Relatively weakly open convex combinations of slices and scattered C*-Algebras

Abstract

We prove that given a locally compact Hausdorff space, K, and a compact C*-algebra, A, the C*-algebra C(K, A) satisfies that every convex combination of slices of the closed unit ball is relatively weakly open subset of the closed unit ball if and only if K is scattered and A is the c0-sum of finite-dimensional C*-algebras. We introduce and study Banach spaces which have property (P1), i. e. For every convex combination of slices C of the unit ball of a Banach space X and x∈ C there exists W relatively weakly open set containing x, such that W⊂eq C. In the setting of general C*-algebras we obtain a characterization of this property. Indeed, a C*-algebra has property (P1) if and only if is scattered with finite dimensional irreducible representations. Some stability results for Banach spaces satisfying property (P1) are also given. As a consequence of these results we prove that a real L1-predual Banach space contains no isomorphic copy of 1 if and only if it has property (P1).