Extremal structure of projective tensor products

Abstract

We prove that, given two Banach spaces X and Y and bounded, closed convex sets C⊂eq X and D⊂eq Y, if a nonzero element z∈ co(C D)⊂eq Xπ Y is a preserved extreme point then z=x0 y0 for some preserved extreme points x0∈ C and y0∈ D, whenever K(X,Y*) separates points of X π Y (in particular, whenever X or Y has the compact approximation property). Moreover, we prove that if x0∈ C and y0∈ D are weak-strongly exposed points then x0 y0 is weak-strongly exposed in co(C D) whenever x0 y0 has a neighbourhood system for the weak topology defined by compact operators. Furthermore, we find a Banach space X isomorphic to 2 with a weak-strongly exposed point x0∈ BX such that x0 x0 is not a weak-strongly exposed point of the unit ball of Xπ X.

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