English

Weakly compact approximation in Banach spaces

Functional Analysis 2007-05-23 v1

Abstract

The Banach space EE has the weakly compact approximation property (W.A.P. for short) if there is a constant C<C < \infty so that for any weakly compact set DED \subset E and ϵ>0\epsilon > 0 there is a weakly compact operator V:EEV: E \to E satisfying supxDxVx<ϵ\sup_{x\in D} || x - Vx || < \epsilon and VC|| V|| \leq C. We give several examples of Banach spaces both with and without this approximation property. Our main results demonstrate that the James-type spaces from a general class of quasi-reflexive spaces (which contains the classical James' space JJ) have the W.A.P, but that James' tree space JTJT fails to have the W.A.P. It is also shown that the dual JJ^* has the W.A.P. It follows that the Banach algebras W(J)W(J) and W(J)W(J^*), consisting of the weakly compact operators, have bounded left approximate identities. Among the other results we obtain a concrete Banach space YY so that YY fails to have the W.A.P., but YY has this approximation property without the uniform bound CC.

Keywords

Cite

@article{arxiv.math/0309405,
  title  = {Weakly compact approximation in Banach spaces},
  author = {Edward Odell and Hans-Olav Tylli},
  journal= {arXiv preprint arXiv:math/0309405},
  year   = {2007}
}

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39 pages, plain tex document