Poisson limits for a clustering model of strauss

Roy Saunders; Gerald M. Funk

doi:10.2307/3213350

Abstract

In this article we present a limiting result for the random variable Yn(r) which arises in a clustering model of Strauss (1975). The result is that under some sparseness-of-points conditions the process {Yn(r): 0 ≦ r ≦ r∞} converges weakly to a non-homogeneous Poisson process {Y(r): 0 ≦ r ≦ r∞} when n → ∞. Simulation results are given to indicate the accuracy of the approximation when n is moderate and applications of the limiting result to tests for clustering are discussed.

Footnotes

This work has been partially supported by National Science Foundation Grant MCS 77–03582.

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Saunders, R. and Funk, G. M. (1976) Convergence of a process arising in a clustering model. Unpublished technical report.Google Scholar

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Poisson limits for a clustering model of strauss

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This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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Poisson limits for a clustering model of strauss

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