Structured space-sphere point processes and $K$-functions
Abstract
This paper concerns space-sphere point processes, that is, point processes on the product space of (the -dimensional Euclidean space) and (the -dimen\-sional sphere). We consider specific classes of models for space-sphere point processes, which are adaptations of existing models for either spherical or spatial point processes. For model checking or fitting, we present the space-sphere -function which is a natural extension of the inhomogeneous -function for point processes on to the case of space-sphere point processes. Under the assumption that the intensity and pair correlation function both have a certain separable structure, the space-sphere -function is shown to be proportional to the product of the inhomogeneous spatial and spherical -functions. For the presented space-sphere point process models, we discuss cases where such a separable structure can be obtained. The usefulness of the space-sphere -function is illustrated for real and simulated datasets with varying dimensions and .
Keywords
Cite
@article{arxiv.1812.08986,
title = {Structured space-sphere point processes and $K$-functions},
author = {Jesper Møller and Heidi S. Christensen and Francisco Cuevas-Pacheco and Andreas D. Christoffersen},
journal= {arXiv preprint arXiv:1812.08986},
year = {2019}
}