Extension, separation and isomorphic reverse isoperimetry

Naor, Assaf

doi:10.48550/arxiv.2112.11523

Cited by 2 publications

(2 citation statements)

References 153 publications

(274 reference statements)

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“…A lower bound on α(n) was obtained by Naor and Rabani in [58]. Another (very general) lower bound on Lipschitz extension moduli was recently proved by Naor [57]. Roughly speaking, he showed that in any finite-dimensional Banach space there are subsets with bad Lipschitz extension properties.…”

Section: Introductionmentioning

confidence: 96%

Absolute Lipschitz extendability and linear projection constants

Basso¹

2022

Studia Math.

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In this mostly expository article, we give streamlined proofs of several well-known Lipschitz extension theorems. We pay special attention to obtaining statements with explicit expressions for the Lipschitz extension constants. One of our main results is an explicit version of a very general Lipschitz extension theorem of Lang and Schlichenmaier. A special case of the theorem reads as follows. We prove that if X is a metric space and A ⊂ X satisfies the condition Nagata(n, c), then any 1-Lipschitz map f : A → Y to a Banach space Y admits a Lipschitz extension F : X → Y whose Lipschitz constant is at most 1000 • (c + 1) • log 2 (n + 2). By specifying to doubling metric spaces, this recovers an extension result of Lee and Naor. We also revisit another theorem of Lee and Naor by showing that if A ⊂ X consists of n points, then Lipschitz extensions as above exist with a Lipschitz constant of at most 600 • log n • (log log n) −1 .

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Section: Introductionmentioning

confidence: 96%

Absolute Lipschitz extendability and linear projection constants

Basso¹

2022

Studia Math.

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“…This is partly due to some applications in the context of Helly groups (see [9,26]). Moreover, they also naturally occur as target spaces in the context of Lipschitz extension problems (see [10,33,36]). Indeed, a metric space with a conical bicombing has many more properties that are usually associated to 'nonpositive curvature'.…”

Section: Introductionmentioning

confidence: 99%

A non-compact convex hull in general non-positive curvature

Basso¹,

Krifka²

2023

Preprint

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In this article, we are interested in metric spaces that satisfy a weak non-positive curvature condition in the sense that they admit a conical bicombing. Recently, these spaces have begun to be studied in more detail, and a rich theory is beginning to emerge. We contribute to this study by constructing a complete metric space X with a conical bicombing σ such that there is a finite subset of X whose closed σ-convex hull is non-compact. In CAT(0)-geometry, the analogous statement is an open question, i.e. it is not known whether closed convex hulls of finite subsets of complete CAT(0) space are compact or not. This question goes back to Gromov. Our result shows that to obtain a positive answer to Gromov's question, more than just the convexity properties of the metric must be used. The constructed space X has the additional property that there is an integer n such that it is an initial object in the category of convex hulls of n-point sets. Thus, roughly speaking, X can be thought of as the largest possible convex hull of n points.

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Extension, separation and isomorphic reverse isoperimetry

Cited by 2 publications

References 153 publications

Absolute Lipschitz extendability and linear projection constants

Absolute Lipschitz extendability and linear projection constants

A non-compact convex hull in general non-positive curvature

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