所有的二维膨胀里奇孤子

IF 1 2区数学 Q1 MATHEMATICS

Journal of the London Mathematical Society-Second Series Pub Date : 2025-03-05 DOI:10.1112/jlms.70072

Luke T. Peachey, Peter M. Topping

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引用次数: 0

摘要

第二作者和H. Yin [Ars invenendi Analytica]。[DOI 10.15781/4x5c-9q97]开发了一个里奇流存在理论，该理论给出了一个完整的里奇流，从具有保形结构的表面开始，并以非原子氡测量作为体积测量。这导致了一大批新的膨胀里奇孤子的发现。在本文中，我们在此背景下使用了最近的唯一性理论，该理论也是由第二作者和H. Yin [Proc. Lond]开发的。数学。[j]，给出了曲面上所有展开的Ricci孤子的完整分类。在此过程中，我们证明了不受孤立子约束的存在论的一个逆命题：在一个时间区间（0,ε）$ (0,\varepsilon)$上的曲面上的每一个完全Ricci流在可容许的初始数据的范畴内都有一个t↓0$ t\向下0$的极限。这使得曲面成为里奇流的第一个非平凡的设置，在这个设置中，可以在最大时间间隔（0，T）$ (0，T)$的完整里奇流集合和一类诱导它们的初始数据之间给出双射。

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All two-dimensional expanding Ricci solitons

The second author and H. Yin [Ars Inveniendi Analytica. DOI 10.15781/4x5c-9q97] have developed a Ricci flow existence theory that gives a complete Ricci flow starting with a surface equipped with a conformal structure and a non-atomic Radon measure as a volume measure. This led to the discovery of a large array of new expanding Ricci solitons. In this paper, we use the recent uniqueness theory in this context, also developed by the second author and H. Yin [Proc. Lond. Math. Soc. 128:e12600 (2024)], to give a complete classification of all expanding Ricci solitons on surfaces. Along the way, we prove a converse to the existence theory that is not constrained to solitons: Every complete Ricci flow on a surface over a time interval $(0, ε)$ admits a $t ↓ 0$ limit within the class of admissible initial data. This makes surfaces the first non-trivial setting for Ricci flow in which a bijection can be given between the entire set of complete Ricci flows over maximal time intervals $(0, T)$ , and a class of initial data that induce them.

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来源期刊

Journal of the London Mathematical Society-Second Series 数学-数学

CiteScore

1.90

自引率

0.00%

发文量

186

审稿时长

6-12 weeks

期刊介绍： The Journal of the London Mathematical Society has been publishing leading research in a broad range of mathematical subject areas since 1926. The Journal welcomes papers on subjects of general interest that represent a significant advance in mathematical knowledge, as well as submissions that are deemed to stimulate new interest and research activity.