Conference on Complex Analysis and Geometry

复杂分析与几何会议

• 批准号: 1500302
• 负责人: Xianghong Gong
• 金额: $ 2.33万
• 依托单位: University of Wisconsin-Madison
• 依托单位国家: 美国
• 项目类别: Standard Grant
• 财政年份: 2015
• 资助国家: 美国
• 起止时间: 2015-01-01 至 2015-12-31
• 项目状态: 已结题
• 来源: https://www.nsf.gov/awardsearch/showAward?AWD_ID=1500302&HistoricalAwards=false
• 关键词: Conference; Complex; Analysis; Geometry

This award provides funding support to the Conference on Complex Analysis and Geometry to be held on the campus of the University of Wisconsin-Madison on March 27-29, 2015. The conference is devoted to recent developments in several complex variables in connections with fields of harmonic analysis, partial differential equations, conformal geometry, complex geometry, and dynamical systems. It will feature 10 main speakers who are leading mathematicians or junior researchers who have made significant contributions to the fields. There will also be 5 short-talks presented by young researchers who obtained their Ph.D. recently. The conference will create opportunity for exchange of new research results and new frontiers, which will benefit the recent Ph.D.'s and graduate students. The organizers encourage women and members of underrepresented minority groups to participate in the conference, and partial travel support will be provided. The conference will feature recent research results and methods in several complex variables. The main topics of the conference include the normal form theory in several complex variables and dynamical systems, extension property of biholomorphic mappings, d-bar-Neumann problems, the rigidity and classification of holomorphic mappings between balls, the local and global theory of CR manifolds, Levi-flat hypersurfaces and the lamination theory in complex projective spaces.

该奖项为2015年3月27日至29日在威斯康星大学麦迪逊分校校园举行的复杂分析和几何形状会议提供了资金支持。该会议致力于与谐波分析，部分微分方程，结合几何，复杂的几何形状，复杂的几何形状和动态系统的连接的几个复杂变量的最新发展。它将以10位领先的数学家或初级研究人员为领域做出重大贡献的主要发言人。获得博士学位的年轻研究人员还将有5个短词。最近。会议将为交换新的研究结果和新领域提供机会，这将使最近的博士学位和研究生受益。组织者鼓励妇女和代表性不足的少数群体的成员参加会议，并提供部分旅行支持。该会议将以几个复杂变量的最新研究结果和方法为特色。会议的主要主题包括几个复杂变量和动力学系统的正常形式理论，Biholomormormorphic映射的扩展特性，D-BAR-NEUMANN问题，球对球的刚性映射的刚度和分类，局部和全球cr歧管的局部和全球cr歧理论，LEVI-FLAT的levi-Flat Wastersersurface和Complect Phisplience spoce in Complect pojective spect in Complective Playsive Spoce。