We introduce state-space models where the functionals of the observational and the evolu-tionary equations are unknown, and treated as random functions evolving with time. Thus, our model is nonparametric and generalizes the traditional parametric state-space models. This random function approach also frees us from the restrictive assumption that the functional forms, although time-dependent, are of fixed forms. The traditional approach of assuming known, parametric functional forms is questionable, particularly in state-space models, since the validation of the assumptions require data on both the observed time series and the latent states; however, data on the latter are not available in state-space models. We specify Gaussian processes a...
Using Kalman techniques, it is possible to perform optimal estimation in linear Gaussian state-space...
Multi-state models provide a unified framework for the description of the evolution of discrete phen...
Multi-state models provide a unified framework for the description of the evolution of discrete phen...
We introduce state-space models where the functionals of the observational and evolutionary equation...
<p>State space models are well-known for their versatility in modeling dynamic systems that arise in...
State-space models are successfully used in many areas of science, engineering and economics to mode...
State-space models are successfully used in many areas of science, engineering and economics to mode...
<p>Dynamic models, also termed state space models, comprise an extremely rich model class for time s...
The analysis of time series data is important in fields as disparate as the social sciences, biology...
Stationary time series models built from parametric distributions are, in general, limited in scope ...
A method for sequential Bayesian inference of the static parameters of a dy-namic state space model ...
Multi-state models are frequently applied to represent processes evolving through a discrete set of ...
The analysis of non-Gaussian time series using state space models is considered from both classical ...
Dynamic models extend state space models to non-normal observations. This paper suggests a specific ...
We present a framework for Bayesian functional time series analysis, based on the extension of the c...
Using Kalman techniques, it is possible to perform optimal estimation in linear Gaussian state-space...
Multi-state models provide a unified framework for the description of the evolution of discrete phen...
Multi-state models provide a unified framework for the description of the evolution of discrete phen...
We introduce state-space models where the functionals of the observational and evolutionary equation...
<p>State space models are well-known for their versatility in modeling dynamic systems that arise in...
State-space models are successfully used in many areas of science, engineering and economics to mode...
State-space models are successfully used in many areas of science, engineering and economics to mode...
<p>Dynamic models, also termed state space models, comprise an extremely rich model class for time s...
The analysis of time series data is important in fields as disparate as the social sciences, biology...
Stationary time series models built from parametric distributions are, in general, limited in scope ...
A method for sequential Bayesian inference of the static parameters of a dy-namic state space model ...
Multi-state models are frequently applied to represent processes evolving through a discrete set of ...
The analysis of non-Gaussian time series using state space models is considered from both classical ...
Dynamic models extend state space models to non-normal observations. This paper suggests a specific ...
We present a framework for Bayesian functional time series analysis, based on the extension of the c...
Using Kalman techniques, it is possible to perform optimal estimation in linear Gaussian state-space...
Multi-state models provide a unified framework for the description of the evolution of discrete phen...
Multi-state models provide a unified framework for the description of the evolution of discrete phen...