The hyperspace of non-blockers of singletons, all the possible examples

Abstract

Given a metric continuum X, a nonempty proper closed subspace B of X, does not block a point p∈ X B provided that the union of all subcontinua of X containing p and contained in X B is a dense subset of X. The collection of all nonempty proper closed subspaces B of X such that B does not block any element of X B is denoted by NB(F1(X)). In this paper we prove that for each completely metrizable and separable space Z, there exists a continuum X such that Z is homeomorphic to NB(F1(X)). This answers a series of questions by Camargo, Capul\'in, Casta\=neda-Alvarado and Maya.

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