Mareen Beermann, Matthias Reitzner
Published 2017-06-26Version 1
The convex hull $P_{n}$ of a Gaussian sample $X_{1},...,X_{n}$ in $R^{d}$ is a Gaussian polytope. We prove that the expected number of facets $E f_{d-1} (P_n)$ is monotonically increasing in $n$. Furthermore we prove this for random polytopes generated by uniformly distributed points in a $d$-dimensional ball.
The Duality of the Volumes and the Numbers of Vertices of Random Polytopes
Convex hulls of multidimensional random walks
Fragmentation processes and the convex hull of the Brownian motion in a disk
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