Nakajima's problem: convex bodies of constant width and constant brightness
Abstract
For a convex body K⊂n, the kth projection function of K assigns to any k-dimensional linear subspace of n the k-volume of the orthogonal projection of K to that subspace. Let K and K0 be convex bodies in n, and let K0 be centrally symmetric and satisfy a weak regularity and curvature condition (which includes all K0 with K0 of class C2 with positive radii of curvature). Assume that K and K0 have proportional 1st projection functions (i.e., width functions) and proportional kth projection functions. For 2 k<(n+1)/2 and for k=3, n=5 we show that K and K0 are homothetic. In the special case where K0 is a Euclidean ball, we thus obtain characterizations of Euclidean balls as convex bodies of constant width and constant k-brightness.
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