We study estimation and prediction of Gaussian random fields with covariance models belonging to the generalized Wendland (GW) class, under fixed domain asymptotics. As for the Matérn case, this class allows for a continuous parameterization of smoothness of the underlying Gaussian random field, being additionally compactly supported. The paper is divided into three parts: first, we characterize the equivalence of two Gaussian measures with GW covariance function, and we provide sufficient conditions for the equivalence of two Gaussian measures with Matérn and GW covariance functions. In the second part, we establish strong consistency and asymptotic distribution of the maximum likelihood estimator of the microergodic parameter associated t...
Abstract: When the spatial sample size is extremely large which occurs in many environmental and eco...
International audienceWe consider a one-dimensional Gaussian process having exponential covariance f...
In recent literature there has been a growing interest in the construction of covariance models for ...
We study estimation and prediction of Gaussian random fields with covariance models belonging to the...
We study estimation and prediction of Gaussian random fields with covariance models belonging to the...
We study the estimation and prediction of Gaussian processes with spacetime covariance models belong...
We consider maximum likelihood estimation with data from a bivariate Gaussian process with a separab...
The Matern family of covariance functions has played a central role in spatial statistics for decade...
Given a zero-mean Gaussian random field with a covariance function that belongs to a parametric fami...
Gaussian process models typically contain finite dimensional parameters in the covariance function t...
Cokriging is the common method of spatial interpolation (best linear unbiased prediction) in multiva...
Given a zero-mean Gaussian random field with a covariance function that belongs to a parametric fami...
We consider the estimation of the variance and spatial scale parameters of the covariance function o...
The best linear unbiased predictor (BLUP) is called a kriging predictor and has been widely used to ...
We study composite likelihood estimation of the covariance parameters with data from a one-dimension...
Abstract: When the spatial sample size is extremely large which occurs in many environmental and eco...
International audienceWe consider a one-dimensional Gaussian process having exponential covariance f...
In recent literature there has been a growing interest in the construction of covariance models for ...
We study estimation and prediction of Gaussian random fields with covariance models belonging to the...
We study estimation and prediction of Gaussian random fields with covariance models belonging to the...
We study the estimation and prediction of Gaussian processes with spacetime covariance models belong...
We consider maximum likelihood estimation with data from a bivariate Gaussian process with a separab...
The Matern family of covariance functions has played a central role in spatial statistics for decade...
Given a zero-mean Gaussian random field with a covariance function that belongs to a parametric fami...
Gaussian process models typically contain finite dimensional parameters in the covariance function t...
Cokriging is the common method of spatial interpolation (best linear unbiased prediction) in multiva...
Given a zero-mean Gaussian random field with a covariance function that belongs to a parametric fami...
We consider the estimation of the variance and spatial scale parameters of the covariance function o...
The best linear unbiased predictor (BLUP) is called a kriging predictor and has been widely used to ...
We study composite likelihood estimation of the covariance parameters with data from a one-dimension...
Abstract: When the spatial sample size is extremely large which occurs in many environmental and eco...
International audienceWe consider a one-dimensional Gaussian process having exponential covariance f...
In recent literature there has been a growing interest in the construction of covariance models for ...