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
Abstract. We present a connected metric space that does not contain any nontrivial separable connect...
AbstractIt has been shown earlier by Mardešić that there exists an example of a locally connected Ha...
Abstract. In this paper, we prove that sequence-covering, pi-images of metric spaces and spaces with...
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]...
In order to extract geometric information from images, suitable operators must be constructed. After...
The theorem proven here is that every compact metric continuum is a continuous image of some heredit...
AbstractThere is a metric continuum in which some arc component is not a Borel set
AbstractIt is proved that if X is a (metric) continuum, if C(X) is the space of nonempty closed conn...
Any space homeomorphic to one of the standard subcontinua of the Stone-Čech remainder of the real ha...
AbstractA continuum M is almost arcwise connected if each pair of nonempty open subsets of M can be ...
We construct a metric continuum X such that the hyperspace of sub-continua, C(X), of X is not a cont...
AbstractLet X be a metric continuum and 2x (C(X)) denote the hyperspace of closed subsets (subcontin...
Throughout this paper a continuum means a compact connected metric space. Let X be a continuum. By C...
AbstractAs a generalization of developments of (developable) spaces, we introduce the notion of σ-st...
Abstract. We present a connected metric space that does not contain any nontrivial separable connect...
AbstractIt has been shown earlier by Mardešić that there exists an example of a locally connected Ha...
Abstract. In this paper, we prove that sequence-covering, pi-images of metric spaces and spaces with...
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]...
In order to extract geometric information from images, suitable operators must be constructed. After...
The theorem proven here is that every compact metric continuum is a continuous image of some heredit...
AbstractThere is a metric continuum in which some arc component is not a Borel set
AbstractIt is proved that if X is a (metric) continuum, if C(X) is the space of nonempty closed conn...
Any space homeomorphic to one of the standard subcontinua of the Stone-Čech remainder of the real ha...
AbstractA continuum M is almost arcwise connected if each pair of nonempty open subsets of M can be ...
We construct a metric continuum X such that the hyperspace of sub-continua, C(X), of X is not a cont...
AbstractLet X be a metric continuum and 2x (C(X)) denote the hyperspace of closed subsets (subcontin...
Throughout this paper a continuum means a compact connected metric space. Let X be a continuum. By C...
AbstractAs a generalization of developments of (developable) spaces, we introduce the notion of σ-st...
Abstract. We present a connected metric space that does not contain any nontrivial separable connect...
AbstractIt has been shown earlier by Mardešić that there exists an example of a locally connected Ha...
Abstract. In this paper, we prove that sequence-covering, pi-images of metric spaces and spaces with...
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