A study on various generalizations of Generalized centers (GC) in Banach spaces
Abstract
In [ Generalized centers of finite sets in Banach spaces, Acta Math. Univ. Comenian. (N.S.) 66(1) (1997), 83--115], Vesel\'y developed the idea of generalized centers for finite sets in Banach spaces. In this work, we explore the concept of restricted F-center property for a triplet (X,Y,F(X)), where Y is a subspace of a Banach space X and F(X) is the family of finite subsets of X. In addition, we generalize the analysis to include all closed, bounded subsets of X. Similar to how Lindenstrauss characterized n.2.I.P., we characterize n.X.I.P.. So, it is possible to figure out that Y has n.X.I.P. in X for all natural numbers n if and only if radY(F)=radX(F) for all finite subsets F of Y. It then turns out that, for all continuous, monotone functions f, the f-radii viz. radYf(F),radXf(F) are same whenever the generalized radii viz. radY(F), radX(F) are also same, for all finite subsets F of Y. We establish a variety of characterizations of central subspaces of Banach spaces. With reference to an appropriate subfamily of closed and bounded subsets, it appears that a number of function spaces and subspaces exhibit the restricted weighted Chebyshev center property.
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