Quadratic Conorm and extremally rich JB*-triples

Abstract

We introduce and study the class of extremally rich JB*-triples. We establish new results to determine the distance from an element a in an extremally rich JB*-triple E to the set ∂e (E1) of all extreme points of the closed unit ball of E. More concretely, we prove that dist (a,∂e (E1)) = \ 1, \|a\|-1\, for every a∈ E which is not Brown-Pedersen quasi-invertible. As a consequence, we determine the form of the λ-function of Aron and Lohman on the open unit ball of an extremally rich JB*-triple E, by showing that λ (a)= 12 for every non-BP quasi-invertible element a in the open unit ball of E. We also prove that for an extremally rich JB*-triple E, the quadratic connorm γq(.) is continuous at a point a∈ E if, and only if, either a is not von Neumann regular (i.e. γq(a)=0) or a is Brown-Pedersen quasi-invertible.