Uniqueness of Hahn--Banach extensions and some of its variants

Abstract

In this study, we analyze the various strengthening and weakening of the uniqueness of the Hahn--Banach extension. In addition, we consider the case in which Y is an ideal of X. In this context, we study the property-(U)/ (SU)/ (HB) and property-(k-U) for a subspace Y of a Banach space X. We obtain various new characterizations of these properties. We discuss various examples in the classical Banach spaces, where the aforementioned properties are satisfied and where they fail. It is observed that a hyperplane in c0 has property-(HB) if and only if it is an M-summand. Considering X, Z as Banach spaces and Y as a subspace of Z, by identifying (Xπ Y)* L(X,Y*), we observe that an isometry in L(X,Y*) has a unique norm-preserving extension over (Xπ Z) if Y has property-(SU) in Z. It is observed that a finite dimensional subspace Y of c0 has property-(k-U) in c0, and if Y is an ideal, then Y* is a k-strictly convex subspace of 1 for some natural k.