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【学术报告】Transcendence Theory over Function Fields on Quotients of Bounded Symmetric Domains

  • 主讲人: Ngaiming Mok (The University of Hong Kong)
  • 时间:周四20:00-21:00,2021-04-08
  • 地点:online

Beijing-Saint Petersburg Mathematics Colloquium (online)

摘要(Abstract) 

Finite-volume quotients of bounded symmetric domains Ω, which are naturally quasi-projective varieties, are objects of immense interest to Several Complex Variables, Algebraic Geometry, Arithmetic Geometry and Number Theory, and an important topic revolves around functional transcendence in relation to universal covering maps of such varieties. While a lot has already been achieved in the case of Shimura varieties by means of methods of Model Theory, Hodge Theory and Complex Differential Geometry, techniques for the general case of not necessarily arithmetic quotients Ω/Γ =: XΓ have just begun to be developed. For instance, Ax-type problems for subvarieties of products of arbitrary compact Riemann surfaces of genus ≥ 2 have hitherto been intractable by existing methods. We will explain how uniformization theorems for bi-algebraic varieties can be proven by analytic methods involving the Poincar´e-Lelong equation in the cocompact case (joint work with S.-T. Chan), generalizing in the absence of the  emisimplicity theorem of Andr´e-Deligne for monodromy groups (proven for arithmetic lattices). Klingler-Ullmo-Yafaev (2016) resolved the hyperbolic Ax-Lindemann Conjecture for Shimura varieties in the affirmative ascertaining that the Zariski closure of the image π(S) of an algebraic subset S ⊂ Ω under the universal covering map π : Ω → XΓ is totally geodesic. I will explain how the arithmeticity condition can be dropped in the cocompact case by a completely different proof using foliation theory, Chow schemes, partial Cayley transforms and K¨ahler geometry.

主讲人简介(Bio)

莫毅明教授为香港大学明德教授与讲座教授,自1999年始兼任数学研究所所长。莫毅明1980年在斯坦福大学获得数学系哲学博士学位,旋即在普林斯顿大学开展其职业生涯,历任美国哥伦比亚大学正教授与法国巴黎大学(奥赛)正教授,1994年回香港任职香港大学数学系讲座教授。1984年莫毅明获美国斯隆研究基金,1985年获美国总统年青研究人员奖,1998年获香港裘槎优秀科研者奖,2007年获国家自然科学奖二等奖, 2009年获美国数学会伯格曼奖(Bergman Prize).莫毅明为美国数学会会士。莫毅明自1992年起担任“数学年鉴(Mathematische Annalen)”编辑委员,并于2002至2014年期间担任 “数学发明(Inventiones Mathematicae)”编辑委员。莫毅明1994年获邀在苏黎世于国际数学大会(ICM)做学术演讲,并获委任为ICM 2010(海得拉巴)的菲尔兹奖选委。2015莫毅明获选中国科学院院士与香港科学院院士。

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