We consider the estimation of the parameters of a stationary random field on d-dimensional lattice by minimizing the classical Whittle approximation to the Gaussian log likelihood. If the usual biased sample covariances are used, the estimate is efficient only in one dimension. To remove this edge effect, we introduce data tapers and show that the resulting modified estimate is efficient also in two and three dimensions. This avoids the use of the unbiased sample covariances which are in general not positive-definit
A common problem in spatial statistics is to predict a random field f at some spatial location t(0) ...
We consider the estimation of parametric models for stationary spatial or spatio-temporal data on a ...
AbstractLet ZN, N ≥ 1, denote the integer lattice points in the N-dimensional Euclidean space. Asymp...
In the estimation of parametric models for stationary spatial or spatio-temporal data on a d-dimensi...
In this article we discuss a generalization of the Whittle likelihood approximation from stationary ...
Smoothed nonparametric kernel spectral density estimates are considered for stationary data observed...
Following the ideas presented in Dahlhaus (2000) and Dahlhaus and Sahm (2000) for time series, we bu...
Corrected version in March 2009This paper considers the nonparametric estimation of spectral densiti...
In the estimation of parametric models for stationary spatial or spatio-temporal data on a d-dimensi...
We consider the nonparametric estimation of spectral densities for secondorder stationary random fie...
Nonparametric spectral density estimates find many uses in econometrics. For stationary random field...
In this paper we present novel results on the asymptotic be-havior of the so-called Ibragimov minimu...
The best linear unbiased predictor (BLUP) is called a kriging predictor and has been widely used to ...
Given a zero-mean Gaussian random field with a covariance function that belongs to a parametric fami...
AbstractIn the estimation of parametric models for stationary spatial or spatio-temporal data on a d...
A common problem in spatial statistics is to predict a random field f at some spatial location t(0) ...
We consider the estimation of parametric models for stationary spatial or spatio-temporal data on a ...
AbstractLet ZN, N ≥ 1, denote the integer lattice points in the N-dimensional Euclidean space. Asymp...
In the estimation of parametric models for stationary spatial or spatio-temporal data on a d-dimensi...
In this article we discuss a generalization of the Whittle likelihood approximation from stationary ...
Smoothed nonparametric kernel spectral density estimates are considered for stationary data observed...
Following the ideas presented in Dahlhaus (2000) and Dahlhaus and Sahm (2000) for time series, we bu...
Corrected version in March 2009This paper considers the nonparametric estimation of spectral densiti...
In the estimation of parametric models for stationary spatial or spatio-temporal data on a d-dimensi...
We consider the nonparametric estimation of spectral densities for secondorder stationary random fie...
Nonparametric spectral density estimates find many uses in econometrics. For stationary random field...
In this paper we present novel results on the asymptotic be-havior of the so-called Ibragimov minimu...
The best linear unbiased predictor (BLUP) is called a kriging predictor and has been widely used to ...
Given a zero-mean Gaussian random field with a covariance function that belongs to a parametric fami...
AbstractIn the estimation of parametric models for stationary spatial or spatio-temporal data on a d...
A common problem in spatial statistics is to predict a random field f at some spatial location t(0) ...
We consider the estimation of parametric models for stationary spatial or spatio-temporal data on a ...
AbstractLet ZN, N ≥ 1, denote the integer lattice points in the N-dimensional Euclidean space. Asymp...