On Borsuk-Ulam theorems and convex sets
Abstract
The Intermediate Value Theorem is used to give an elementary proof of a Borsuk-Ulam theorem of Adams, Bush and Frick that, if f: S1 R2k+1 is a continuous function on the unit circle S1 in C such that f(-z)=-f(z) for all z∈ S1, then there is a finite subset X of S1 of diameter at most π -π /(2k+1) (in the standard metric in which the circle has circumference of length 2π) such the convex hull of f(X) contains 0∈ R2k+1.
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