Dual Banach spaces with the ball-covering property

Abstract

We study ball-covering properties of dual Banach spaces and their connections with the geometry of predual unit balls. One of our main results shows that, for every separable Banach space X, the unit ball BX is a slicely countably determined set if and only if bc(X*)=1, where bc(·) is the ball-covering index introduced by A. J. Guirao, A. Lissitsin, and V. Montesinos. We obtain several sufficient conditions for the uniform ball-covering property in dual spaces, including duals of spaces with a K-unconditional basis for K<2, and duals of separable spaces whose unit ball is the closed convex hull of a set of uniformly strongly exposed points. The constant 2 is sharp: there is a space with a 2-unconditional basis whose dual fails the ball-covering property. Applications are given to spaces of operators and to Lipschitz spaces. In particular, L(Lp[0,1]) has the uniform ball-covering property for every 1<p<∞, which answers a question posed by Q. Bao, R. Liu, and J. Shen. As an application to Lipschitz spaces, we prove that Lip0(M) has the uniform ball-covering property whenever M is a separable complete ultrametric or Hölder metric space.

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