We provide a general framework for computing the state density of a noisy system given the sequence of hitting times of predefined thresholds. Our method relies on eigenfunction expansion corresponding to the Fokker-Planck operator of the diffusion process. For illustration, we present a particular example in which the state and the noise are one-dimensional Gaussian processes and observations are generated when the magnitude of the observed signal is a multiple of some threshold value. We present numerical simulations confirming the convergence and the accuracy of the recovered density estimator. Applications of the filtering methodology will be illustrated
Stochastic differential equations (SDE) are a natural tool for modelling systems that are inherently...
In this paper, we describe a novel application of sigma-point meth-ods to continuous-discrete filter...
Estimation and Model Validation of Diffusion Processes Abstract The main motivation for this thesis ...
We study two important aspects of the diffusion of a free particle in the presence of a time-depende...
An expression is obtained for the likelihood function for the detection of a stochastic signal (diff...
A particle filter method is presented for the discrete-time filtering problem with nonlinear ItA ` s...
The response of a dynamical system modelled by differential equations with white noise as the forcin...
In this paper, we consider the filtering of diffusion processes observed in non-Gaussian noise, when...
A splitting-up approximation is introduced for diffusion processes, based on the successive composit...
[Contains mathematical notation that does not convert: see report for the correct formula.] The Fo...
Filtering for Stochastic Evolution Equations Vít Kubelka Doctoral thesis Abstract Linear filtering p...
A class of discrete‐time random processes arising in engineering and econometrics applications consi...
Filtering and identification problems of partially observable stochastic dynamical systems has been ...
Herein, we consider direct Markov chain approximations to the Duncan-Mortensen-Zakai equations for n...
We consider nonparametric estimation of the transition operator P of a Markov chain and its transiti...
Stochastic differential equations (SDE) are a natural tool for modelling systems that are inherently...
In this paper, we describe a novel application of sigma-point meth-ods to continuous-discrete filter...
Estimation and Model Validation of Diffusion Processes Abstract The main motivation for this thesis ...
We study two important aspects of the diffusion of a free particle in the presence of a time-depende...
An expression is obtained for the likelihood function for the detection of a stochastic signal (diff...
A particle filter method is presented for the discrete-time filtering problem with nonlinear ItA ` s...
The response of a dynamical system modelled by differential equations with white noise as the forcin...
In this paper, we consider the filtering of diffusion processes observed in non-Gaussian noise, when...
A splitting-up approximation is introduced for diffusion processes, based on the successive composit...
[Contains mathematical notation that does not convert: see report for the correct formula.] The Fo...
Filtering for Stochastic Evolution Equations Vít Kubelka Doctoral thesis Abstract Linear filtering p...
A class of discrete‐time random processes arising in engineering and econometrics applications consi...
Filtering and identification problems of partially observable stochastic dynamical systems has been ...
Herein, we consider direct Markov chain approximations to the Duncan-Mortensen-Zakai equations for n...
We consider nonparametric estimation of the transition operator P of a Markov chain and its transiti...
Stochastic differential equations (SDE) are a natural tool for modelling systems that are inherently...
In this paper, we describe a novel application of sigma-point meth-ods to continuous-discrete filter...
Estimation and Model Validation of Diffusion Processes Abstract The main motivation for this thesis ...