Minimal submanifolds in Riemannian geometry

黎曼几何中的最小子流形

• 批准号: RGPIN-2020-04225
• 负责人: Fraser, Ailana
• 金额: $ 3.13万
• 依托单位: University of British Columbia
• 依托单位国家: 加拿大
• 项目类别: Discovery Grants Program - Individual
• 财政年份: 2020
• 资助国家: 加拿大
• 起止时间: 2020-01-01 至 2021-12-31
• 项目状态: 已结题
• 来源: https://www.nserc-crsng.gc.ca/ase-oro/Details-Detailles_eng.asp?id=716848
• 关键词: Minimal; submanifolds; Riemannian; geometry

This research proposal deals with applications of analytic methods of minimal surface theory to geometric and topological problems. Minimization problems arise naturally in many branches of mathematics and science. For example, problems in navigation involve finding paths of least length, `geodesics', on the earth's surface. Minimal surfaces, which are two-dimensional analogs of geodesics, are minimizers or simply critical points of the area function, and arise naturally in material science; for example in fluid interface problems and elasticity problems. A simple physical example of a minimal surface is the soap film that forms after dipping a wire frame into a soap solution. By the laws of surface tension this soap film has the property that it is stable, that is it becomes larger under slight deformations. In modern geometry, minimal surfaces and submanifolds have had striking applications, for example to general relativity and low dimensional topology. Geometric optimization results for eigenvalues are important in application areas such as imaging and computer graphics. The objects under investigation in this proposal are critical points for geometric variational problems. Such objects can often, under certain geometric conditions, such as a curvature condition, be shown to satisfy very special properties. This information can then be used to obtain information about the whole geometric class under consideration. The results of this project are aimed at increasing our understanding of the fundamental relationships between the curvature, geometry and topology of spaces.

本研究计画探讨极小曲面理论的解析方法在几何与拓扑问题上的应用。极小化问题自然地出现在数学和科学的许多分支中。例如，导航问题涉及到在地球表面寻找最短的路径，即“测地线”。极小曲面是测地线的二维类似物，是面积函数的极小化器或简单的临界点，并且在材料科学中自然出现;例如在流体界面问题和弹性问题中。最小表面的一个简单的物理示例是将线框浸入肥皂溶液后形成的肥皂膜。根据表面张力定律，这种肥皂膜具有稳定的性质，即在轻微变形下会变大。在现代几何中，极小曲面和子流形有着惊人的应用，例如广义相对论和低维拓扑。特征值的几何优化结果在诸如成像和计算机图形学的应用领域中是重要的。在这个建议的调查对象是几何变分问题的临界点。在某些几何条件下，如曲率条件，这样的物体通常可以被证明满足非常特殊的性质。然后，该信息可以用于获得关于所考虑的整个几何类的信息。该项目的结果旨在增加我们对空间的曲率，几何和拓扑之间的基本关系的理解。