Convex Bodies Associated to Tensor Norms
Abstract
We determine when a convex body in Rd is the closed unit ball of a reasonable crossnorm on Rd1·sdl, d=d1·s dl. We call these convex bodies "tensorial bodies". We prove that, among them, the only ellipsoids are the closed unit balls of Hilbert tensor products of Euclidean spaces. It is also proved that linear isomorphisms on Rd1·s Rdl preserving decomposable vectors map tensorial bodies into tensorial bodies. This leads us to define a Banach-Mazur type distance between them, and to prove that there exists a Banach-Mazur type compactum of tensorial bodies.
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