On the monotonicity of the moments of volumes of random simplices
Abstract
In a d-dimensional convex body K random points X0, …, Xd are chosen. Their convex hull is a random simplex. The expected volume of a random simplex is monotone under set inclusion, if K ⊂ L implies that the expected volume of a random simplex in K is smaller than the expected volume of a random simplex in L. Continuing work of Rademacher, it is shown that moments of the volume of random simplices are in general not monotone under set inclusion.
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