The assumption of direction invariance, i.e. isotropy, is often made in the practical analysis of spatial point patterns due to simpler interpretation and ease of analysis. However, this assumption is many times hard to find in real applications. We propose a wavelet-based approach to test for isotropy in spatial patterns based on the logarithm of the directional scalogram. Under the null hypothesis of isotropy, a random isotropic point pattern should be expected to have the same value of the directional scalogram for any possible direction. Monte Carlo simulations of the logarithm of the directional scalogram over all directions are used to approximate the test distribution and the critical values. We demonstrate the efficacy of the approa...
Analyses of spatial point patterns tend to focus on deviations from randomness by either clustering ...
Efcient representations of signals require that coefcients of functions that represent the regions o...
This thesis explores the theory and applications of directional representations in the field of anis...
The assumption of direction invariance, i.e., isotropy, is often made in the practical analysis of s...
A spatial point pattern is called anisotropic if its spatial structure depends on direction. Several...
A two-dimensional point process, if considered as a random measure, can be expressed as a countable ...
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...
International audienceThis paper is concerned with the estimation of the dominant orientation of tex...
A two-dimensional stochastic point process can be regarded as a random measure and thus represented ...
<p>Panels C and D depict the wavelet variance of DEM and MCH, respectively, as a function of the sca...
AbstractIn this paper an exploratory technique based on the diagonalization of cross-variogram matri...
A common requirement for spatial analysis is the modeling of the second-order structure. While the a...
A spatial point process can be considered a random measure and therefore represented as a countable ...
In this paper an exploratory technique based on the diagonalization of cross-variogram matrices is d...
Analyses of spatial point patterns tend to focus on deviations from randomness by either clustering ...
Efcient representations of signals require that coefcients of functions that represent the regions o...
This thesis explores the theory and applications of directional representations in the field of anis...
The assumption of direction invariance, i.e., isotropy, is often made in the practical analysis of s...
A spatial point pattern is called anisotropic if its spatial structure depends on direction. Several...
A two-dimensional point process, if considered as a random measure, can be expressed as a countable ...
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...
International audienceThis paper is concerned with the estimation of the dominant orientation of tex...
A two-dimensional stochastic point process can be regarded as a random measure and thus represented ...
<p>Panels C and D depict the wavelet variance of DEM and MCH, respectively, as a function of the sca...
AbstractIn this paper an exploratory technique based on the diagonalization of cross-variogram matri...
A common requirement for spatial analysis is the modeling of the second-order structure. While the a...
A spatial point process can be considered a random measure and therefore represented as a countable ...
In this paper an exploratory technique based on the diagonalization of cross-variogram matrices is d...
Analyses of spatial point patterns tend to focus on deviations from randomness by either clustering ...
Efcient representations of signals require that coefcients of functions that represent the regions o...
This thesis explores the theory and applications of directional representations in the field of anis...