On bodies in R5 with directly congruent projections or sections
Abstract
Let K and L be two convex bodies in R5 with countably many diameters, such that their projections onto all 4 dimensional subspaces containing one fixed diameter are directly congruent. We show that if these projections have no rotational symmetries, and the projections of K,L on certain 3 dimensional subspaces have no symmetries, then K= L up to a translation. We also prove the corresponding result for sections of star bodies.
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