A point in the interior of the convex hulls
Abstract
Steinitz's theorem states that if a point a ∈ int\,conv\, X for a set X ⊂ Rd, then X contains a subset Y of size at most 2d such that a ∈ int\,conv\,Y. The bound 2d is best possible here. We prove the colourful version of this theorem and characterize the cases when exactly 2d sets are needed.
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