Ohio State University Algebraic Geometry SeminarYear 2024-2025Time: Tuesdays 10:20-11:15amLocation: MW 154 (in person) or Zoom (virtual, email the organizers for the Zoom coordinates) |
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TIME | SPEAKER | TITLE |
August 27
Tue, 10:20am | Richard Haburcak
(OSU) |
Distinguishing Brill-Noether loci |
September 3
Tue, 10:20am | William Newman
(OSU) |
Chow Groups of Moduli Spaces Via Higher Chow Groups |
September 8-11
time TBD room TBD | Michel Talagrand
(CNRS) |
Special lecture by Michel Talagrand (Abel Prize 2024 winner) |
September 17
Tue, 10:20am |
Desmond Coles
(UT Austin) |
Spherical tropicalization |
October 1
Tue, 10:20am | Hsian-Hua Tseng
(OSU) |
Elliptic curves and Hilbert schemes of points |
October 15
Tue, 10:20am | Dave Anderson
(OSU) |
Filtrations and recursions for Schubert modules |
October 22
Tue, 10:20am | Linus Setiabrata
(U. Chicago) |
Double orthodontia formulas and Lascoux positivity |
October 29
Tue, 10:20am | Y.-P. Lee
(A. Sinica / U. Utah) |
Quantum K-theory of Calabi-Yau threefolds |
November 4-6
4:15pm room TBD | Alexei Borodin
(MIT) |
Rado Lecture Series 2024-25 |
November 12
Tue, 10:20am | Ian Cavey
(UIUC) |
Enumerative formulas for Hilbert schemes of points on surfaces |
November 19
Tue, 10:20am | Federico Moretti
(Stony Brook U.) |
On the degree of irrationality of low genus K3 surfaces |
November 26
Tue, 10:20am | (no seminar) | Thanksgiving week |
December 3
Tue, 10:20am | TBA
() |
TBA |
January 7
Tue, 10:20am | TBA
( ) |
TBA |
January 14
Tue, 10:20am | TBA
( ) |
TBA |
January 21
Tue, 10:20am | TBA
( ) |
TBA |
January 28
Tue, 10:20am | Alejandro Bravo-Doddoli
(U. Michigan) |
TBA |
February 4
Tue, 10:20am | TBA
( ) |
TBA |
February 11
Tue, 10:20am | TBA
( ) |
TBA |
February 18
Tue, 10:20am | TBA
( ) |
TBA |
February 25
Tue, 10:20am | TBA
( ) |
TBA |
March 4
Tue, 10:20am | TBA
() |
TBA |
March 11
Tue, 10:20am | (no seminar)
() |
Spring Break (no seminar) |
March 18
Tue, 10:20am | TBA
() |
TBA |
March 25
Tue, 10:20am | TBA
() |
TBA |
April 1
Tue, 10:20am | TBA
() |
TBA |
April 7-11
time TBD room TBD | Melanie Matchett Wood
(Harvard) |
Zassenahaus Lecture Series 2024-25 |
April 15
Tue, 10:20am | TBA
() |
TBA |
April 22
Tue, 10:20am | TBA
() |
TBA |
See also the Arithmetic Geometry Seminar
(Haburcak): Classical Brill-Noether theory studies linear systems on a general curve in the moduli space Mg of algebraic curves of genus g. A refined Brill-Noether theory studies the linear systems on curves with a given Brill-Noether special linear system. As a first step, one would like to understand the stratification of Mg by Brill-Noether loci, which parameterize curves with a particular projective embedding. We'll discuss recent progress on distinguishing Brill-Noether loci and the recent resolution of the Maximal Brill-Noether loci conjecture, identifying the maximal elements of the stratification by Brill-Noether loci. This is based on joint work with Asher Auel, Andrei Bud, Andreas Leopold Knutsen, and Hannah Larson.
(Newman): One can use Bloch's higher Chow groups to compute the usual Chow groups of moduli spaces. This involves first computing the necessary higher Chow groups, and then computing the connecting homomorphism of the localization exact sequence. I will explain general techniques for performing these computations and give examples for the integral Chow groups of moduli spaces of genus 1 curves.
