Characterizes norm-attaining elements in L1(μ,Y) for strictly convex Y and Y=L1(ν), shows non-attaining cases when measures are non-atomic, and introduces a geometric property on Y ensuring optimal representations for Lipschitz-free spaces, C(K) on totally disconnected K, and c0(Γ), settling two ope
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Functions in $L_1(\mu,Y)$ with optimal tensor representations
Characterizes norm-attaining elements in L1(μ,Y) for strictly convex Y and Y=L1(ν), shows non-attaining cases when measures are non-atomic, and introduces a geometric property on Y ensuring optimal representations for Lipschitz-free spaces, C(K) on totally disconnected K, and c0(Γ), settling two ope