Branching Geodesics of the Gromov-Hausdorff Distance

IF 0.9 3区 数学 Q2 MATHEMATICS
Yoshito Ishiki
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引用次数: 4

Abstract

Abstract In this paper, we first evaluate topological distributions of the sets of all doubling spaces, all uniformly disconnected spaces, and all uniformly perfect spaces in the space of all isometry classes of compact metric spaces equipped with the Gromov–Hausdorff distance.We then construct branching geodesics of the Gromov–Hausdorff distance continuously parameterized by the Hilbert cube, passing through or avoiding sets of all spaces satisfying some of the three properties shown above, and passing through the sets of all infinite-dimensional spaces and the set of all Cantor metric spaces. Our construction implies that for every pair of compact metric spaces, there exists a topological embedding of the Hilbert cube into the Gromov– Hausdorff space whose image contains the pair. From our results, we observe that the sets explained above are geodesic spaces and infinite-dimensional.
Gromov-Hausdorff距离的分支测地线
摘要本文首先计算了具有Gromov-Hausdorff距离的紧度量空间的所有等距类空间中的所有倍空间、所有一致不连通空间和所有一致完美空间集合的拓扑分布。然后,我们构造了Hilbert立方连续参数化的Gromov-Hausdorff距离的分支测地线,通过或避开满足上述三个性质的所有空间的集合,并通过所有无限维空间的集合和所有康托度量空间的集合。我们的构造表明,对于每一对紧化度量空间,Hilbert立方体都存在一个拓扑嵌入到Gromov - Hausdorff空间中,该空间的像包含了这对紧化度量空间。从我们的结果中,我们观察到上述解释的集合是测地线空间和无限维的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Analysis and Geometry in Metric Spaces
Analysis and Geometry in Metric Spaces Mathematics-Geometry and Topology
CiteScore
1.80
自引率
0.00%
发文量
8
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.
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