Unique determination of ellipsoids by their dual volumes and the moment problem

Abstract

Gusakova and Zaporozhets conjectured that ellipsoids in Rn are uniquely determined (up to an isometry) by their Steiner polynomials. Petrov and Tarasov confirmed this conjecture in R3. In this paper we solve the dual problem. We show that any ellipsoid in Rn centered at the origin is uniquely determined (up to an isometry) by its dual Steiner polynomial. To prove this result we reduce it to a problem of moments. As a by-product we give an alternative proof of the result of Petrov and Tarasov.