On Weak Super Ricci Flow through Neckpinch

IF 0.9 3区 数学 Q2 MATHEMATICS
Sajjad Lakzian, M. Munn
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引用次数: 1

Abstract

Abstract In this article, we study the Ricci flow neckpinch in the context of metric measure spaces. We introduce the notion of a Ricci flow metric measure spacetime and of a weak (refined) super Ricci flow associated to convex cost functions (cost functions which are increasing convex functions of the distance function). Our definition of a weak super Ricci flow is based on the coupled contraction property for suitably defined diffusions on maximal diffusion subspaces. In our main theorem, we show that if a non-degenerate spherical neckpinch can be continued beyond the singular time by a smooth forward evolution then the corresponding Ricci flow metric measure spacetime through the singularity is a weak super Ricci flow for a (and therefore for all) convex cost functions if and only if the single point pinching phenomenon holds at singular times; i.e., if singularities form on a finite number of totally geodesic hypersurfaces of the form {x} × 𝕊n. We also show the spacetime is a refined weak super Ricci flow if and only if the flow is a smooth Ricci flow with possibly singular final time.
弱超里奇流在颈夹中的作用
摘要本文研究了度量度量空间中的Ricci流掐颈问题。我们引入了Ricci流度量时空的概念,以及与凸代价函数(代价函数是距离函数的递增凸函数)相关的弱(精炼)超Ricci流的概念。弱超里奇流的定义是基于极大扩散子空间上适当定义的扩散的耦合收缩性质。在我们的主要定理中,我们证明了如果一个非简并的球形掐颈可以通过平滑的前向演化延续到奇异时间以外,那么对应的里奇流量度量对于一个(因此对于所有)凸代价函数来说是一个弱超里奇流,当且仅当单点掐颈现象在奇异时间成立;即,如果奇点在有限个形式为{x} ×𝕊n的全测地线超曲面上形成。我们还表明,当且仅当流是光滑的里奇流且可能具有奇异的最终时间时,时空是一个精炼的弱超里奇流。
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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