Likelihood Inference for Unions of Interacting Discs |
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| Authors: | JESPER MØLLER KATE?INA HELISOVÁ |
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| Institution: | 1. Department of Mathematical Sciences, Aalborg University;2. Department of Probability and Mathematical Statistics, Faculty of Mathematics and Physics, Charles University in Prague and Department of Mathematics, Faculty of Electrical Engineering, Czech Technical University in Prague |
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| Abstract: | Abstract. This is probably the first paper which discusses likelihood inference for a random set using a germ‐grain model, where the individual grains are unobservable, edge effects occur and other complications appear. We consider the case where the grains form a disc process modelled by a marked point process, where the germs are the centres and the marks are the associated radii of the discs. We propose to use a recent parametric class of interacting disc process models, where the minimal sufficient statistic depends on various geometric properties of the random set, and the density is specified with respect to a given marked Poisson model (i.e. a Boolean model). We show how edge effects and other complications can be handled by considering a certain conditional likelihood. Our methodology is illustrated by analysing Peter Diggle's heather data set, where we discuss the results of simulation‐based maximum likelihood inference and the effect of specifying different reference Poisson models. |
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| Keywords: | Boolean model connected component Markov process disc process edge effects germ‐grain model quermass‐interaction process random closed set simulation‐based maximum likelihood spatial Markov property summary statistics |
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