Projective tensor products where every element is norm-attaining
Abstract
In this paper we analyse when every element of Xπ Y attains its projective norm. We prove that this is the case if X is the dual of a subspace of a predual of an 1(I) space and Y is 1-complemented in its bidual under approximation properties assumptions. This result allows us to provide some new examples where X is a Lipschitz-free space. We also prove that the set of norm-attaining elements is dense in Xπ Y if, for instance, X=L1(μ) and Y is any Banach space, or if X has the metric π-property and Y is a dual space with the RNP.
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