Lushness, numerical index 1 and the Daugavet property in rearrangement invariant spaces
Abstract
We show that for spaces with 1-unconditional bases lushness, the alternative Daugavet property and numerical index~1 are equivalent. In the class of rearrangement invariant (r.i.)\ sequence spaces the only examples of spaces with these properties are c0, 1 and ∞. The only lush r.i.\ separable function space on [0,1] is L1[0,1]; the same space is the only r.i.\ separable function space on [0,1] with the Daugavet property over the reals.
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