Convex Hulls of L\'evy Processes

Abstract

Let X(t), t≥0, be a L\'evy process in Rd starting at the origin. We study the closed convex hull Zs of \X(t): 0≤ t≤ s\. In particular, we provide conditions for the integrability of the intrinsic volumes of the random set Zs and find explicit expressions for their means in the case of symmetric α-stable L\'evy processes. If the process is symmetric and each its one-dimensional projection is non-atomic, we establish that the origin a.s. belongs to the interior of Zs for all s>0. Limit theorems for the convex hull of L\'evy processes with normal and stable limits are also obtained.