Sylvester's problem for beta-type distributions
Abstract
Consider d+2 i.i.d. random points X1,…, Xd+2 in Rd. In this note, we compute the probability that their convex hull is a simplex focusing on three specific distributional settings: (i) the distribution of X1 is multivariate standard normal; (ii) the density of X1 is proportional to (1-\|x\|2)β on the unit ball (the beta distribution); (iii) the density of X1 is proportional to (1+\|x\|2)-β (the beta prime distribution). In the Gaussian case, we show that this probability equals twice the sum of the solid angles of a regular (d+1)-dimensional simplex.
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