The topological complexity of a natural class of norms on Banach spaces

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Annals of Pure and Applied Logic 111 (1-2):3-13 (2001)
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Abstract

Let X be a non-reflexive Banach space such that X ∗ is separable. Let N be the set of all equivalent norms on X , equipped with the topology of uniform convergence on bounded subsets of X . We show that the subset Z of N consisting of Fréchet-differentiable norms whose dual norm is not strictly convex reduces any difference of analytic sets. It follows that Z is exactly a difference of analytic sets when N is equipped with the standard Effros–Borel structure. Our main lemma elucidates the topological structure of the norm-attaining linear forms when the norm of X is locally uniformly rotund

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10.1016/s0168-0072(01)00031-8

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