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An infinitely smooth symmetric convex body K⊂Rd is called k-separably integrable, 1≤k<d, if its k-dimensional isotropic volume function VK, H (t) =Hd (x∈K: dist (x, H⊥) ≤t) can be written as a finite sum of products in which the dependence on H∈Grk (Rd) and t∈R is separated. In this paper, we will obtain a complete classification of such bodies. Namely, we will prove that if d−k is even, then K is an ellipsoid, and if d−k is odd, then K is a Euclidean ball. This generalizes the recent classification of polynomially integrable convex bodies in the symmetric case.
Yaskin et al. (Tue,) studied this question.