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1-Grothendieck $C(K)$ spaces

Published 6 Nov 2015 in math.FA | (1511.02202v1)

Abstract: A Banach space is said to be Grothendieck if weak and weak$*$ convergent sequences in the dual space coincide. This notion has been quantificated by H. Bendov\'{a}. She has proved that $\ell_\infty$ has the quantitative Grothendieck property, namely, it is 1-Grothendieck. Our aim is to show that Banach spaces from a certain wider class are 1-Grothendieck, precisely, $C(K)$ is 1-Grothendieck provided $K$ is a totally disconnected compact space such that its algebra of clopen subsets has the so called Subsequential completeness property.

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