A Survey of Riemannian Contact Geometry

IF 0.5 Q3 MATHEMATICS

Complex Manifolds Pub Date : 2019-01-01 DOI:10.1515/coma-2019-0002

D. Blair

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引用次数: 11

Abstract

Abstract This survey is a presentation of the five lectures on Riemannian contact geometry that the author gave at the conference “RIEMain in Contact”, 18-22 June 2018 in Cagliari, Sardinia. The author was particularly pleased to be asked to give this presentation and appreciated the organizers’ kindness in dedicating the conference to him. Georges Reeb once made the comment that the mere existence of a contact form on a manifold should in some sense “tighten up” the manifold. The statement seemed quite pertinent for a conference that brought together both geometers and topologists working on contact manifolds, whether in terms of “tight” vs. “overtwisted” or whether an associated metric should have some positive curvature. The first section will lay down the basic definitions and examples of the subject of contact metric manifolds. The second section will be a continuation of the first discussing tangent sphere bundles, contact structures on 3-dimensional Lie groups and a brief treatment of submanifolds. Section III will be devoted to the curvature of contact metric manifolds. Section IV will discuss complex contact manifolds and some older style topology. Section V treats curvature functionals and Ricci solitons. A sixth section has been added giving a discussion of the question of whether a Riemannian metric g can be an associated metric for more than one contact structure; at the conference this was an addendum to the third lecture.

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黎曼接触几何综述

摘要本调查是作者在2018年6月18日至22日于撒丁岛卡利亚里举行的“接触中的RIEMain”会议上关于黎曼接触几何的五场讲座的介绍。提交人特别高兴被邀请作这次介绍，并感谢组织者将会议献给他的好意。Georges Reeb曾经评论说，仅仅是流形上接触形式的存在，就应该在某种意义上“收紧”流形。这一声明似乎与一次会议非常相关，该会议汇集了研究接触流形的几何学家和拓扑学家，无论是从“紧密”还是“过度扭曲”的角度，还是从相关度量是否应该具有一些正曲率的角度。第一节将阐述接触度量流形的基本定义和例子。第二节将是第一节讨论的切球丛、三维李群上的接触结构和子流形的简要处理的延续。第三节将专门讨论接触度量流形的曲率。第四节将讨论复杂的接触流形和一些老式拓扑。第五节讨论了曲率泛函和Ricci孤子。增加了第六部分，讨论了黎曼度量g是否可以是一个以上接触结构的相关度量的问题；在会议上，这是第三讲的附录。

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

Complex Manifolds MATHEMATICS-

CiteScore

1.30

自引率

20.00%

发文量

审稿时长

25 weeks

期刊介绍： Complex Manifolds is devoted to the publication of results on these and related topics: Hermitian geometry, Kähler and hyperkähler geometry Calabi-Yau metrics, PDE''s on complex manifolds Generalized complex geometry Deformations of complex structures Twistor theory Geometric flows on complex manifolds Almost complex geometry Quaternionic geometry Geometric theory of analytic functions Holomorphic dynamics Several complex variables Dolbeault cohomology CR geometry.