In time series analysis state-space models provide a wide and flexible class. The basic idea is to describe an unobservable phenomenon of interest on the basis of noisy data. The first constituent of such a model is the so-called state equation, which characterises the unobserved state of the system. The second part is the so-called observation equation, which describes the observable variables as a function of the unobserved state. The purpose of the analysis of state-space models is to infer the relevant properties of the unobserved phenomenon from the observed data. A powerful tool to do so in the linear Gaussian setting is the Kalman filter. It provides a simple recursive computational scheme for the conditional expectation of the unobs...
State space models are powerful modeling tools for stochastic dynamical systems and have been an imp...
Numbers are present everywhere, and when they are collected and recorded we refer to them as data. M...
This paper revisits the work of Rauch et al. (1965) and develops a novel method for recursive maximu...
The standard Kalman filter is a powerful and widely used tool to perform prediction, filtering and s...
This thesis is on filtering in state space models. First, we examine approximate Kalman filters for ...
State-space models can be used to incorporate subject knowledge on the underlying dynamics of a time...
We present approximate algorithms for performing smoothing in a class of high-dimensional state-spac...
We present approximate algorithms for performing smoothing in a class of high-dimensional state-spac...
In sequential data assimilation problems, the Kalman filter (KF) is optimal for linear Gaussian mode...
Abstract: Nonlinear non-Gaussian state-space models arise in numerous applications in control and si...
We develop methods for performing smoothing computations in general state-space models. The methods ...
for performing inference in non-linear non-Gaussian state-space models. The class of “Rao-Blackwelli...
Nonlinear non-Gaussian state-space models arise in numerous applications in control and signal proce...
This thesis provides a set of novel Monte Carlo methods to perform Bayesian inference, with an empha...
We consider the problem of high-dimensional filtering of state-space models (SSMs) at discrete times...
State space models are powerful modeling tools for stochastic dynamical systems and have been an imp...
Numbers are present everywhere, and when they are collected and recorded we refer to them as data. M...
This paper revisits the work of Rauch et al. (1965) and develops a novel method for recursive maximu...
The standard Kalman filter is a powerful and widely used tool to perform prediction, filtering and s...
This thesis is on filtering in state space models. First, we examine approximate Kalman filters for ...
State-space models can be used to incorporate subject knowledge on the underlying dynamics of a time...
We present approximate algorithms for performing smoothing in a class of high-dimensional state-spac...
We present approximate algorithms for performing smoothing in a class of high-dimensional state-spac...
In sequential data assimilation problems, the Kalman filter (KF) is optimal for linear Gaussian mode...
Abstract: Nonlinear non-Gaussian state-space models arise in numerous applications in control and si...
We develop methods for performing smoothing computations in general state-space models. The methods ...
for performing inference in non-linear non-Gaussian state-space models. The class of “Rao-Blackwelli...
Nonlinear non-Gaussian state-space models arise in numerous applications in control and signal proce...
This thesis provides a set of novel Monte Carlo methods to perform Bayesian inference, with an empha...
We consider the problem of high-dimensional filtering of state-space models (SSMs) at discrete times...
State space models are powerful modeling tools for stochastic dynamical systems and have been an imp...
Numbers are present everywhere, and when they are collected and recorded we refer to them as data. M...
This paper revisits the work of Rauch et al. (1965) and develops a novel method for recursive maximu...