fractional generalizations of the filtering problem. The ”fractional” natur...
The paper discusses fractional generalizations of Zakai equations arising in filtering problems. The ...
Abstract. Our objective is to study a nonlinear filtering problem for the observation process pertur...
The purpose of this work is to present an analogue of the Zakai type equation in case the noise is a...
We present the stochastic solution to a generalized fractional partial differential equation involvi...
Integral equations for the mean-square estimate are obtained for the linear filtering problem, in wh...
Stochastic integration arises in mathematical modeling of physical systems which possess inherent no...
Abstract. The aim of this note is to introduce an approximate approach to fractional filtering probl...
AbstractThe problem of nonlinear filtering of a random field observed in the presence of a noise, mo...
IEE Proceedings - Vision, Image, and Signal Processing, Vol. 147, nº 1In the paper, the class of dis...
AbstractMultiple stochastic fractional integral expansions are applied to the problem of non-linear ...
In this paper, we consider a continuous time filtering of a multi-dimensional Langevin stochastic di...
An elementary approach is used to derive a Bayes-type formula, extending the Kallianpur--Striebel fo...
In this paper, we consider a continuous time filtering of a multi-dimensional Langevin stochastic d...
Mathematics Subject Classification: 26A33, 76M35, 82B31A stochastic solution is constructed for a fr...
In this paper we discuss fractional generalizations of the filtering problem. The ”fractional” natur...
The paper discusses fractional generalizations of Zakai equations arising in filtering problems. The ...
Abstract. Our objective is to study a nonlinear filtering problem for the observation process pertur...
The purpose of this work is to present an analogue of the Zakai type equation in case the noise is a...
We present the stochastic solution to a generalized fractional partial differential equation involvi...
Integral equations for the mean-square estimate are obtained for the linear filtering problem, in wh...
Stochastic integration arises in mathematical modeling of physical systems which possess inherent no...
Abstract. The aim of this note is to introduce an approximate approach to fractional filtering probl...
AbstractThe problem of nonlinear filtering of a random field observed in the presence of a noise, mo...
IEE Proceedings - Vision, Image, and Signal Processing, Vol. 147, nº 1In the paper, the class of dis...
AbstractMultiple stochastic fractional integral expansions are applied to the problem of non-linear ...
In this paper, we consider a continuous time filtering of a multi-dimensional Langevin stochastic di...
An elementary approach is used to derive a Bayes-type formula, extending the Kallianpur--Striebel fo...
In this paper, we consider a continuous time filtering of a multi-dimensional Langevin stochastic d...
Mathematics Subject Classification: 26A33, 76M35, 82B31A stochastic solution is constructed for a fr...