Algebraic Geometry Seminar
Fall 2019 — Tuesdays 3:30  4:30 PM, location LCB 222
Date  Speaker  Title — click for abstract (if available) 
August 20th 


August 27th 
Leo Herr University of Utah 
Log Geometry and GromovWitten Theory
Log structures endow schemes with tropical/toric data in a natural way. The corresponding notion of ``differentials with log poles'' makes many mildly singular spaces appear smooth, including simple normal crossings and toric varieties. Stranger still, blowups are not only ``\'etale'' and proper, but ``monomorphisms'' with a natural functor of points! We will work out the example of log smooth curves in detail before seeing a number of payoffs this added structure has to offer. Time permitting, we will discuss an ongoing research direction concerning intersection theory in this setting.

September 3rd 
Matteo Altavilla University of Utah 
Moduli spaces on the Kuznetsov component of Fano threefolds of index 2
A Fano threefold Y of Picard rank 1 and index 2 admits a canonical semiorthogonal decomposition of its derived category; this decomposition comes with a nontrivial component Ku(Y) — called the Kuznetsov component — that encodes most of the geometry of Y. I will present a joint work with M. Petkovic and F. Rota in which we describe certain moduli spaces of Bridgelandstable objects on Ku(Y), via the stability conditions constructed by Bayer, Macrì, Lahoz and Stellari. Furthermore, in our work we study the behavior of the AbelJacobi map on these moduli. As an application in the case of degree d = 2, we prove a strengthening of a categorical Torelli Theorem by Bernardara and Tabuada.

September 10th 
Adrian Langer University of Warsaw 
Smooth projective Daffine varieties
A Daffine variety is such a variety X that the category of D_Xmodules behaves like the category of O_Xmodules of an affine variety.
Beilinson and Bernstein showed that complex generalized flag varieties are Daffine. It is a folklore conjecture that any smooth projective
Daffine variety is of this form. I will talk about current state of this problem. In positive characteristic the problem is related to a new
generalization of Miyaoka's generic semipositivity theorem.

September 17th 
Adrian Langer University of Warsaw 
Nearbycycles and semipositivity in positive characteristic
I will talk about an analogue of Hodge theory in positive characteristic. In particular, I will show analogues of Schmid’s nilpotent orbit theorem
and nearby cycles in positive characteristic. As an application I will prove some strong semipositivity theorems for analogs of complex polarized
variations of Hodge structures. This implies semipositivity for the relative canonical divisor of a semistable reduction and it also gives some
new results over complex numbers.

September 24th 
Juliette Bruce University of Wisconsin 
SemiAmple Asymptotic Syzygies
I will discuss the asymptotic nonvanishing of syzygies for products of projective spaces, generalizing the
monomial methods of EinErmanLazarsfeld. This provides the first example of how the asymptotic syzygies of a smooth
projective variety whose embedding line bundle grows in a semiample fashion behave in nuanced and previously unseen ways.

October 1st 
Gebhard Martin University of Bonn 
Automorphisms of unnodal Enriques surfaces
It follows from an observation of A. Coble in 1919 that the automorphism group of an unnodal Enriques surface contains the 2congruence subgroup of the Weyl group of the E_{10}lattice. In this talk, I will explain how much bigger the automorphism group of an unnodal Enriques surface can be. Furthermore, I will determine the automorphism group of a generic Enriques surface with smooth K3 cover in arbitrary characteristic, improving the corresponding result of W. Barth and C. Peters for very general Enriques surfaces over the complex numbers.

October 8th 
Fall Break 

October 15th 
Yuchen Liu Yale University 
Openness of Ksemistability for Fano varieties
Recently, the question of whether one can construct nicely behaved moduli spaces for Fano varieties using Kstability has attracted significant interest. More precisely, the Fano Kmoduli Conjecture predicts that Kpolystable Fano varieties with fixed volume and dimension form a projective good moduli space. In this talk, I will explain the proof of openness of Ksemistability for Fano varieties which is one major step in the Fano Kmoduli Conjecture. Our proof is a combination of valuative criterion for Ksemistability due to Fujita and Li, boundedness of complements due to Birkar, and approximation techniques. This talk is based on joint work with Harold Blum and Chenyang Xu.

October 22nd 
Lei Wu University of Utah 

October 29th 
Shuai Wang Columbia University 
Relative GromovWitten theory and vertex operators
We study the relative GromovWitten theory on T*P^1 \times P^1 and show that certain equivariant limits give us the relative invariants on P^1\times \P^1. By formulating the quantum multiplications on Hilb(T*P^1) computed by Devash Maulik and Alexei Oblomkov as vertex operators and computing the product expansion, we demonstrate how to get the insertion and tangency operators computed by Yaim Cooper and Rahul Pandharipande in the equivariant limits.

November 5th 
Max Kutler Univeristy of Kentucky 

November 12th 


November 19th 


November 26th 


December 3rd 
Fabio Bernasconi University of Utah 

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