Bounds on some geometric functionals of high dimensional Brownian convex hulls and their inverse processes

Abstract

We prove two-sided bounds on the expected values of several geometric functionals of the convex hull of Brownian motion in Rn and their inverse processes. This extends some recent results of McRedmond and Xu (2017), Jovaleki\'c (2021), and Cygan, Sebek, and the first author (2023) from the plane to higher dimensions. Our main result shows that the average time required for the convex hull in Rn to attain unit volume is at most n[n]n!. The proof relies on a novel procedure that embeds an n-simplex of prescribed volume within the convex hull of the Brownian path run up to a certain stopping time. All of our bounds capture the correct order of asymptotic growth or decay in the dimension n.

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