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Positive hulls of random walks and bridges
Published 12 Apr 2021 in math.PR and math.MG | (2104.05542v2)
Abstract: We study random convex cones defned as positive hulls of $d$-dimensional random walks and bridges. We compute expectations of various geometric functionals of these cones such as the number of $k$-dimensional faces and the sums of conic quermassintegrals of their $k$-dimensional faces. These expectations are expressed in terms of Stirling numbers of both kinds and their $B$-analogues.
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