Algebraic Geometry Day
主讲人: Chenyang Xu (BICMR)
活动时间: 从 2013-03-21 00:00 到 00:00
场地: BICMR, 甲乙丙楼 82J04
Algebraic Geometry Day
Time: March 21, 2013
Address: BICMR, 甲乙丙楼 82J04
Organizer: Chenyang Xu
Schedule
9:30-10:30
Baohua Fu: Uniqueness of equivariant compactifications of C^n by a Fano manifold of Picard number one
coffee break
11:00-noon
Brion: Structure of algebraic monoids
Lunch break
14:30-15:30
Cascini: Topological bounds in birational geometry
Coffee Break
16:00-17:00
Looijenga: Meromorphic automorphic forms in algebraic geometry
17:30 banquet
Program
Michael Brion
Title: Structure of algebraic monoids
Abstract: An algebraic monoid is an algebraic variety M equipped with an associative composition law which has a neutral element. Then the invertible elements form an algebraic group G, open in M; we may view M as a partial compactification of G, equivariant with respect to the action of G x G by left and right multiplication. In this talk, we will present a characterization of monoids among such compactifications, and derive some consequences on the structure of algebraic monoids.
Paolo Cascini
Title: Topological bounds in birational geometry.
Abstract: Many birational invariants of a smooth projective three-fold, such as the number and the singularities of its minimal models, are related with the topology of the underlying manifold. Using these methods, I will discuss some recent progress towards a question by Hirzebruch on the Chern numbers of a smooth projective threefold.
Baohua Fu
Title: Uniqueness of equivariant compactifications of C^n by a Fano manifold of Picard number one
Abstract: Let X be an n-dimensional Fano manifold of Picard number 1. We study how many different ways X can compactify the complex vector group C^n equivariantly. Hassett and Tschinkel showed that when X = P^n with n \geq 2, there are many distinct ways that X can be realized as equivariant compactifications of C^n. Our result says that projective space is an exception: among Fano manifolds of Picard number 1 with smooth VMRT, projective space is the only one compactifying C^n equivariantly in more than one ways. This answers questions raised by Hassett-Tschinkel and Arzhantsev-Sharoyko. This is a joint work with Jun-Muk Hwang.
Eduard Looijenga
Title: Meromorphic automorphic forms in algebraic geometry
Abstract: TBA