科研进展与学术交流报告会

中国科学院数学与系统科学研究院

科研进展与学术交流报告会

(第55期)

          

报告人一: 谢松晏 副研究员数学究所    

题目一奇异的全纯曲线    

摘 要我们构造了一些全纯曲线,其大范围的渐进分布具有任意性,例如产生所有可能的Nevanlinna流动形。这解决了Sibony的一个猜想。相关的思路还解决了万有全纯映照的极小增长率问题。    

          

报告人二 陈山大 助理研究员数学研究所    

题目二:Geometry of holomorphic mappings between Hermitian manifolds

摘要:In this talk, we will discuss geometry of holomorphic mappings between Hermitian manifolds, especially Khler manifolds. Firstly, we will review some basic properties of bounded symmetric domains. We will focus on three specific classes of holomorphic mappings between Hermitian manifolds. One of them is the class of holomorphic mappings between Hermitian manifolds preserving the p-th exterior power of the fundamental forms for some positive integer p. In this direction, I will explain some results in a recent joint work with Y. Yuan (Syracuse University). After that, we will discuss the geometry of holomorphic isometries from complex unit balls to bounded symmetric domains based on my previous work and my joint work with N. Mok (The University of Hong Kong). Finally, I will explain some rigidity results for proper holomorphic maps between Type-I classical domains.  

          

  间:2024.1.5(星期五), 10:40-12:00    

  点:南楼202会议室/腾讯会议534-8268-8299    

报告会视频    

[video:数学院2024.1.5]


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