Generating uniform random vectors over a simplex with implications to the volume of a certain polytope and to multivariate extremes

Generating uniform random vectors over a simplex with implications to the volume of a certain polytope and to multivariate extremes

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Article ID: iaor20119379
Volume: 189
Issue: 1
Start Page Number: 331
End Page Number: 342
Publication Date: Sep 2011
Journal: Annals of Operations Research
Authors: ,
Keywords: random number generators
Abstract:

A uniform random vector over a simplex is generated. An explicit expression for the first moment of its largest spacing is derived. The result is used in a proposed diagnostic tool which examines the validity of random number generators. It is then shown that the first moment of the largest uniform spacing is related to the dependence measure of random vectors following any extreme value distribution. The main result is proved by a geometric proof as well as by a probabilistic one.

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