Path connectedness, local path connectedness and contractibility of Sc(X)

Abstract

The hyperspace of all nontrivial convergent sequences in a Hausdorff space X is denoted by Sc(X). This hyperspace is endowed with the Vietoris topology. In connection with a question and a problem by Garc\'ia-Ferreira, Ortiz-Castillo and Rojas-Hern\'andez, concerning conditions under which Sc(X) is pathwise connected, in the current paper we study the latter property and the contractibility of Sc(X). We present necessary conditions on a space X to obtain the path connectedness of Sc(X). We also provide some sufficient conditions on a space X to obtain such path connectedness. Further, we characterize the local path connectedness of Sc(X) in terms of that of X. We prove the contractibility of Sc(X) for a class of spaces and, finally, we study the connectedness of Whitney blocks and Whitney levels for Sc(X).