AbstractThe following facts are shown: 1.(1) Each bounded hyperconvex space X is a hyperconvex hull of the subspace EX of X, whose elements are the endpoints of X.2.(2) The hyperconvex hull of Rn, supplied with the sum metric d1, is R2n-1, supplied with the maximum metric d∞
AbstractGeometrically, ultrametric spaces and hyperconvex metric spaces are sharply distinct. Howeve...
The Knaster-Kuratowski and Mazurkiewicz principle is characterized in hyperconvex metric spaces, lea...
We investigate how to glue hyperconvex (or injective) metric spaces such that the resulting space re...
Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction...
Abstract. We introduce the concept of λ-hyperconvexity in metric spaces, generalizing the classical ...
Over the last decades much progress has been made in the investigation of hyperconvexity in metric s...
It is well-known that every complete metric space can be isometrically em-bedded as a closed subset ...
W. A. Kirk has recently proved a constructive fixed point theorem for continuous mappings in compac...
The investigation of metric trees began with J. Tits in 1977. Recently we studied a more general not...
AbstractWe study a concept of hyperconvexity that is appropriate to the category of T0-quasi-metric ...
The notion of hyperconvexity is due to Aronszajn and Panitchpakdi (1956) who proved that a hyperconv...
The paper is devoted to some new results concerning the topology of hyperspaces of max-plus convex s...
The paper is devoted to some new results concerning the topology of hyperspaces of max-plus convex s...
For any partially ordered set equipped with its natural T0-quasi-metric (T0-ultra-quasi-metric), we ...
We investigate how to glue hyperconvex (or injective) metric spaces such that the resulting space r...
AbstractGeometrically, ultrametric spaces and hyperconvex metric spaces are sharply distinct. Howeve...
The Knaster-Kuratowski and Mazurkiewicz principle is characterized in hyperconvex metric spaces, lea...
We investigate how to glue hyperconvex (or injective) metric spaces such that the resulting space re...
Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction...
Abstract. We introduce the concept of λ-hyperconvexity in metric spaces, generalizing the classical ...
Over the last decades much progress has been made in the investigation of hyperconvexity in metric s...
It is well-known that every complete metric space can be isometrically em-bedded as a closed subset ...
W. A. Kirk has recently proved a constructive fixed point theorem for continuous mappings in compac...
The investigation of metric trees began with J. Tits in 1977. Recently we studied a more general not...
AbstractWe study a concept of hyperconvexity that is appropriate to the category of T0-quasi-metric ...
The notion of hyperconvexity is due to Aronszajn and Panitchpakdi (1956) who proved that a hyperconv...
The paper is devoted to some new results concerning the topology of hyperspaces of max-plus convex s...
The paper is devoted to some new results concerning the topology of hyperspaces of max-plus convex s...
For any partially ordered set equipped with its natural T0-quasi-metric (T0-ultra-quasi-metric), we ...
We investigate how to glue hyperconvex (or injective) metric spaces such that the resulting space r...
AbstractGeometrically, ultrametric spaces and hyperconvex metric spaces are sharply distinct. Howeve...
The Knaster-Kuratowski and Mazurkiewicz principle is characterized in hyperconvex metric spaces, lea...
We investigate how to glue hyperconvex (or injective) metric spaces such that the resulting space re...
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