The symmetric Radon-Nikod\'ym property for tensor norms

Abstract

We introduce the symmetric-Radon-Nikod\'ym property (sRN property) for finitely generated s-tensor norms β of order n and prove a Lewis type theorem for s-tensor norms with this property. As a consequence, if β is a projective s-tensor norm with the sRN property, then for every Asplund space E, the canonical map βn,s E' (β'n,s E )' is a metric surjection. This can be rephrased as the isometric isomorphism Qmin(E) = Q(E) for certain polynomial ideal . We also relate the sRN property of an s-tensor norm with the Asplund or Radon-Nikod\'ym properties of different tensor products. Similar results for full tensor products are also given. As an application, results concerning the ideal of n-homogeneous extendible polynomials are obtained, as well as a new proof of the well known isometric isomorphism between nuclear and integral polynomials on Asplund spaces.