Separable spaces of continuous functions as Calkin algebras

We construct a reflexive Banach space $X_{\mathcal {D}}$ with an unconditional basis such that all spreading models admitted by normalized block sequences in $X_{\mathcal {D}}$ are uniformly equivalent to the unit vector basis of $\ell _1$ , yet every infinite-dimensional closed subspace of $X_{\mathcal {D}}$ fails the Lebesgue property. This is a new result in a program initiated by Odell in 2002 concerning the strong separation of asymptotic properties in Banach spaces.

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Separable spaces of continuous functions as Calkin algebras

Abstract: It is proved that for every compact metric space K K there exists a Banach space X X whose Calkin algebra L ( X ) / K ( X ) \mathcal {L}(X)/\mathcal {K}(X) is homomorphically isometric to C ( K ) C(K) . This is achieved by appropriately modifying the Bourgain-Delbaen L … Show more

Cited by 3 publications

References 37 publications

A Banach space with an infinite dimensional reflexive quotient algebraL(X)/SS(X)

A Banach space with an infinite dimensional reflexive quotient algebraL(X)/SS(X)

Uniqueness of algebra norm on quotients of the algebra of bounded operators on a Banach space

On the complete separation of unique $\ell _{1}$ spreading models and the Lebesgue property of Banach spaces

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