AbstractLet I be the unit interval. We show that the metric connectivity images and metric extendable images of Im, when m>1, are exactly the separable metric spaces which have a dense arc-component. This contrasts strongly with the metric almost continuous images of Im
AbstractHomogeneous arcwise connected metric continua are shown to, in effect, be arcwise connected ...
The main purpose of this paper is to characterize the continuous images of arcs by their images of t...
AbstractIt is known that rim-finite and, more generally, hereditarily locally connected continua are...
AbstractLet I be the unit interval. We show that the metric connectivity images and metric extendabl...
AbstractK.R. Kellum has proved that a continuum is an almost continuous image of the interval [0, 1]...
AbstractTheorems about the nonexistence of continuous surjections between continua and related resul...
AbstractA continuum M is almost arcwise connected if each pair of nonempty open subsets of M can be ...
Abstract. We present a connected metric space that does not contain any nontrivial separable connect...
The theorem proven here is that every compact metric continuum is a continuous image of some heredit...
Any space homeomorphic to one of the standard subcontinua of the Stone-Čech remainder of the real ha...
AbstractThere is a metric continuum in which every arc component is not a Borel set
AbstractWe give a necessary and sufficient condition that a 2nd countable space be the almost contin...
AbstractIn this note we will construct, under the assumption that union of less than continuum many ...
AbstractOne-to-one continuous images of the reals play an important role in dynamical systems as all...
A continuum is a compact connected metric space. Amap is a continuous function. For a continuum X wi...
AbstractHomogeneous arcwise connected metric continua are shown to, in effect, be arcwise connected ...
The main purpose of this paper is to characterize the continuous images of arcs by their images of t...
AbstractIt is known that rim-finite and, more generally, hereditarily locally connected continua are...
AbstractLet I be the unit interval. We show that the metric connectivity images and metric extendabl...
AbstractK.R. Kellum has proved that a continuum is an almost continuous image of the interval [0, 1]...
AbstractTheorems about the nonexistence of continuous surjections between continua and related resul...
AbstractA continuum M is almost arcwise connected if each pair of nonempty open subsets of M can be ...
Abstract. We present a connected metric space that does not contain any nontrivial separable connect...
The theorem proven here is that every compact metric continuum is a continuous image of some heredit...
Any space homeomorphic to one of the standard subcontinua of the Stone-Čech remainder of the real ha...
AbstractThere is a metric continuum in which every arc component is not a Borel set
AbstractWe give a necessary and sufficient condition that a 2nd countable space be the almost contin...
AbstractIn this note we will construct, under the assumption that union of less than continuum many ...
AbstractOne-to-one continuous images of the reals play an important role in dynamical systems as all...
A continuum is a compact connected metric space. Amap is a continuous function. For a continuum X wi...
AbstractHomogeneous arcwise connected metric continua are shown to, in effect, be arcwise connected ...
The main purpose of this paper is to characterize the continuous images of arcs by their images of t...
AbstractIt is known that rim-finite and, more generally, hereditarily locally connected continua are...
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