A limit theorem for Hausdorff approximation by random inscribed polytopes
Abstract
Approximate a smooth convex body K with nonvanishing curvature by the convex hull of n independent random points sampled from its boundary ∂ K. In case the points are distributed according to the optimal density, we prove that the rescaled approximation error in Hausdorff distance tends to a Gumbel distributed random variable. The proof is based on an asymptotic relation to covering properties of random geodesic balls on ∂ K and on a limit theorem due to Janson.
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