On a variation of selective separability: S-separability

Abstract

A space X is M-separable (selectively separable) (Scheepers, 1999; Bella et al., 2009) if for every sequence (Yn) of dense subspaces of X there exists a sequence (Fn) such that for each n Fn is a finite subset of Yn and n∈ N Fn is dense in X. In this paper, we introduce and study a strengthening of M-separability situated between H- and M-separability, which we call S-separability: for every sequence (Yn) of dense subspaces of X there exists a sequence (Fn) such that for each n Fn is a finite subset of Yn and for each finite family F of nonempty open sets of X some n satisfies U Fn≠ for all U∈ F.

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