Weakly compact approximation in Banach spaces

Abstract

The Banach space E has the weakly compact approximation property (W.A.P. for short) if there is a constant C < ∞ so that for any weakly compact set D ⊂ E and ε > 0 there is a weakly compact operator V: E E satisfying x∈ D || x - Vx || < ε and || V|| ≤ 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 J) have the W.A.P, but that James' tree space JT fails to have the W.A.P. It is also shown that the dual J* has the W.A.P. It follows that the Banach algebras W(J) and W(J*), consisting of the weakly compact operators, have bounded left approximate identities. Among the other results we obtain a concrete Banach space Y so that Y fails to have the W.A.P., but Y has this approximation property without the uniform bound C.

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