The hyperspace of non-cut subcontinua of graphs
Abstract
Given a continuum X, let C(X) be the hyperspace of all subcontinua of X. We consider the hyperspace NC*(X)=\A∈ C(X):X A is connected\. In this paper we prove that the only locally connected continua X for which NC*(X) is compact are the arcs and the simple closed curves. We also characterize the finite graphs G for which NC*(G) is connected.
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