(Coles): In recent decades tropical geometry, the study of algebraic varieties by constructing an associated 'combinatorial shadow', has proven to be a fruitful toolkit in many areas of algebraic geometry. The starting point for constructing these shadows has often been the tropicalization of toric varieties. In this talk I will explain how tropicalization can be extended to a larger class of varieties, spherical varieties, and I will also discuss the connection with Berkovich geometry.
(Tseng): Hilbert schemes of points on the affine plane are arguably the moduli spaces of sheaves with the richest known structures. The Deligne-Mumford moduli spaces of stable curves are by far the most studied moduli spaces of varieties in algebraic geometry. Stable maps provide a system of correspondences between these moduli spaces. In particular, one can construct (cycle) classes on moduli spaces of curves from classes on Hilbert schemes. In this talk, we discuss a numerical study of these classes in the genus 1 case.
(Setiabrata): Double Grothendieck polynomials G_w(x;y) are lifts of structure sheaves of Schubert varieties in the equivariant K-theory of the flag variety. Motivated by our search for a representation-theoretic avatar for these polynomials, we give a new formula for G_w(x;y) based on Magyar's orthodontia algorithm for diagrams. We obtain a similar formula for double Schubert polynomials S_w(x;y), and a curious positivity result: For vexillary permutations w, the polynomial x_1^n \dots x_n^n S_w(x_n^{-1}, \dots, x_1^{-1}; 1, \dots, 1) is a graded nonnegative sum of Lascoux polynomials. This is joint work with Avery St. Dizier.
(Lee): The aim of this talk is to explain that on a Calabi-Yau threefold a genus zero quantum K-invariant can be written as an integral linear combination of a finite number of Gopakumar--Vafa BPS invariants with coefficients from an explicit multiple cover formula. Conversely, all Gopakumar-Vafa invariants can be determined by a finite number of quantum K-invariants in a similar manner. The technical heart is a proof of a remarkable conjecture by Hans Jockers and Peter Mayr. This result is consistent with the ''virtual Clemens conjecture'' for the Calabi-Yau threefolds, a weak version of which has been proved by John Parden in cohomology (but not in K-theory). This is a joint work with You-Cheng Chou.
(Cavey): The Hilbert schemes of points on a smooth algebraic surface are smooth varieties that parametrize finite closed subschemes of the surface of a fixed length. When the underlying surface is toric, global sections of line bundles on the surface correspond to integer points in an associated polygon. In this talk, I will explain how in certain cases the corresponding problem on the Hilbert scheme can be interpreted as a packing problem for integer points in the same polygon satisfying a certain separation condition. Such an interpretation is known for all ample line bundles on Hilbert schemes of points on Hirzebruch surfaces (for example P1 x P1) and is expected to hold more generally. Based on this counting interpretation for sections of ample line bundles, I will also give formula for the Euler characteristic of any line bundle on the Hilbert schemes of points on P1 x P1. The latter formula has applications to the Verlinde series introduced by Ellingsrud, Göttsche, and Lehn.
(Moretti): Given a projective variety, one can understand rational maps to a projective space of the same dimension in terms of the associated kernel bundle. In the case of K3 surfaces of Picard rank 1, this allows to prove that rational maps of degree at most d (induced by the primitive linear system) move in families. I will explain how, by combining vector bundle techniques with derived category methods, one can study and characterize in many cases rational maps of minimal degree for polarized K3 surfaces of genus up to 14. This can be seen as a preliminary step towards computing the degree of irrationality of these surfaces. Joint work with Andrés Rojas.
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Ohio State University Algebraic Geometry Seminar-Year 2016-2017
Ohio State University Algebraic Geometry Seminar-Year 2015-2016
Ohio State University Algebraic Geometry Seminar-Year 2014-2015
Ohio State University Algebraic Geometry Seminar-Year 2013-2014
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