On polynomially integrable domains in Euclidean spaces

Abstract

Let D be a bounded domain in Rn, with smooth boundary. Denote VD(ω,t), \ ω ∈ Sn-1, t ∈ R, the Radon transform of the characteristic function D of the domain D, i.e., the (n-1)- dimensional volume of the intersection D with the hyperplane \x ∈ Rn: <ω,x>=t \. If the domain D is an ellipsoid, then the function VD is algebraic and if, in addition, the dimension n is odd, then V(ω,t) is a polynomial with respect to t. Whether odd-dimensional ellipsoids are the only bounded smooth domains with such a property? The article is devoted to partial verification and discussion of this question.