The assumption of direction invariance, i.e., isotropy, is often made in the practical analysis of spatial point processes due to simpler interpretation and ease of analysis. However, this assumption is many times hard to find in real applications. Many homogeneous point processes are indeed anisotropic. This paper concerns the analysis and detection of spatial anisotropies in terms of detection of linearities in spatial point processes, and even more generally, in terms of testing for spatial anisotropy. We propose a wavelet-based approach to test for isotropy in spatial point processes based on the logarithm of the directional scalogram. Under the null hypothesis of isotropy, a random isotropic process should be expected to have the same...
Second-order spatio-temporal orientation methods provide a natural tool for the analysis of anisotro...
For modeling spatial processes, we propose rich classes of range anisotropic covariance structures t...
A common requirement for spatial analysis is the modeling of the second-order structure. While the a...
The assumption of direction invariance, i.e. isotropy, is often made in the practical analysis of sp...
A two-dimensional point process, if considered as a random measure, can be expressed as a countable ...
A spatial point pattern is called anisotropic if its spatial structure depends on direction. Several...
A two-dimensional stochastic point process can be regarded as a random measure and thus represented ...
Isotropy of a point process, defined as invariance of the distribution under rotation, is often assu...
Various methods for directional analysis of spatial point patterns have been introduced in the liter...
Isotropy of a point process, defined as invariance of the distribution\ua0under rotation, is often a...
A spatial point process can be considered a random measure and therefore represented as a countable ...
We develop a new methodology for estimating and testing the form of anisotropy of homogeneous spatia...
This work addresses the question of building useful and valid models of anisotropic variograms for s...
Statistical analysis of point processes often assumes that the underlying process is isotropic in t...
International audiencePattern heterogeneities and anisotropies often carry significant physical info...
Second-order spatio-temporal orientation methods provide a natural tool for the analysis of anisotro...
For modeling spatial processes, we propose rich classes of range anisotropic covariance structures t...
A common requirement for spatial analysis is the modeling of the second-order structure. While the a...
The assumption of direction invariance, i.e. isotropy, is often made in the practical analysis of sp...
A two-dimensional point process, if considered as a random measure, can be expressed as a countable ...
A spatial point pattern is called anisotropic if its spatial structure depends on direction. Several...
A two-dimensional stochastic point process can be regarded as a random measure and thus represented ...
Isotropy of a point process, defined as invariance of the distribution under rotation, is often assu...
Various methods for directional analysis of spatial point patterns have been introduced in the liter...
Isotropy of a point process, defined as invariance of the distribution\ua0under rotation, is often a...
A spatial point process can be considered a random measure and therefore represented as a countable ...
We develop a new methodology for estimating and testing the form of anisotropy of homogeneous spatia...
This work addresses the question of building useful and valid models of anisotropic variograms for s...
Statistical analysis of point processes often assumes that the underlying process is isotropic in t...
International audiencePattern heterogeneities and anisotropies often carry significant physical info...
Second-order spatio-temporal orientation methods provide a natural tool for the analysis of anisotro...
For modeling spatial processes, we propose rich classes of range anisotropic covariance structures t...
A common requirement for spatial analysis is the modeling of the second-order structure. While the a...