The π-property of a Banach space along a filter
Abstract
We examine the analyticity of the class of separable Banach spaces possessing the π-property, defined in terms of convergence along a filter. Our results establish that this class is 13 whenever the underlying filter is analytic (as a subset of the Cantor set ). Furthermore, we demonstrate that if the filter is countably generated, the class of such spaces is 12 with respect to any admissible Polish topology on the family of closed subspaces of C().
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