Local Blaschke--Kakutani ellipsoid characterization and Banach's isometric subspaces problem

Abstract

We prove the following local version of Blaschke--Kakutani's characterization of ellipsoids: Let V be a finite-dimensional real vector space, B⊂ V a convex body with 0 in its interior, and 2 k< V an integer. Suppose that the body B is contained in a cylinder based on the cross-section B X for every k-plane X from a connected open set of linear k-planes in V. Then in the region of V swept by these k-planes B coincides with either an ellipsoid, or a cylinder over an ellipsoid, or a cylinder over a k-dimensional base. For k=2 and k=3 we obtain as a corollary a local solution to Banach's isometric subspaces problem: If all cross-sections of B by k-planes from a connected open set are linearly equivalent, then the same conclusion as above holds.

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