Counterexamples Related to Rotations of Shadows of Convex Bodies
Abstract
We construct examples of two convex bodies K,L in Rn, such that every projection of K onto a (n-1)-dimensional subspace can be rotated to be contained in the corresponding projection of L, but K itself cannot be rotated to be contained in L. We also find necessary conditions on K and L to ensure that K can be rotated to be contained in L if all the (n-1)-dimensional projections have this property.
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