Add to ORKGLet C(X) be the hyperspace of all subcontinua of a metric continuum X. Alejandro Illanes has proved that C(X) is a finite-dimensional Cartesian product if and only if X is an arc or a circle. In this paper we shall prove, using the inverse systems and limits, that if X is a non-metric rim-metrizable continuum and C(X) is a finite-dimensional Cartesian product, then X is a generalized arc or a generalized circle. It is also proved that if X is a non-metric continuum such that dim(X)<∞ and such that X has the cone = hyperspace property, then X is ageneralized arc, a generalized circle, or an indecomposable continuum such that each nondegenerate proper subcontinuum of X is a generalized arc
AbstractWe show that every hereditarily indecomposable subcontinuum of the inverse limit of copies o...
Let X be a non-metric continuum, and C(X) be the hyperspace of subcontinua of X. It is known that th...
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...
AbstractLet X be a continuum, let C(X) be the hyperspace of subcontinua of X. Answering questions by...
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...
A continuum is an arboroid if it is hereditarily unicoherent and arcwise connected. A metric arboroi...
AbstractFor a metric continuum X, let C(X) denote the hyperspace of subcontinua of X. The continuum ...
A continuum is an arboroid if it is hereditarily unicoherent and arcwise connected. A metric arboroi...
AbstractLet X be a (nonempty metric) continuum. By the hyperspace of X we mean C(X)={A:A is a nonemp...
Let X be a non-metric continuum, and C(X) the hyperspace of subcontinua of X. It is known that there...
Given a metric continuum X, we consider the hyperspace Cn(X) of all nonempty closed subsets of X wit...
The main purpose of this paper is to study the fixed point property of non-metric tree-like continua...
AbstractUsing nonblockers in hyperspaces (Illanes and Krupski (2011) [3]), we characterize some clas...
Let X be a metric continuum. Let C2(X) be the hyperspace of X consisting of all the nonempty and wit...
AbstractLet X be a continuum. Suppose that there exists a homeomorphism h:C(X)→cone(Z), where C(X) i...
AbstractWe show that every hereditarily indecomposable subcontinuum of the inverse limit of copies o...
Let X be a non-metric continuum, and C(X) be the hyperspace of subcontinua of X. It is known that th...
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...
AbstractLet X be a continuum, let C(X) be the hyperspace of subcontinua of X. Answering questions by...
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...
A continuum is an arboroid if it is hereditarily unicoherent and arcwise connected. A metric arboroi...
AbstractFor a metric continuum X, let C(X) denote the hyperspace of subcontinua of X. The continuum ...
A continuum is an arboroid if it is hereditarily unicoherent and arcwise connected. A metric arboroi...
AbstractLet X be a (nonempty metric) continuum. By the hyperspace of X we mean C(X)={A:A is a nonemp...
Let X be a non-metric continuum, and C(X) the hyperspace of subcontinua of X. It is known that there...
Given a metric continuum X, we consider the hyperspace Cn(X) of all nonempty closed subsets of X wit...
The main purpose of this paper is to study the fixed point property of non-metric tree-like continua...
AbstractUsing nonblockers in hyperspaces (Illanes and Krupski (2011) [3]), we characterize some clas...
Let X be a metric continuum. Let C2(X) be the hyperspace of X consisting of all the nonempty and wit...
AbstractLet X be a continuum. Suppose that there exists a homeomorphism h:C(X)→cone(Z), where C(X) i...
AbstractWe show that every hereditarily indecomposable subcontinuum of the inverse limit of copies o...
Let X be a non-metric continuum, and C(X) be the hyperspace of subcontinua of X. It is known that th...
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...