First contact distributions for spatial patterns: regularity and estimation
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Publication date
1999-01-01
Authors
Hansen, M.B.
Baddeley, A.J.
Gill, R.D.
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Document Type
Article
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Abstract
For applications in spatial statistics an important property of a random set X in Rk is its rst contact distribution This is the distribution of the distance from a xed point to the nearest point of X where distance is measured using scalar dilations of a xed test set B We show that if B is convex and contains a neighbourhood of the rst contact distribution function FB is absolutely continuous We give two explicit representations of FB and additional regularity conditions under which FB is continuously dierentiable A KaplanMeier estimator of FB is introduced and its basic properties examined
Keywords
Empty space function, convex test sets, randomclosed sets, stochastic geometry, spatial statistics, coarea formula, product limit extimates