Banach spaces which always produce octahedral spaces of operators

Abstract

We characterise those Banach spaces X which satisfy that L(Y,X) is octahedral for every non-zero Banach space Y. They are those satisfying that, for every finite dimensional subspace Z, ∞ can be finitely-representable in a part of X kind of 1-orthogonal to Z. We also prove that L(Y,X) is octahedral for every Y if, and only if, L(pn,X) is octahedral for every n∈ N and 1<p<∞. Finally, we find examples of Banach spaces satisfying the above conditions like (M) spaces with octahedral norms or L1-preduals with the Daugavet property.

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