Geometry of the unit ball of L(X,Y*)

Abstract

In this work we study the geometry of the unit ball of the space of operators L(X,Y*), by considering the projective tensor product Xπ Y as a predual. We prove that if an elementary tensor (rank one operator) of the form x0* y0* in the unit sphere S L(X,Y*) is a weak*-strongly extreme point of the unit ball, then x0* is weak*-strongly extreme point of unit ball of X* and y0* is weak*-strongly extreme point of the unit ball of Y*. We show that a similar conclusion holds if the rank one operator is a Namioka point (equivalently, point of weak*-weak continuity for the identity mapping) on the unit sphere of L(X,Y*). We also study extremal phenomenon in the unit ball of L(X,Y*)*. We partly solve the open problem, when does an elementary tensor, whose components are Namioka points is again a Namioka point? We show that if a point z∈ S L(X,Y*)* is a weak*-strongly extreme point of the unit ball, then z=x y for some weak*-strongly extreme points x∈ SX and y∈ SY, provided the space of compact operators, K(X,Y*) is separating for Xπ Y.