We develop a new methodology for estimating and testing the form of anisotropy of homogeneous spatial processes. We derive a generalised version of the isotropy test proposed by Arbia et al. (2013) and analyse its properties in various settings. Expanding on this, we propose a new testing procedure in the frequency domain that allows one to estimate and test under mild conditions any form of anisotropy in homogeneous spatial processes. The power of the test is studied by means of Monte Carlo simulations performed both on regularly and irregularly spaced data. Finally, the method is used to analyse the soybean yields in the US
International audienceThe distribution of a variable observed over a domain depends on the underlyin...
In analysing the distribution of a variable in a space, each value is subject not only to the source...
International audienceIn this paper, we deal with some anisotropic extensions of the multifractional...
This paper develops a new methodology for estimating and testing the form of anisotropy of homogeneo...
Isotropy of a point process, defined as invariance of the distribution under rotation, is often assu...
The assumption of direction invariance, i.e., isotropy, is often made in the practical analysis of s...
Stationarity in space presents two aspects: homogeneity and isotropy. They correspond respectively ...
AbstractSpatial statistics is one of the major methodologies of image analysis, field trials, remote...
A common requirement for spatial analysis is the modeling of the second-order structure. While the a...
The efficient mapping of environmental hazards requires the development of methods for the analysis ...
Paper deals with a problem of testing isotropy against geometric anisotropy for Gaussian spatial dat...
The distribution of a variable observed over a domain depends on the underlying process and also on...
For modeling spatial processes, we propose rich classes of range anisotropic covariance structures t...
In this paper an exploratory technique based on the diagonalization of cross-variogram matrices is d...
This work addresses the question of building useful and valid models of anisotropic variograms for s...
International audienceThe distribution of a variable observed over a domain depends on the underlyin...
In analysing the distribution of a variable in a space, each value is subject not only to the source...
International audienceIn this paper, we deal with some anisotropic extensions of the multifractional...
This paper develops a new methodology for estimating and testing the form of anisotropy of homogeneo...
Isotropy of a point process, defined as invariance of the distribution under rotation, is often assu...
The assumption of direction invariance, i.e., isotropy, is often made in the practical analysis of s...
Stationarity in space presents two aspects: homogeneity and isotropy. They correspond respectively ...
AbstractSpatial statistics is one of the major methodologies of image analysis, field trials, remote...
A common requirement for spatial analysis is the modeling of the second-order structure. While the a...
The efficient mapping of environmental hazards requires the development of methods for the analysis ...
Paper deals with a problem of testing isotropy against geometric anisotropy for Gaussian spatial dat...
The distribution of a variable observed over a domain depends on the underlying process and also on...
For modeling spatial processes, we propose rich classes of range anisotropic covariance structures t...
In this paper an exploratory technique based on the diagonalization of cross-variogram matrices is d...
This work addresses the question of building useful and valid models of anisotropic variograms for s...
International audienceThe distribution of a variable observed over a domain depends on the underlyin...
In analysing the distribution of a variable in a space, each value is subject not only to the source...
International audienceIn this paper, we deal with some anisotropic extensions of the multifractional...