Add to ORKGCreative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. We are going to answer some open questions in the theory of hyperconvex metric spaces. We prove that in complete R-trees hyperconvex hulls are uniquely determined. Next we show that hyperconvexity of subsets of normed spaces implies their convexity if and only if the space under consideration is strictly convex. Moreover, we prove a Krein-Milman type theorem for R-trees. Finally, we discuss a general construction of certain complete metric spaces. We analyse its particular cases to investigate hyperconvexity via measures of noncompactness. 1
We investigate how to glue hyperconvex (or injective) metric spaces such that the resulting space re...
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AbstractThe following facts are shown: 1.(1) Each bounded hyperconvex space X is a hyperconvex hull ...
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The investigation of metric trees began with J. Tits in 1977. Recently we studied a more general not...
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In this survey we present an exposition of the development during the last decade of metric fixed po...
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We investigate how to glue hyperconvex (or injective) metric spaces such that the resulting space r...
AbstractThis paper is part of the general project of proof mining, developed by Kohlenbach. By "proo...
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It is well-known that every complete metric space can be isometrically em-bedded as a closed subset ...
Over the last decades much progress has been made in the investigation of hyperconvexity in metric s...
We investigate how to glue hyperconvex (or injective) metric spaces such that the resulting space re...
Known properties of "canonical connections" from database theory and of "closed sets" from statistic...
Let X be a geodesic metric space. Gromov proved that there exists k>0 such that if every sufficientl...
The notion of hyperconvexity is due to Aronszajn and Panitchpakdi (1956) who proved that a hyperconv...
AbstractThe following facts are shown: 1.(1) Each bounded hyperconvex space X is a hyperconvex hull ...
Abstract. We introduce the concept of λ-hyperconvexity in metric spaces, generalizing the classical ...
The investigation of metric trees began with J. Tits in 1977. Recently we studied a more general not...
An r-hyperconvex body is a set in the d-dimensional Euclidean space Ed that is the intersection of a...
In this survey we present an exposition of the development during the last decade of metric fixed po...
W. A. Kirk has recently proved a constructive fixed point theorem for continuous mappings in compac...
We investigate how to glue hyperconvex (or injective) metric spaces such that the resulting space r...
AbstractThis paper is part of the general project of proof mining, developed by Kohlenbach. By "proo...
AbstractThe concept of tight extensions of a metric space is introduced, the existence of an essenti...
It is well-known that every complete metric space can be isometrically em-bedded as a closed subset ...
Over the last decades much progress has been made in the investigation of hyperconvexity in metric s...
We investigate how to glue hyperconvex (or injective) metric spaces such that the resulting space re...
Known properties of "canonical connections" from database theory and of "closed sets" from statistic...
Let X be a geodesic metric space. Gromov proved that there exists k>0 such that if every sufficientl...