@misc{10481/80130,
year = {2023},
month = {1},
url = {https://hdl.handle.net/10481/80130},
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, l(infinity) can be finitely-representable in a part of X kind of l(1)-orthogonal to Z. We also prove that L(Y, X) is octahedral for every Y if, and only if, L(l(n)(p), X) is octahedral for every n is an element of N and 1 < p < infinity. Finally, we find examples of Banach spaces satisfying the above conditions like Lip(0)(M) spaces with octahedral norms or L-1-preduals with the Daugavet property.},
organization = {Universidad de Granada/CBUA},
publisher = {Springer},
keywords = {Spaces of operators},
keywords = {Universally octahedral},
keywords = {Finite representability},
title = {Banach spaces which always produce octahedral spaces of operators},
doi = {10.1007/s13348-023-00394-9},
author = {Rueda Zoca, Abraham},
}