Statistical analysis of point processes often assumes that the underlying process is isotropic in the sense that its distribution is invariant under rotation. For point processes on R2 , some tests based on the K- and nearest neighbour orientation functions have been proposed to check such an assumption. However, anisotropy and directional analysis need proper caution when dealing with point processes on linear networks, as the implicit geometry of the network forces particular directions that the points of the pattern have to necessarily meet. In this paper, we adapt such tests to the case of linear networks, and discuss how to use them to detect particular directional preferences, even at some angles that are different from the m...
The assumption of direction invariance, i.e. isotropy, is often made in the practical analysis of sp...
Various methods for directional analysis of spatial point patterns have been introduced in the liter...
The last decade witnessed an extraordinary increase in interest in the analysis of network related d...
Statistical analysis of point processes often assumes that the underlying process is isotropic in th...
Isotropy of a point process, defined as invariance of the distribution\ua0under rotation, is often a...
Analyses of spatial point patterns tend to focus on deviations from randomness by either clustering ...
The assumption of direction invariance, i.e., isotropy, is often made in the practical analysis of s...
Isotropy of a point process, defined as invariance of the distribution under rotation, is often assu...
Statistical methodology for analysing patterns of points on a network of lines, such as road traffic...
In this mini-dissertation we discuss the spatial relationship between point processes and a linear n...
A spatial point pattern is called anisotropic if its spatial structure depends on direction. Several...
The last decade witnessed an extraordinary increase in interest in the analysis of network related ...
We consider spatial point processes with a pair correlation function g(u) which depends only on the ...
The main theme of this thesis is the theory of stationary point processes, in particular the directi...
Point processes on linear networks are increasingly being considered to analyse events occurring on ...
The assumption of direction invariance, i.e. isotropy, is often made in the practical analysis of sp...
Various methods for directional analysis of spatial point patterns have been introduced in the liter...
The last decade witnessed an extraordinary increase in interest in the analysis of network related d...
Statistical analysis of point processes often assumes that the underlying process is isotropic in th...
Isotropy of a point process, defined as invariance of the distribution\ua0under rotation, is often a...
Analyses of spatial point patterns tend to focus on deviations from randomness by either clustering ...
The assumption of direction invariance, i.e., isotropy, is often made in the practical analysis of s...
Isotropy of a point process, defined as invariance of the distribution under rotation, is often assu...
Statistical methodology for analysing patterns of points on a network of lines, such as road traffic...
In this mini-dissertation we discuss the spatial relationship between point processes and a linear n...
A spatial point pattern is called anisotropic if its spatial structure depends on direction. Several...
The last decade witnessed an extraordinary increase in interest in the analysis of network related ...
We consider spatial point processes with a pair correlation function g(u) which depends only on the ...
The main theme of this thesis is the theory of stationary point processes, in particular the directi...
Point processes on linear networks are increasingly being considered to analyse events occurring on ...
The assumption of direction invariance, i.e. isotropy, is often made in the practical analysis of sp...
Various methods for directional analysis of spatial point patterns have been introduced in the liter...
The last decade witnessed an extraordinary increase in interest in the analysis of network related d...