Grothendieck C(K)-spaces and the Josefson--Nissenzweig theorem
Abstract
For a compact space K, the Banach space C(K) is said to have the 1-Grothendieck property if every weak* convergent sequence μn\ n∈ω of functionals on C(K) such that μn∈1(K) for every n∈ω, is weakly convergent. Thus, the 1-Grothendieck property is a weakening of the standard Grothendieck property for Banach spaces of continuous functions. We observe that C(K) has the 1-Grothendieck property if and only if there does not exist any sequence of functionals μn\ n∈ω on C(K), with μn∈1(K) for every n∈ω, satisfying the conclusion of the classical Josefson--Nissenzweig theorem. We construct an example of a separable compact space K such that C(K) has the 1-Grothendieck property but it does not have the Grothendieck property. We also show that for many classical consistent examples of Efimov spaces K their Banach spaces C(K) do not have the 1-Grothendieck property.
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