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Results on the intersection of randomly located sets

Published online by Cambridge University Press:  14 July 2016

Franz Streit*
Affiliation:
University of Bern, Switzerland

Abstract

Randomly generated subsets of a point-set A0 in the k-dimensional Euclidean space Rk are investigated. Under suitable restrictions the probability is determined that a randomly located set which hits A0. is a subset of A0. Some results on the expected value of the measure and the surface area of the common intersection-set formed by n randomly located objects and A0 are generalized and derived for arbitrary dimension k.

Type
Short Communications
Copyright
Copyright © Applied Probability Trust 1975 

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References

Balanzat, M. (1942) Sur quelques formules de la géométrie intégrale des ensembles dans un espace à n dimensions. Portugaliae Math. 3, 8794.Google Scholar
Eggleston, H. G. (1963) Convexity. Cambridge University Press.Google Scholar
Germond, H. H. (1950) The circular coverage function. Rm-330, The Rand Corporation, Santa Monica, California.Google Scholar
Matheron, G. (1967) Eléments pour une Théorie des Milieux Poreux. Masson, Paris.Google Scholar
Morgenthaler, G. W. (1961) Some circular coverage problems. Biometrika 48, 313324.CrossRefGoogle Scholar
Rand Corporation (1952) Offset circle probabilities. R-234, The Rand Corporation, Santa Monica, California.Google Scholar
Streit, F. (1973) Mean-value formulae for a class of random sets. J. R. Statist. Soc. B 35, 437444.Google Scholar