近乎光滑度量空间上的Bakry-Émery条件

IF 0.9 3区数学 Q2 MATHEMATICS

Analysis and Geometry in Metric Spaces Pub Date : 2018-04-19 DOI:10.1515/agms-2018-0007

Shouhei Honda

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引用次数: 7

摘要

摘要本文给出了几乎光滑紧致度量度量空间满足Bakry-Émery条件BE(K, N)的一个充分条件。该充分条件适用于任意两个(不一定相同维数)闭点黎曼流形在其基点处的胶合空间。这告诉我们，即使在这种情况下，BE条件也严格弱于RCD条件，即使空间满足BE条件，且Cheeger能量诱导的距离与原始距离重合，局部维数也不是恒定的。特别地，胶合空间给出了第一个例子，在Bakry-Émery意义上，里奇界从下而上，其局部维数不是恒定的。并给出了该空间为RCD(K, N)空间的充分必要条件。

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Bakry-Émery Conditions on Almost Smooth Metric Measure Spaces

Abstract In this short note, we give a sufficient condition for almost smooth compact metric measure spaces to satisfy the Bakry-Émery condition BE(K, N). The sufficient condition is satisfied for the glued space of any two (not necessary same dimensional) closed pointed Riemannian manifolds at their base points. This tells us that the BE condition is strictly weaker than the RCD condition even in this setting, and that the local dimension is not constant even if the space satisfies the BE condition with the coincidence between the induced distance by the Cheeger energy and the original distance. In particular, the glued space gives a first example with a Ricci bound from below in the Bakry-Émery sense, whose local dimension is not constant. We also give a necessary and sufficient condition for such spaces to be RCD(K, N) spaces.

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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.