1997
DOI: 10.1007/s000390050018
|View full text |Cite
|
Sign up to set email alerts
|

Kirszbraun's Theorem and Metric Spaces of Bounded Curvature

Abstract: We generalize Kirszbraun's extension theorem for Lipschitz maps between (subsets of) euclidean spaces to metric spaces with upper or lower curvature bounds in the sense of A.D. Alexandrov. As a byproduct we develop new tools in the theory of tangent cones of these spaces and obtain new characterization results which may be of independent interest.

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
1
1
1
1

Citation Types

2
94
0

Year Published

1997
1997
2019
2019

Publication Types

Select...
5
4

Relationship

2
7

Authors

Journals

citations
Cited by 105 publications
(96 citation statements)
references
References 22 publications
2
94
0
Order By: Relevance
“…These results were previously proved in [36] via the method of random partitions (Lipschitz extension for spaces of bounded Nagata dimension was previously treated in [34] and only later it was shown in [52] that they admit a padded random partition and therefore the corresponding extension results are a special case of [36]). It also follows that if (X X ) has nonnegative curvature in the sense of Aleksandrov and (Y Y ) is a Hadamard space then (X Y ) 1, a result that has been previously proved in [35], as a special case of an elegant generalization of the classical Kirszbraun extension theorem [31]. be extended to a Y -valued 1/2-Hölder mapping defined on all of X ; this statement was previously known when Y is a Hilbert space due to the work of Minty [47].…”
Section: Under the Assumptions Of Theorem 111 If In Addition Y Is Amentioning
confidence: 59%
“…These results were previously proved in [36] via the method of random partitions (Lipschitz extension for spaces of bounded Nagata dimension was previously treated in [34] and only later it was shown in [52] that they admit a padded random partition and therefore the corresponding extension results are a special case of [36]). It also follows that if (X X ) has nonnegative curvature in the sense of Aleksandrov and (Y Y ) is a Hadamard space then (X Y ) 1, a result that has been previously proved in [35], as a special case of an elegant generalization of the classical Kirszbraun extension theorem [31]. be extended to a Y -valued 1/2-Hölder mapping defined on all of X ; this statement was previously known when Y is a Hilbert space due to the work of Minty [47].…”
Section: Under the Assumptions Of Theorem 111 If In Addition Y Is Amentioning
confidence: 59%
“…112] or [20,22]): Let G 1 (C) denote the union of all geodesics segments with endpoints in A. Notice that C is convex if and only if G 1 (C) = C. Recursively, for n ≥ 2 we set G n (C) = G 1 (G n−1 (C)).…”
Section: Corollary 44 Since It Is Easy To Construct Unbounded But Gmentioning
confidence: 99%
“…with convex metric. We refer to [23,24,25,28,29,30,33] for precise definitions and main properties. Here we focus our attention on Wasserstein spaces.…”
Section: ± Basic Properties Of Wasserstein Distancesmentioning
confidence: 99%
“…The following statement, adapted to the case of curvature 0 and ! 0 in the Alexandorov sense, is taken from [25].…”
Section: ± Barycenter Mapsmentioning
confidence: 99%