Currently displaying 1 – 2 of 2

Showing per page

Order by Relevance | Title | Year of publication

On subspaces of Banach spaces where every functional has a unique norm-preserving extension

Eve OjaMärt Põldvere — 1996

Studia Mathematica

Let X be a Banach space and Y a closed subspace. We obtain simple geometric characterizations of Phelps' property U for Y in X (that every continuous linear functional g ∈ Y* has a unique norm-preserving extension f ∈ X*), which do not use the dual space X*. This enables us to give an intrinsic geometric characterization of preduals of strictly convex spaces close to the Beauzamy-Maurey-Lima-Uttersrud criterion of smoothness. This also enables us to prove that the U-property of the subspace K(E,F)...

Johnson's projection, Kalton's property (M*), and M-ideals of compact operators

Olav NygaardMärt Põldvere — 2009

Studia Mathematica

Let X and Y be Banach spaces. We give a “non-separable” proof of the Kalton-Werner-Lima-Oja theorem that the subspace (X,X) of compact operators forms an M-ideal in the space (X,X) of all continuous linear operators from X to X if and only if X has Kalton’s property (M*) and the metric compact approximation property. Our proof is a quick consequence of two main results. First, we describe how Johnson’s projection P on (X,Y)* applies to f ∈ (X,Y)* when f is represented via a Borel (with respect to...

Page 1

Download Results (CSV)