We study sequences of scaled edge-corrected empirical (generalized) K-functions (modifying Ripley's K-function) each of them constructed from a single observation of a d-dimensional fourth-order stationary point process in a sampling window W_n which grows together with some scaling rate unboundedly as n --> infty. Under some natural assumptions it is shown that the normalized difference between scaled empirical and scaled theoretical K-function converges weakly to a mean zero Gaussian process with simple covariance function. This result suggests discrepancy measures between empirical and theoretical K-function with known limit distribution which allow to perform goodness-of-fit tests for checking a hypothesized point process based only on ...
Let us start with a random sample X1, . . . , Xn that is independent and identically distributed and...
It is shown that under mild assumptions, a convolution-smoothed empirical process exhibits essential...
International audienceThe second order statistical properties of point processes are described by th...
This work presents an alternative derivation of the asymptotic distribution of Ripley's K-function f...
We prove the asymptotic normality of kernel estimators of second- and higher-order product densities...
We prove two functional limit theorems for empirical multiparameter second moment functions (general...
We study the asymptotic behaviour of the empirical distribution function derived from a stationary ...
A new approach for point process diagnostics is presented. The method is based on extending second-...
Spatial point processes are mathematical models for irregular or random point patterns in the d-dime...
We consider spatially homogeneous marked point patterns in an unboundedly expanding convex sampling ...
Point processes are random local finite sets of points in a space that are used for mod- elling and ...
For a long time, the goodness of fit (GOF) tests have been one of the main objects of the theory of ...
We investigate the properties of a weighted analogue of Ripley's K-function which was first introduc...
In this thesis we examine estimation of the K-function which is an important second-order characteri...
AbstractIn this paper we derive a general invariance principle for empirical processes indexed by sm...
Let us start with a random sample X1, . . . , Xn that is independent and identically distributed and...
It is shown that under mild assumptions, a convolution-smoothed empirical process exhibits essential...
International audienceThe second order statistical properties of point processes are described by th...
This work presents an alternative derivation of the asymptotic distribution of Ripley's K-function f...
We prove the asymptotic normality of kernel estimators of second- and higher-order product densities...
We prove two functional limit theorems for empirical multiparameter second moment functions (general...
We study the asymptotic behaviour of the empirical distribution function derived from a stationary ...
A new approach for point process diagnostics is presented. The method is based on extending second-...
Spatial point processes are mathematical models for irregular or random point patterns in the d-dime...
We consider spatially homogeneous marked point patterns in an unboundedly expanding convex sampling ...
Point processes are random local finite sets of points in a space that are used for mod- elling and ...
For a long time, the goodness of fit (GOF) tests have been one of the main objects of the theory of ...
We investigate the properties of a weighted analogue of Ripley's K-function which was first introduc...
In this thesis we examine estimation of the K-function which is an important second-order characteri...
AbstractIn this paper we derive a general invariance principle for empirical processes indexed by sm...
Let us start with a random sample X1, . . . , Xn that is independent and identically distributed and...
It is shown that under mild assumptions, a convolution-smoothed empirical process exhibits essential...
International audienceThe second order statistical properties of point processes are described by th...