Generalizing the Linearized Doubling approach, I: General theory and new minimal surfaces and self-shrinkers

IF 16.4 1区 化学 Q1 CHEMISTRY, MULTIDISCIPLINARY Accounts of Chemical Research Pub Date : 2020-01-13 DOI:10.4310/cjm.2023.v11.n2.a1
N. Kapouleas, Peter J. McGrath
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引用次数: 11

Abstract

In Part I of this article we generalize the Linearized Doubling (LD) approach, introduced in earlier work by NK, by proving a general theorem stating that if $\Sigma$ is a closed minimal surface embedded in a Riemannian three-manifold $(N,g)$ and its Jacobi operator has trivial kernel, then given a suitable family of LD solutions on $\Sigma$, a minimal surface $\breve{M}$ resembling two copies of $\Sigma$ joined by many small catenoidal bridges can be constructed by PDE gluing methods. (An LD solution $\varphi$ on $\Sigma$ is a singular solution of the Jacobi equation with logarithmic singularities which in the construction are replaced by catenoidal bridges.) We also determine the first nontrivial term in the expansion for the area $|\breve{M}|$ of $\breve{M}$ in terms of the sizes of its catenoidal bridges and confirm that it is negative; $|\breve{M}|<2 | \Sigma|$ follows. We demonstrate the applicability of the theorem by first constructing new doublings of the Clifford torus. We then construct in Part II families of LD solutions for general $(O(2)\times \mathbb{Z}_2)$-symmetric backgrounds $(\Sigma, N,g)$. Combining with the theorem in Part I this implies the construction of new minimal doublings for such backgrounds. (Constructions for general backgrounds remain open.) This generalizes our earlier work for $\Sigma=\mathbb{S}^2 \subset N=\mathbb{S}^3$ providing new constructions even in that case. In Part III, applying the results of Parts I and II -- appropriately modified for the catenoid and the critical catenoid -- we construct new self-shrinkers of the mean curvature flow via doubling the spherical self-shrinker or the Angenent torus, new complete embedded minimal surfaces of finite total curvature in the Euclidean three-space via doubling the catenoid, and new free boundary minimal surfaces in the unit ball via doubling the critical catenoid.
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推广线性化加倍方法,I:一般理论与新的极小曲面和自收缩器
在本文的第一部分中,我们推广了NK在早期工作中引入的线性加倍(LD)方法,通过证明一个一般定理,即如果$\Sigma$是嵌入在黎曼三流形$(N,g)$中的闭极小曲面,并且其Jacobi算子具有平凡核,则在$\Sigma$上给出了一个合适的LD解族,可以通过PDE胶合方法构建类似于由许多小的链状桥连接的$\Sigma$的两个副本的最小表面$\breve{M}$。($\Sigma$上的LD解$\varphi$是Jacobi方程的奇异解,该方程具有对数奇异性,在构造中被链状桥所取代$|\breve{M}|<2|\Sigma|$如下。我们首先构造了Clifford环面的新二重,证明了该定理的适用性。然后,我们在第二部分中构造了一般$(O(2)\times\mathbb的LD解族{Z}_2)$-对称背景$(\西格玛,N,g)$。结合第一部分中的定理,这意味着在这种背景下构造新的最小加倍。(一般背景的构造仍然是开放的。)这概括了我们早期对$\Sigma=\mathbb{S}^2 \subet N=\mathbb{S}^3$的工作,即使在这种情况下也提供了新的构造。在第三部分中,应用第一部分和第二部分的结果——对链状体和临界链状体进行了适当的修改——我们通过加倍球面自收缩器或Angenent环面来构造平均曲率流的新的自收缩器,通过加倍链状体来构造欧几里得三空间中有限总曲率的新的完全嵌入最小曲面,以及通过加倍临界连环面在单位球中形成新的自由边界最小表面。
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
Accounts of Chemical Research
Accounts of Chemical Research 化学-化学综合
CiteScore
31.40
自引率
1.10%
发文量
312
审稿时长
2 months
期刊介绍: Accounts of Chemical Research presents short, concise and critical articles offering easy-to-read overviews of basic research and applications in all areas of chemistry and biochemistry. These short reviews focus on research from the author’s own laboratory and are designed to teach the reader about a research project. In addition, Accounts of Chemical Research publishes commentaries that give an informed opinion on a current research problem. Special Issues online are devoted to a single topic of unusual activity and significance. Accounts of Chemical Research replaces the traditional article abstract with an article "Conspectus." These entries synopsize the research affording the reader a closer look at the content and significance of an article. Through this provision of a more detailed description of the article contents, the Conspectus enhances the article's discoverability by search engines and the exposure for the research.
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