Quasisymmetric Maps, Doubling Measures, and Geometry of Banach Spaces

Banach 空间的拟对称映射、加倍测度和几何

• 批准号: 0913474
• 负责人: Leonid Kovalev
• 金额: $ 3.52万
• 依托单位: Syracuse University
• 依托单位国家: 美国
• 项目类别: Standard Grant
• 财政年份: 2008
• 资助国家: 美国
• 起止时间: 2008-07-31 至 2010-05-31
• 项目状态: 已结题
• 来源: https://www.nsf.gov/awardsearch/showAward?AWD_ID=0913474&HistoricalAwards=false
• 关键词: Quasisymmetric; Maps; Doubling; Measures; Geometry

This project brings together topics from geometric analysis, harmonic analysis, and nonlinear functional analysis. The concept that connects the three areas is the notion of an accretive map, which can be thought of as a far-reaching generalization of an increasing function of one real variable. Some of the problems to be addressed within the project are the following: (1) bi-Lipschitz equivalence of Euclidean spaces with nonsmooth conformal metrics, in particular with metrics defined by Riesz potentials; (2) construction of quasisymmetric maps as vector-valued potentials of possibly non-doubling measures; (3) geometric properties of measures that satisfy a stronger, isotropic form of the doubling condition; (4) uniform continuity and Lipschitz continuity of approximate duality maps in Banach spaces; (5) variants of the Beurling-Ahlfors extension theorem for accretive maps and for complex gradients of real-valued functions. A fundamental problem in geometry and analysis is to find a parametrization of a given metric space (i.e., a set with a notion of distance) that makes it possible to visualize the space and to understand its structure. (One practical situation in which this issue arises is the construction of flat maps of the mammalian cerebral cortex.) The Riemann mapping theorem provides a parametrization of a surface that preserves all angles but that can significantly distort distances between points. This distortion of distances can sometimes be reduced by a carefully chosen additional deformation of the flat region onto which the surface is mapped. Our current understanding of such deformations of Euclidean spaces is far from complete even in two dimensions. The principal investigator is interested in using accretive maps to shed new light on this subject. Under an accretive map a space can be significantly stretched or shrunk at multiple locations, but it is never rotated by more than a predetermined amount.

这个专题汇集了几何分析、调和分析和非线性泛函分析的主题。连接这三个领域的概念是增生映射的概念，它可以被认为是一个真实的变量的增函数的深远推广。该项目中要解决的一些问题如下：（1）具有非光滑共形度量的欧氏空间的双Lipschitz等价，特别是与Riesz势定义的度量;（2）作为可能非加倍测度的向量值势的拟对称映射的构造;（3）满足加倍条件的更强的各向同性形式的测度的几何性质;（4）Banach空间中近似对偶映射的一致连续性和Lipschitz连续性，（5）增生映射和实值函数复梯度的Beurling-Ahlfors扩张定理的变形. 几何和分析中的一个基本问题是找到给定度量空间的参数化（即，具有距离概念的集合），使得可以可视化空间并理解其结构。(One这个问题出现的实际情况是构建哺乳动物大脑皮层的平面图。黎曼映射定理提供了一个参数化的表面，保持所有的角度，但可以显着扭曲点之间的距离。这种距离的变形有时可以通过对映射表面的平坦区域进行仔细选择的附加变形来减少。我们目前对欧几里得空间的这种变形的理解甚至在二维空间中也远未完成。首席研究员有兴趣使用增生映射来阐明这个问题。在增生映射下，空间可以在多个位置显著地拉伸或收缩，但它的旋转永远不会超过预定的量。