On polynomially integrable convex bodies
Abstract
An infinitely smooth convex body in Rn is called polynomially integrable of degree N if its parallel section functions are polynomials of degree N. We prove that the only smooth convex bodies with this property in odd dimensions are ellipsoids, if N n-1. This is in contrast with the case of even dimensions and the case of odd dimensions with N<n-1, where such bodies do not exist, as it was recently shown by Agranovsky.
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