Parameter estimation is a growing area of interest in statistical signal processing. Some parameters in real-life applications vary in space as opposed to those that are static. Most common methods in estimating parameters involve solving an optimization problem where the cost function is assembled variously; for example, maximum likelihood and maximum a posteriori methods. However, these methods do not have exact solutions to most real-life problems. It is for this reason that Monte Carlo methods are preferred. In this paper, we treat the estimation of parameters which vary with space. We use Metropolis-Hastings algorithm as a selection criteria for the maximum filter likelihood. Comparisons are made with the use of joint estimation of bot...
This thesis provides a set of novel Monte Carlo methods to perform Bayesian inference, with an empha...
We present approximate algorithms for performing smoothing in a class of high-dimensional state-spac...
The marginal likelihood can be notoriously difficult to compute, and particularly so in high-dimensi...
The coefficients in a general second order linear stochastic partial differential equation (SPDE) ar...
Model parameterinferencehas become increasingly popular in recent years in the field of computationa...
The identification of the spatially dependent parameters in Partial Differential Equations (PDEs) is...
The maximum likelihood estimation of a dynamic spatiotemporal model is introduced, centred around th...
Particle Metropolis-Hastings (PMH) allows for Bayesian parameter inference in nonlinear state space ...
Maximum likelihood and related techniques are generally considered the best method for estimating th...
The likelihood functions for spatial autoregressive models with normal but heteroskedastic distur-ba...
This work is concerned with approximate inference in dynamical systems, from a variational Bayesian ...
In this study, I investigate the necessary condition for consistency of the maximum likelihood estim...
The limitations of the maximum likelihood method for estimating spatial covariance parameters are: t...
This paper offers a new technique for spatially adaptive estimation. The local likelihood is exploit...
We present approximate algorithms for performing smoothing in a class of high-dimensional state-spac...
This thesis provides a set of novel Monte Carlo methods to perform Bayesian inference, with an empha...
We present approximate algorithms for performing smoothing in a class of high-dimensional state-spac...
The marginal likelihood can be notoriously difficult to compute, and particularly so in high-dimensi...
The coefficients in a general second order linear stochastic partial differential equation (SPDE) ar...
Model parameterinferencehas become increasingly popular in recent years in the field of computationa...
The identification of the spatially dependent parameters in Partial Differential Equations (PDEs) is...
The maximum likelihood estimation of a dynamic spatiotemporal model is introduced, centred around th...
Particle Metropolis-Hastings (PMH) allows for Bayesian parameter inference in nonlinear state space ...
Maximum likelihood and related techniques are generally considered the best method for estimating th...
The likelihood functions for spatial autoregressive models with normal but heteroskedastic distur-ba...
This work is concerned with approximate inference in dynamical systems, from a variational Bayesian ...
In this study, I investigate the necessary condition for consistency of the maximum likelihood estim...
The limitations of the maximum likelihood method for estimating spatial covariance parameters are: t...
This paper offers a new technique for spatially adaptive estimation. The local likelihood is exploit...
We present approximate algorithms for performing smoothing in a class of high-dimensional state-spac...
This thesis provides a set of novel Monte Carlo methods to perform Bayesian inference, with an empha...
We present approximate algorithms for performing smoothing in a class of high-dimensional state-spac...
The marginal likelihood can be notoriously difficult to compute, and particularly so in high-dimensi...