A weak Hilbert space with few symmetries
classification
🧮 math.FA
keywords
hilbertoperatorspaceweakblockeverysubspacesbanach
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We construct a weak Hilbert Banach space such that for every block subspace $Y$ every bounded linear operator on Y is of the form D+S where S is a strictly singular operator and D is a diagonal operator. We show that this yields a weak Hilbert space whose block subspaces are not isomorphic to any of their proper subspaces.
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