International Conference in Geometric Topology

几何拓扑国际会议

• 批准号: 1719746
• 负责人: Kenneth Bromberg
• 金额: $ 4.5万
• 依托单位: University of Utah
• 依托单位国家: 美国
• 项目类别: Standard Grant
• 财政年份: 2017
• 资助国家: 美国
• 起止时间: 2017-07-01 至 2018-06-30
• 项目状态: 已结题
• 来源: https://www.nsf.gov/awardsearch/showAward?AWD_ID=1719746&HistoricalAwards=false
• 关键词: International; Conference; Geometric; Topology

This award provides partial support for participation by U.S.-based mathematicians at an international conference in geometric topology to be held in Tuscany, Italy, during June 5-9, 2017. Topology is the study of the properties of spaces that do not depend on a way to measure distance; this conference focuses on those spaces that arise in geometric contexts such as surfaces and three-dimensional spaces (with the universe we live in being one example). The conference will feature both research talks on the latest developments in the area and three mini-courses designed for advanced graduate students and other early career mathematicians. The conference will provide an opportunity for those conducting cutting-edge research to present their results and a venue for discussion and collaboration among established researchers and junior mathematicians in the field. This award will allow a significant number of U.S.-based early-career mathematicians to attend, and a majority of this funding will support these mathematicians.The conference will focus primarily on low-dimensional hyperbolic geometry, and, more generally, geometric structures on manifolds. Mini-courses on character varieties and knot symmetries, arithmetic hyperbolic 3-manifolds, and renormalized volume will provide an introduction to several of the emerging trends in the field. This will be complemented by research talks from a distinguished international group of speakers. More information on the conference can be found at http://www.dm.unipi.it/~martelli/Cortona2017/Cortona.html

该奖项为美国参与提供部分支持- 2017年6月5日至9日，在意大利托斯卡纳举行的几何拓扑学国际会议上，拓扑学是对不依赖于测量距离的空间性质的研究;本次会议重点关注那些在几何背景下出现的空间，如表面和三维空间（我们生活的宇宙就是一个例子）。会议将包括关于该领域最新发展的研究会谈和为高级研究生和其他早期职业数学家设计的三门迷你课程。会议将为那些进行前沿研究的人提供一个展示他们的成果的机会，并为该领域的研究人员和初级数学家提供一个讨论和合作的场所。该奖项将允许大量的美国-该会议将主要关注低维双曲几何，以及更普遍的流形上的几何结构。关于特征多样性和纽结对称性，算术双曲3-流形和重整体积的迷你课程将介绍该领域的几个新兴趋势。这将由一个杰出的国际演讲者小组的研究讲座作为补充。 有关会议的更多信息，请访问http://www.dm.unipi.it/~martelli/Cortona2017/Cortona.html