Abstract
Let K be a compact Hausdorff topological space and E be a Banach space not containing l1. Recently N. J. Kalton, E. Saab and P. Saab ([5]) obtained the results that under the above assumptions the usual space C(K, E) has the Dieudonné property; i.e. each weakly completely continuous operator on C(K, E) is weakly compact. They use topological results concerning multivalued mappings in their proof. In this short note we furnish a new and simpler proof of that result without using topological results but only well known theorems of Bourgain ([2]) and Talagrand ([8]) on weak compactness of sets of Bochner integrable functions; i.e. results in vector measure theory. At the end of the paper we present some applications of the result to Banach spaces of compact operators.
Publisher
Cambridge University Press (CUP)
Reference8 articles.
1. Weak Cauchy Sequences in L 1 (E)
2. An averaging result forl 1-sequences and applications to weakly conditionally compact sets inL x 1
3. On the Dieudonné property for C(K, E), Proc;Kalton;Amer. Math. Soc.,1986
4. 4. Bello C. Fierro , On weakly compact and unconditionally converging operators in spaces of vector valued continuous functions, preprint.
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4 articles.
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