Anisotropy in stationary spatial point patterns is investigated. We develop a two-stage non-parametric method for quantifying geometric anisotropy arising for example when the pattern is compressed or stretched. First, we fit ellipsoids to the pattern of pairwise difference vectors to estimate the direction of anisotropy. Then, we estimate the scale of anisotropy by identifying the back-transformation resulting in the most isotropic pattern. We demonstrate the applicability of the method mainly for regular patterns by numerical examples, and use it to improve the estimation of compression in 3D polar ice air bubble patterns
The texture anisotropy is a very important cue for object recognition. Suitable methods and procedur...
We consider spatial point processes with a pair correlation function g(u) which depends only on the ...
Isotropy of a point process, defined as invariance of the distribution under rotation, is often assu...
Anisotropy in stationary spatial point patterns is investigated. We develop a two-stage non-parametr...
This paper introduces methods for the detection of anisotropies which are caused by compression of r...
A spatial point pattern is called anisotropic if its spatial structure depends on direction. Several...
In this thesis we consider the directional analysis of stationary point processes. We focus on three...
The assumption of direction invariance, i.e., isotropy, is often made in the practical analysis of s...
Various methods for directional analysis of spatial point patterns have been introduced in the liter...
International audienceWe present a method to extract polyhedral structures from a three-dimensional ...
This work addresses the question of building useful and valid models of anisotropic variograms for s...
International audiencePattern heterogeneities and anisotropies often carry significant physical info...
The assumption of direction invariance, i.e. isotropy, is often made in the practical analysis of sp...
We present an application of a family of affine diagrams to the detection of three-dimensional sampl...
Summarization: Spatially referenced data often have autocovariance functions with elliptical isoleve...
The texture anisotropy is a very important cue for object recognition. Suitable methods and procedur...
We consider spatial point processes with a pair correlation function g(u) which depends only on the ...
Isotropy of a point process, defined as invariance of the distribution under rotation, is often assu...
Anisotropy in stationary spatial point patterns is investigated. We develop a two-stage non-parametr...
This paper introduces methods for the detection of anisotropies which are caused by compression of r...
A spatial point pattern is called anisotropic if its spatial structure depends on direction. Several...
In this thesis we consider the directional analysis of stationary point processes. We focus on three...
The assumption of direction invariance, i.e., isotropy, is often made in the practical analysis of s...
Various methods for directional analysis of spatial point patterns have been introduced in the liter...
International audienceWe present a method to extract polyhedral structures from a three-dimensional ...
This work addresses the question of building useful and valid models of anisotropic variograms for s...
International audiencePattern heterogeneities and anisotropies often carry significant physical info...
The assumption of direction invariance, i.e. isotropy, is often made in the practical analysis of sp...
We present an application of a family of affine diagrams to the detection of three-dimensional sampl...
Summarization: Spatially referenced data often have autocovariance functions with elliptical isoleve...
The texture anisotropy is a very important cue for object recognition. Suitable methods and procedur...
We consider spatial point processes with a pair correlation function g(u) which depends only on the ...
Isotropy of a point process, defined as invariance of the distribution under rotation, is often assu...