Steinhaus conditions for convex polyhedra
Abstract
On a convex surface S, the antipodal map F associates to a point p the set of farthest points from p, with respect to the intrinsic metric. S is called a Steinhaus surface if F is a single-valued involution. We prove that any convex polyhedron has an open and dense set of points p admitting a unique antipode Fp, which in turn admits a unique antipode FFp, distinct from p. In particular, no convex polyhedron is Steinhaus.
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