AbstractLet X be a continuum, let C(X) be the hyperspace of subcontinua of X. Answering questions by S.B. Nadler Jr, we prove that C(X) is a finite-dimensional product of two nondegenerate continua if and only if X is an arc or a circle. We also give an example of a nonlocally connected continuum Z such that C(Z) is homeomorphic to Z × I
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...
AbstractSuppose X is a locally connected continuum without free arcs. It is known that the hyperspac...
AbstractUsing nonblockers in hyperspaces (Illanes and Krupski (2011) [3]), we characterize some clas...
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...
Let C(X) be the hyperspace of all subcontinua of a metric continuum X. Alejandro Illanes has proved ...
A characterization of Cp(X), the family of subcontinua of X containing a fixed point of X, when X i...
A characterization of Cp(X), the family of subcontinua of X containing a fixed point of X, when X i...
AbstractFor a metric continuum X, let C(X) denote the hyperspace of subcontinua of X. The continuum ...
AbstractIn 1939 M. Wojdysławski showed that a continuum X is locally connected if and only if for ea...
AbstractIt is proved that if a continuum X contains an Ri-continuum for some iϵ{1,2,3}, then the hyp...
AbstractLet X be a continuum. Suppose that there exists a homeomorphism h:C(X)→cone(Z), where C(X) i...
The hyperspace C(X) of a continuum X is always arcwise connected. In [6], S.B.Nadler Jr. and J.Quinn...
AbstractIn 1979 Sam B. Nadler Jr, defined the Hyperspace Suspension of a continuum. We study a natur...
AbstractLet X be a (nonempty metric) continuum. By the hyperspace of X we mean C(X)={A:A is a nonemp...
AbstractLet X be a metric continuum. Let C(X) be the hyperespace of subcontinua of X . Given two fin...
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...
AbstractSuppose X is a locally connected continuum without free arcs. It is known that the hyperspac...
AbstractUsing nonblockers in hyperspaces (Illanes and Krupski (2011) [3]), we characterize some clas...
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...
Let C(X) be the hyperspace of all subcontinua of a metric continuum X. Alejandro Illanes has proved ...
A characterization of Cp(X), the family of subcontinua of X containing a fixed point of X, when X i...
A characterization of Cp(X), the family of subcontinua of X containing a fixed point of X, when X i...
AbstractFor a metric continuum X, let C(X) denote the hyperspace of subcontinua of X. The continuum ...
AbstractIn 1939 M. Wojdysławski showed that a continuum X is locally connected if and only if for ea...
AbstractIt is proved that if a continuum X contains an Ri-continuum for some iϵ{1,2,3}, then the hyp...
AbstractLet X be a continuum. Suppose that there exists a homeomorphism h:C(X)→cone(Z), where C(X) i...
The hyperspace C(X) of a continuum X is always arcwise connected. In [6], S.B.Nadler Jr. and J.Quinn...
AbstractIn 1979 Sam B. Nadler Jr, defined the Hyperspace Suspension of a continuum. We study a natur...
AbstractLet X be a (nonempty metric) continuum. By the hyperspace of X we mean C(X)={A:A is a nonemp...
AbstractLet X be a metric continuum. Let C(X) be the hyperespace of subcontinua of X . Given two fin...
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...
AbstractSuppose X is a locally connected continuum without free arcs. It is known that the hyperspac...
AbstractUsing nonblockers in hyperspaces (Illanes and Krupski (2011) [3]), we characterize some clas...
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