Functions in L1(μ,Y) with optimal tensor representations

Abstract

We study the existence and characterization of optimal tensor representations of elements in the space L1(μ,Y) of Bochner integrable functions. We completely describe the set of norm-attaining elements in two settings. First, when the Banach space Y is strictly convex, and second, when Y=L1(ν) and K= R. In both situations, our analysis yields the existence of non-norm-attaining tensors whenever the underlying measures are not purely atomic. Finally, we introduce a geometric property over Y ensuring that every element in L1(μ, Y) admits an optimal representation. In particular, this holds for Lipschitz-free spaces over complete scattered metric spaces, for C(K) spaces when K is a compact Hausdorff totally disconnected space, and for c0(Γ) where Γ is any index set. As a byproduct, we settle two open questions regarding projective norm-attainment.

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