Algebraic Geometry Seminar
Fall 2023 — Tuesdays 3:30 - 4:30 PM
LCB 323
Join the Algebraic Geometry mailing list for updates + announcements.Date | Speaker | Title — click for abstract (if available) |
September 5th |
Lei Wu Zhejiang University |
Log geometry and log D-modules
The theory of D-modules provides very powerful tools and solved many important problems. In this talk, I will introduce a natural way to generalize the D-module theory in logarithmic geometry. I will explain log Bernstein inequality and define log holonomic D-modules on smooth log schemes. Then I will explain log constructibility by using Kato-Nakayama spaces associated to log schemes. If time allowed, I will also explain how the theory is related to the classical b-function theory as well as log Riemann-Hilbert correspondence. This is based on an ongoing project with Andreas Hohl.
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September 12th |
Jihao Liu Northwestern University |
Minimal model program for foliations and generalized pairs
In this talk, I will report recent progress on the minimal model program for foliations, applying the theory of Birkar--Zhang’s generalized pairs. Particularly, I will discuss the ACC for lc thresholds and the canonical bundle formula for foliations. Part of this talk is based on a series of joint works with Omprokash Das, Yujie Luo, and Roktim Mascharak, Fanjun Meng, and Lingyao Xie.
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September 19th |
Hsin-Ku Chen KIAS |
On the Chern numbers of smooth complex threefolds
We show that the Chern numbers of a smooth complex projective threefold are bounded by a constant which depends only on the topological type of the threefold, provided that the cubic form of the threefold has non-zero discriminant. This is a joint work with Paolo Cascini.
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September 26th |
Sung Gi Park Harvard University |
Kodaira dimension and hyperbolicity for smooth families of varieties
In this talk, I will discuss the behavior of positivity, hyperbolicity, and Kodaira dimension under smooth morphisms of complex quasi-projective manifolds. This includes a vast generalization of a classical result: a fibration from a projective surface of non-negative Kodaira dimension to a projective line has at least three singular fibers. Furthermore, I will explain a proof of Popa's conjecture on the superadditivity of the log Kodaira dimension over bases of dimension at most three. These theorems are applications of the main technical result, namely the logarithmic base change theorem.
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October 3rd |
Brian Lehmann Boston College |
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October 17th |
Charles Vial Universität Bielefeld |
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October 24th |
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October 31st |
Sridhar Venkatesh University of Michigan |
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November 7th |
C. Eric Overton-Walker University of Arkansas |
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November 14th |
Swaraj Pande University of Michigan |
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November 21st Virtual |
Liana Heuberger University of Bath |
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November 28th |
Alicia Lamarche University of Utah |
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December 5th |
Chengxi Wang UCLA |
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