<div><p>We propose a general likelihood evaluation method for nonlinear non-Gaussian state-space models using the simulation-based method of efficient importance sampling. We minimize the simulation effort by replacing some key steps of the likelihood estimation procedure by numerical integration. We refer to this method as numerically accelerated importance sampling. We show that the likelihood function for models with a high-dimensional state vector and a low-dimensional signal can be evaluated more efficiently using the new method. We report many efficiency gains in an extensive Monte Carlo study as well as in an empirical application using a stochastic volatility model for U.S. stock returns with multiple volatility factors. Supplementa...
A Numerical integration When a continuous function ϕ(x) is known analytically for any x, we can effi...
We propose a new methodology for designing flexible proposal densities for the joint posterior densi...
In this paper, a method is introduced for approximating the likelihood for the unknown parameters of...
We propose a general likelihood evaluation method for nonlinear non-Gaussian state-space models usin...
We consider likelihood inference and state estimation by means of importance sampling for state spac...
The construction of an importance density for partially non-Gaussian state space models is crucial w...
We develop a proposal or importance density for state space models with a nonlinear non-Gaussian obs...
We develop a proposal or importance density for state space models with a nonlinear non-Gaussian obs...
Writers develop a numerical procedure that facilitates efficient likelihood evaluation in applicatio...
We first present a short review of Monte Carlo techniques for likelihood evaluation for state space ...
The first chapter of my thesis (co-authored with David N. DeJong, Jean-Francois Richard and Roman Li...
The interest of this dissertation lays on the Likelihood Evaluation and Maximum Likelihood (ML) Para...
We apply Harrison and Stevens\u27 (1976) state space model with switching to model additive outliers...
The likelihood function of a general non-linear, non-Gaussian state space model is a high-dimensiona...
We propose a new generic and highly efficient Accelerated Gaussian Importance Sampler (AGIS) for the...
A Numerical integration When a continuous function ϕ(x) is known analytically for any x, we can effi...
We propose a new methodology for designing flexible proposal densities for the joint posterior densi...
In this paper, a method is introduced for approximating the likelihood for the unknown parameters of...
We propose a general likelihood evaluation method for nonlinear non-Gaussian state-space models usin...
We consider likelihood inference and state estimation by means of importance sampling for state spac...
The construction of an importance density for partially non-Gaussian state space models is crucial w...
We develop a proposal or importance density for state space models with a nonlinear non-Gaussian obs...
We develop a proposal or importance density for state space models with a nonlinear non-Gaussian obs...
Writers develop a numerical procedure that facilitates efficient likelihood evaluation in applicatio...
We first present a short review of Monte Carlo techniques for likelihood evaluation for state space ...
The first chapter of my thesis (co-authored with David N. DeJong, Jean-Francois Richard and Roman Li...
The interest of this dissertation lays on the Likelihood Evaluation and Maximum Likelihood (ML) Para...
We apply Harrison and Stevens\u27 (1976) state space model with switching to model additive outliers...
The likelihood function of a general non-linear, non-Gaussian state space model is a high-dimensiona...
We propose a new generic and highly efficient Accelerated Gaussian Importance Sampler (AGIS) for the...
A Numerical integration When a continuous function ϕ(x) is known analytically for any x, we can effi...
We propose a new methodology for designing flexible proposal densities for the joint posterior densi...
In this paper, a method is introduced for approximating the likelihood for the unknown parameters of...