# Difference between revisions of "Algebra and Algebraic Geometry Seminar Spring 2021"

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I will discuss two theorems in the talk: (1) There is a simple criterion on R, called "recognizability" ensuring that the normalization of a stable pair compactification is semitoroidal and (2) the rational curves divisor, generically the sum of geometric genus zero curves in |L|, is recognizable for all 2d. This gives a modular semitoroidal compactification for all degrees 2d. | I will discuss two theorems in the talk: (1) There is a simple criterion on R, called "recognizability" ensuring that the normalization of a stable pair compactification is semitoroidal and (2) the rational curves divisor, generically the sum of geometric genus zero curves in |L|, is recognizable for all 2d. This gives a modular semitoroidal compactification for all degrees 2d. | ||

+ | |||

+ | ===Andreas Knutsen=== | ||

+ | Title: Genus two curves on abelian surfaces | ||

+ | |||

+ | Abstract: Let (S,L) be a general polarized abelian surface of type | ||

+ | (d_1,d_2). The minimal geometric genus of any curve in the linear system | ||

+ | |L| is two and there are finitely many curves of such genus. In analogy | ||

+ | with Chen's results concerning rational curves in primitive linear | ||

+ | systems on K3 surfaces, it is natural to ask whether all such curves are | ||

+ | nodal. In the seminar I will present joint work with Margherita | ||

+ | Lelli-Chiesa (arXiv:1901.07603) where we prove that this holds true if | ||

+ | and only if d_2 is not divisible by 4. In the cases where d_2 is a | ||

+ | multiple of 4, we show the existence of curves in |L| having a triple, | ||

+ | 4-tuple or 6-tuple point, and prove that these are the only types of | ||

+ | unnodal singularities a genus 2 curve in |L| may acquire. | ||

===Eyal Subag=== | ===Eyal Subag=== |

## Revision as of 14:02, 21 February 2021

The Virtual Seminar will take place on Fridays at 2:30 pm via Zoom. We will also link to relevant or interesting Zoom talks outside of the seminar.

## Contents

## Algebra and Algebraic Geometry Mailing List

- Please join the AGS mailing list by sending an email to ags+join@g-groups.wisc.edu to hear about upcoming seminars, lunches, and other algebraic geometry events in the department (it is possible you must be on a math department computer to use this link).

## COVID-19 Update

As a result of Covid-19, the seminar for this semester will be held virtually. The default Zoom link for the seminar is https://uwmadison.zoom.us/j/9502605167 (sometimes we will have to use a different meeting link, if Michael K cannot host that day).

## Spring 2021 Schedule

date | speaker | title | link to talk |
---|---|---|---|

January 29 | Nir Avni (Northwestern) | First order rigidity for higher rank lattices | Zoom link |

February 12 | Marian Aprodu (Bucharest) | Koszul modules, resonance varieties and applications | Zoom link |

February 19 | Dhruv Ranganathan (Cambridge) | Logarithmic Donaldson-Thomas theory | Zoom link |

February 26 | Philip Engel (UGA) | Compact K3 moduli | Zoom link |

March 5 | Andreas Knutsen (University of Bergen) | Genus two curves on abelian surfaces | Zoom link |

March 12 | Michael Groechenig (University of Toronto) | TBA | Zoom link |

April 9 | Hannah Larson (Stanford) | TBA | Zoom link |

April 16 | Eyal Subag (Bar Ilan - Israel) | TBA | Zoom link |

April 23 | Gurbir Dhillon (Yale) | TBA | Zoom link |

## Abstracts

### Nir Avni

Title: First order rigidity for higher rank lattices.

Abstract: I'll describe a new rigidity phenomenon for lattices in higher rank simple algebraic groups. Specifically, I'll explain why the first order theories of such groups do not have (finitely generated) deformations and why they are determined (in the class of finitely generated groups) by a single first order axiom.

The results are from joint works with Alex Lubotzky and Chen Meiri.

### Marian Aprodu

Title: Koszul modules, resonance varieties and applications.

Abstract: This talk is based on joint works with Gabi Farkas, Stefan Papadima, Claudiu Raicu, Alex Suciu and Jerzy Weyman. I plan to discuss various aspects of the geometry of resonance varieties, Hilbert series of Koszul modules and applications.

Slides available here [1]

### Dhruv Ranganathan

Title: Logarithmic Donaldson-Thomas theory

Abstract: I will give an introduction to a circle ideas surrounding the enumerative geometry of pairs, and in particular, intersection theory on a new models of the Hilbert schemes of curves on threefolds. These give rise to “logarithmic” DT and PT invariants. I will explain the conjectural relationship between this geometry and Gromov-Witten theory, and give some sense of the role of tropical geometry in the story. The talk is based on joint work, some of it in progress, with Davesh Maulik.

### Philip Engel

Title: Compact K3 moduli

Abstract: This is joint work with Valery Alexeev. A well-known consequence of the Torelli theorem is that the moduli space F_{2d} of degree 2d K3 surfaces (X,L) is the quotient of a 19-dimensional Hermitian symmetric space by the action of an arithmetic group. In this capacity, it admits a natural class of "semitoroidal compactifications." These are built from periodic tilings of 18-dimensional hyperbolic space, and were studied by Looijenga, who built on earlier work of Baily-Borel and Ash-Mumford-Rapaport-Tai. On the other hand, F_{2d} also admits "stable pair compactifications": Choose canonically on any polarized K3 surface X an ample divisor R. Then the works of Kollar-Shepherd-Barron, Alexeev, and others provide for the existence of a compact moduli space of so-called stable pairs (X,R) containing, as an open subset, the K3 pairs.

I will discuss two theorems in the talk: (1) There is a simple criterion on R, called "recognizability" ensuring that the normalization of a stable pair compactification is semitoroidal and (2) the rational curves divisor, generically the sum of geometric genus zero curves in |L|, is recognizable for all 2d. This gives a modular semitoroidal compactification for all degrees 2d.

### Andreas Knutsen

Title: Genus two curves on abelian surfaces

Abstract: Let (S,L) be a general polarized abelian surface of type (d_1,d_2). The minimal geometric genus of any curve in the linear system |L| is two and there are finitely many curves of such genus. In analogy with Chen's results concerning rational curves in primitive linear systems on K3 surfaces, it is natural to ask whether all such curves are nodal. In the seminar I will present joint work with Margherita Lelli-Chiesa (arXiv:1901.07603) where we prove that this holds true if and only if d_2 is not divisible by 4. In the cases where d_2 is a multiple of 4, we show the existence of curves in |L| having a triple, 4-tuple or 6-tuple point, and prove that these are the only types of unnodal singularities a genus 2 curve in |L| may acquire.

### Eyal Subag

**TBA**

TBA

### Gurbir Dhillon

**TBA**

TBA