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学术报告八:许斌—Singular metrics of constant curvature on Riemann surfaces

时间:2019-04-16 作者: 点击数:

报告时间:2019年4月19日(星期五)14:30-15:30

报告地点:翡翠湖校区科教楼B座1701

报告人:许斌 副教授

工作单位:中国科学技术大学数学科学学院

举办单位:8827太阳集团官网

报告人简介:

许斌,1993年9月至1997年7月就读于中国科技大学数学系,1997年7月至1998年9月留校任教。1998年10月至2003年9月就读于东京大学数理科学研究科,获理学博士学位。

2003年10月至2004年12月于东京工业大学数学系从事博士后研究工作。

2005年1月至2005年6月于Johns Hopkins大学数学系从事博士后研究工作。

2005年7月至2006年2月于南开大学陈省身数学研究所访问。

2005年12月起至今于中国科技大学数学系任教。

报告简介:

Singular spherical, atandhyperbolic metricsare conformal metrics with constant curvature+1; 0and-1, respectively, and with isolated singularities on Riemann surfaces. The Gauss-Bonnet formula gives a necessary condition for the existence of such three kinds of metrics with prescribed conical singularities on compact Riemann surfaces, and it is also sufficient for both cone at and cone hyperbolic metrics. However, it is not the case for cone spherical metrics, whose existence has been an open problem over twenty years on compact Riemann surfaces. I will introduce the respectful audience some progress on this problem and some recent results on singular at metrics and hyperbolic metrics ones.

We obtained on compact Riemann surfaces a correspondence between meromorphic one-forms with simple poles and real periods and cone spherical metrics with monodromy in U(1), calledreducible metrics. As an application, we found a necessary and sufficient condition for cone angles of reducible metrics on the Riemann sphere and showed that the Friedrichs Laplacians of reducible metrics have eigenvalue 2.

We obtained on compact Riemann surfaces with positive genera a correspondence between irreducible metrics with cone angles in2_Z>1and line sub-bundles of rank two stable vector bundles. As an application, we found a new existence result about cone spherical metrics on compact Riemann surfaces with genera greater than one.

We classified the isolated singularities of at metrics whose areas satisfy the polynomial growth condition into three classes and proposed an open question about the existence of at metrics with such singularities prescribed on compact Riemann surfaces.

We showed that the singular hyperbolic metrics have Zariski dense monodromy groups in PSL(2;R)on compact Riemann surfaces and constructed a new class of hyperbolic metrics with infinitely many isolated singularities on the unit disk. The talk is based my joint works with Qing Chen, Xuemiao Chen, Yiran Cheng, Yu Feng, Si-en Gong, Bo Li, Jin Li, Lingguang Li, Hongyi Liu, Santai Qu, Jijian Song, Yingyi Wu, Xuwen Zhu.

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