Spatial point processes are mathematical models for irregular or random point patterns in the d-dimensional space, where usually d=2 or d=3 in applications. The second-order product density and its isotropic analogue, the pair correlation function, are important tools for analyzing stationary point processes. In the present work we derive central limit theorems for the integrated squared error (ISE) of the empirical second-order product density and for the ISE of the empirical pair correlation function for expanding observation windows. The proof techniques are based on higher-order cumulant measures and the Brillinger-mixing property of the underlying point processes. The obtained Gaussian limits are used for constructing asymptotic goodne...
summary:A special case of a Gibbsian facet process on a fixed window with a discrete orientation dis...
A new diagnostic method for point processes is here presented. It is based on their second-order ana...
International audiencePositively (resp. negatively) associated point processes are a class of point ...
Spatial point processes are mathematical models for irregular or random point patterns in the d-dime...
We prove the asymptotic normality of kernel estimators of second- and higher-order product densities...
In the present work we investigate kernel-type estimators for product densities and for the pair cor...
A new approach for point process diagnostics is presented. The method is based on extending second-...
International audienceLet $\mathcal{P}$ be a simple, stationary, clustering point process on $\mathb...
We prove two functional limit theorems for empirical multiparameter second moment functions (general...
We propose a general definition for weak dependence of point processes as an alternative to mixing d...
We study sequences of scaled edge-corrected empirical (generalized) K-functions (modifying Ripley's ...
International audienceWe propose a general definition for weak dependence of point processes as an a...
This paper establishes a central limit theorem (CLT) for empirical processes indexed by smooth funct...
In this work, a generalised version of the central limit theorem is proposed for nonlinear functiona...
We consider spatially homogeneous marked point patterns in an unboundedly expanding convex sampling ...
summary:A special case of a Gibbsian facet process on a fixed window with a discrete orientation dis...
A new diagnostic method for point processes is here presented. It is based on their second-order ana...
International audiencePositively (resp. negatively) associated point processes are a class of point ...
Spatial point processes are mathematical models for irregular or random point patterns in the d-dime...
We prove the asymptotic normality of kernel estimators of second- and higher-order product densities...
In the present work we investigate kernel-type estimators for product densities and for the pair cor...
A new approach for point process diagnostics is presented. The method is based on extending second-...
International audienceLet $\mathcal{P}$ be a simple, stationary, clustering point process on $\mathb...
We prove two functional limit theorems for empirical multiparameter second moment functions (general...
We propose a general definition for weak dependence of point processes as an alternative to mixing d...
We study sequences of scaled edge-corrected empirical (generalized) K-functions (modifying Ripley's ...
International audienceWe propose a general definition for weak dependence of point processes as an a...
This paper establishes a central limit theorem (CLT) for empirical processes indexed by smooth funct...
In this work, a generalised version of the central limit theorem is proposed for nonlinear functiona...
We consider spatially homogeneous marked point patterns in an unboundedly expanding convex sampling ...
summary:A special case of a Gibbsian facet process on a fixed window with a discrete orientation dis...
A new diagnostic method for point processes is here presented. It is based on their second-order ana...
International audiencePositively (resp. negatively) associated point processes are a class of point ...