On Bezdek's conjecture for high-dimensional convex bodies with an aligned center of symmetry

Abstract

In 1999, K. Bezdek posed a conjecture stating that among all convex bodies in R3, ellipsoids and bodies of revolution are characterized by the fact that all their planar sections have an axis of reflection. We prove Bezdek's conjecture in arbitrary dimension n≥ 3, assuming only that sections passing through a fixed point have an axis of reflection, provided that the complementary invariant subspaces are all parallel to a fixed hyperplane. The result is proven in both orthogonal and affine settings.