Conference on "Diophantine Geometry and Arithmetic Dynamics"

“丢番图几何与算术动力学”会议

• 批准号: 1203983
• 负责人: Victor Kolyvagin
• 金额: $ 5万
• 依托单位: CUNY Graduate School University Center
• 依托单位国家: 美国
• 项目类别: Standard Grant
• 财政年份: 2012
• 资助国家: 美国
• 起止时间: 2012-03-01 至 2013-02-28
• 项目状态: 已结题
• 来源: https://www.nsf.gov/awardsearch/showAward?AWD_ID=1203983&HistoricalAwards=false
• 关键词: Conference; Diophantine; Geometry; Arithmetic; Dynamics

There will be a broad conference on "Arithmetic geometry and dynamical systems," at the City University of New York during the period May 29- June 1, 2012. Information about the conference can be found at http://math.gc.cuny.edu/conferences/szpirofest.htmlThe conference will focus on the following three major themes and their interconnections: "unlikely intersections in algebraic groups," "non-abelian Chabouty method," and "arithmetic dynamics." Such a conference is particularly timely in view of the many recent breakthroughs in these subjects.Solving Diophantine equations, i.e., finding solutions in rational integers of polynomial equations is one of the earliest branches of mathematics. The CUNY conference on Diophantine geometry and dynamical systems will survey the most recent advances in this ancient subject. All the conference topics are central to number theory and extremely active subjects of current research. By bringing together leaders in these areas, the hope is to further inspire cross-fertilization among these closely connected, fundamental areas of mathematics. A major goal would be to encourage younger researchers and graduate students to attend, so as to introduce them to a very active field and to prepare them for further research.

将于2012年5月29日至6月1日在纽约城市大学举行一次关于“算术几何和动力系统”的广泛会议。有关会议的信息可以在http://math.gc.cuny.edu/conferences/szpirofest.htmlThe上找到，会议将集中在以下三个主要主题及其相互联系：“代数群中不太可能的交叉点”，“非阿贝尔Chabouty方法”和“算术动力学”。“鉴于这些问题最近取得了许多突破，举行这样一次会议是特别及时的。求多项式方程的有理整数解是数学最早的分支之一。纽约市立大学丢番图几何和动力系统会议将调查这一古老学科的最新进展。所有的会议主题都是数论的核心，也是当前研究中非常活跃的主题。通过将这些领域的领导者聚集在一起，希望能够进一步激发这些密切相关的数学基础领域之间的相互促进。一个主要目标是鼓励年轻的研究人员和研究生参加，以便向他们介绍一个非常活跃的领域，并为进一步的研究做好准备。