A continuum is an arboroid if it is hereditarily unicoherent and arcwise connected. A metric arboroid is a dendroid. A generalized dendrite is a locally connected arboroid. Among other things, we shall prove that a locally connected continuum X is a generalized dendrite if and only if X has the fixed point property for continuous closed set-valued mappings
Tree-likeness of generalized continua is defined by means of inverse limits of locally finite trees ...
This dissertation consists of three subjects: T-closed sets, inverse limits with multivalued functio...
AbstractFor a continuum X we denote by C(X) the hyperspace of subcontinua of X, metrized by the Haus...
A continuum is an arboroid if it is hereditarily unicoherent and arcwise connected. A metric arboroi...
The main purpose of this paper is to study the fixed point property of non-metric tree-like continua...
The main purpose of this paper is to prove same theorems concerning nonmetric hereditarily locally c...
AbstractIn this paper we introduce the notion of property of Kelley hereditarily. Among other result...
The main purpose of this paper is to study the property of Kelley in nonmetric continua using invers...
A continuum means comp6lct, connected metric space. A hereditarily unicoherent and arcwise connected...
Let C(X) be the hyperspace of all subcontinua of a metric continuum X. Alejandro Illanes has proved ...
AbstractIt is proved that each hereditarily locally connected continuum is a continuous image of an ...
AbstractLet X be a continuum, let C(X) be the hyperspace of subcontinua of X. Answering questions by...
Let X be a non-metric continuum, and C(X) the hyperspace of subcontinua of X. It is known that there...
AbstractWe show that S4 spaces in the sense of Michael are dendrites. The proof involves functions w...
For a continuum X the hyperspace of nonempty closed subsets of X with at most n components is called...
Tree-likeness of generalized continua is defined by means of inverse limits of locally finite trees ...
This dissertation consists of three subjects: T-closed sets, inverse limits with multivalued functio...
AbstractFor a continuum X we denote by C(X) the hyperspace of subcontinua of X, metrized by the Haus...
A continuum is an arboroid if it is hereditarily unicoherent and arcwise connected. A metric arboroi...
The main purpose of this paper is to study the fixed point property of non-metric tree-like continua...
The main purpose of this paper is to prove same theorems concerning nonmetric hereditarily locally c...
AbstractIn this paper we introduce the notion of property of Kelley hereditarily. Among other result...
The main purpose of this paper is to study the property of Kelley in nonmetric continua using invers...
A continuum means comp6lct, connected metric space. A hereditarily unicoherent and arcwise connected...
Let C(X) be the hyperspace of all subcontinua of a metric continuum X. Alejandro Illanes has proved ...
AbstractIt is proved that each hereditarily locally connected continuum is a continuous image of an ...
AbstractLet X be a continuum, let C(X) be the hyperspace of subcontinua of X. Answering questions by...
Let X be a non-metric continuum, and C(X) the hyperspace of subcontinua of X. It is known that there...
AbstractWe show that S4 spaces in the sense of Michael are dendrites. The proof involves functions w...
For a continuum X the hyperspace of nonempty closed subsets of X with at most n components is called...
Tree-likeness of generalized continua is defined by means of inverse limits of locally finite trees ...
This dissertation consists of three subjects: T-closed sets, inverse limits with multivalued functio...
AbstractFor a continuum X we denote by C(X) the hyperspace of subcontinua of X, metrized by the Haus...
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