Approximating a convex body by a polytope using the epsilon-net theorem
Abstract
Giving a joint generalization of a result of Brazitikos, Chasapis and Hioni and results of Giannopoulos and Milman, we prove that roughly d(1-)d1(1-)d points chosen uniformly and independently from a centered convex body K in Rd yield a polytope P for which K⊂eq P⊂eq K holds with large probability. The proof is simple, and relies on a combinatorial tool, the -net theorem.
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