对称分集的恒定畸变嵌入

IF 0.9 3区数学 Q2 MATHEMATICS

Analysis and Geometry in Metric Spaces Pub Date : 2016-04-07 DOI:10.1515/agms-2016-0016

David Bryant, P. Tupper

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引用次数: 8

摘要

多样性就像度量空间，除了每个有限的子集，而不是每一对点，被赋予一个值。正如有一个将有限度量空间嵌入到L1中的最小失真理论一样，也有一个类似的，但尚未开发的理论，将有限多样性嵌入到L1空间的多样性模拟中。在度量的情况下，众所周知，n点度量空间可以以o (log n)失真嵌入到L1中。对于多样性，最优失真是未知的。在这里，我们建立了一个令人惊讶的结果，即对称多样性，其中分配给一个集合的多样性(值)仅取决于其基数，可以在恒定失真的情况下嵌入到L1中。

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Constant Distortion Embeddings of Symmetric Diversities

Abstract Diversities are like metric spaces, except that every finite subset, instead of just every pair of points, is assigned a value. Just as there is a theory of minimal distortion embeddings of fiite metric spaces into L1, there is a similar, yet undeveloped, theory for embedding finite diversities into the diversity analogue of L1 spaces. In the metric case, it iswell known that an n-point metric space can be embedded into L1 withO(log n) distortion. For diversities, the optimal distortion is unknown. Here, we establish the surprising result that symmetric diversities, those in which the diversity (value) assigned to a set depends only on its cardinality, can be embedded in L1 with constant distortion.

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来源期刊

Analysis and Geometry in Metric Spaces Mathematics-Geometry and Topology

CiteScore

1.80

自引率

0.00%

发文量

审稿时长

16 weeks

期刊介绍： Analysis and Geometry in Metric Spaces is an open access electronic journal that publishes cutting-edge research on analytical and geometrical problems in metric spaces and applications. We strive to present a forum where all aspects of these problems can be discussed. AGMS is devoted to the publication of results on these and related topics: Geometric inequalities in metric spaces, Geometric measure theory and variational problems in metric spaces, Analytic and geometric problems in metric measure spaces, probability spaces, and manifolds with density, Analytic and geometric problems in sub-riemannian manifolds, Carnot groups, and pseudo-hermitian manifolds. Geometric control theory, Curvature in metric and length spaces, Geometric group theory, Harmonic Analysis. Potential theory, Mass transportation problems, Quasiconformal and quasiregular mappings. Quasiconformal geometry, PDEs associated to analytic and geometric problems in metric spaces.