Quantitative Steinitz theorem and polarity

Abstract

The classical Steinitz theorem asserts that if the origin lies within the interior of the convex hull of a set S ⊂ Rd, then there are at most 2d points in S whose convex hull contains the origin within its interior. B\'ar\'any, Katchalski, and Pach established a quantitative version of Steinitz's theorem, showing that for a convex polytope Q in Rd containing the standard Euclidean unit ball Bd, there exist at most 2d vertices of Q whose convex hull Q' satisfies rBd ⊂ Q' with r ≥ d-2d. Recently, M\'arton Nasz\'odi and the author derived a polynomial bound on r. This paper aims to establish a bound on r based on the number of vertices of Q. In other words, we demonstrate an effective method to remove several points from the original set Q without significantly altering the bound on r. Specifically, if the number of vertices of Q scales linearly with the dimension, i.e., α d, then one can select 2d vertices such that r ≥ 15 α d. The proof relies on a polarity trick, which may be of independent interest: we demonstrate the existence of a point c in the interior of a convex polytope P ⊂ Rd such that the vertices of the polar polytope (P-c) sum up to zero.