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Absorption probabilities for Gaussian polytopes and regular spherical simplices

Published online by Cambridge University Press:  15 July 2020

Zakhar Kabluchko*
Affiliation:
Westfälische Wilhelms-Universität Münster
Dmitry Zaporozhets*
Affiliation:
St. Petersburg Department of Steklov Mathematical Institute
*
*Postal address: Orléans–Ring 10, 48149 Münster, Germany. Email: zakhar.kabluchko@uni-muenster.de
**Postal address: Fontanka 27, 191011 St. Petersburg, Russia.

Abstract

The Gaussian polytope $\mathcal P_{n,d}$ is the convex hull of n independent standard normally distributed points in $\mathbb{R}^d$ . We derive explicit expressions for the probability that $\mathcal P_{n,d}$ contains a fixed point $x\in\mathbb{R}^d$ as a function of the Euclidean norm of x, and the probability that $\mathcal P_{n,d}$ contains the point $\sigma X$ , where $\sigma\geq 0$ is constant and X is a standard normal vector independent of $\mathcal P_{n,d}$ . As a by-product, we also compute the expected number of k-faces and the expected volume of $\mathcal P_{n,d}$ , thus recovering the results of Affentranger and Schneider (Discr. and Comput. Geometry, 1992) and Efron (Biometrika, 1965), respectively. All formulas are in terms of the volumes of regular spherical simplices, which, in turn, can be expressed through the standard normal distribution function $\Phi(z)$ and its complex version $\Phi(iz)$ . The main tool used in the proofs is the conic version of the Crofton formula.

Type
Original Article
Copyright
© Applied Probability Trust 2020

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