*Humboldt-Universität zu Berlin *

*Mathem.-Naturwissenschaftliche Fakultät*

*Institut für Mathematik*

Sommersemester 2021

Das Forschungsseminar findet mittwochs in der Zeit von 16:00 - 17:00 Uhr in Zoom statt.

Registration is required here

Seminar: Algebraic Geometry an der FU

14.04.2021 | Andrey Soldatenkov (Humboldt-Universität zu Berlin) | |

Title: Holonomy of the Obata connection on hypercomplex manifolds |
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Abstract:
The algebra of quaternions has been a focus of attention in many branches of mathematics ever since its introduction by Hamilton. One may think that quaternions form a noncommutative finite extension of the field of complex numbers. For a geometer, it is natural to wonder if there exists a suitable notion of a quaternionic variety, analogous to a complex algebraic variety. I will try to give an introduction to this circle of ideas, explain how one can approach quaternionic (or hypercomplex) geometry and what natural problems arise in this context. One important notion in hypercomplex geometry is the Obata connection, the unique torsion-free connection that preserves the action of the quaternions. I will present some results on the study of its holonomy.
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21.04.2021 | Alessandro Verra (Universita Roma Tre) | |

Title: The Igusa quartic and the Prym map |
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Abstract: The Igusa, or the Castelnuovo-Richmond quartic is a famous hypersurface of the complex projective 4-space known for its ubiquity in algebraic geometry. It is related to the Prym map \(P\) in genus 6. As is well known the map \(P\) has degree 27 and dominates the moduli space of 5-dimensional principally polarized abelian varieties. Other maps with the same monodromy are associated to \(P\) and reflect related configurations. Among these these of particular importance is the map \(J: D \rightarrow A_5\), with fibre the configuration of double sixes of lines of the cubic surface. We describe \(J\) geometrically, showing that it is birationally equivalent to the period map for the moduli space \(D\) of 30-nodal quartic threefolds, cutting twice a quadratic section of the Igusa quartic. | ||

28.04.2021 | (start at 17:00) Hannah Larson (Stanford University) | |

Title: The rational Chow rings of \(M_7\), \(M_8\), and \(M_9\) |
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Abstract:
The rational Chow ring of the moduli space \(M_g\) of curves of genus \(g\) is known for \(g \leq 6\). In each of these cases, the Chow ring is tautological (generated by certain natural classes known as kappa classes). In recent joint work with Sam Canning, we prove that the rational Chow ring of \(M_g\) is tautological for \(g = 7, 8, 9\), thereby determining the Chow rings by work of Faber. In this talk, I will give an overview of our approach, with particular focus on the locus of tetragonal curves (special curves admitting a degree 4 map to \(\mathbb{P}^1\)).
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05.05.2021 | François Greer (Stony Brook University) | |

Title: A tale of two Severi curves |
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Abstract: Let \((S,L) \) be a general polarized K3 surface of degree \(2g-2 \). A general member of the linear system \(|L|\simeq \mathbb P^g \) is a smooth curve of genus \(g \). For \(0\leq h\leq g \), define the Severi variety \(V_h(S,L)\subset |L| \) to be the locus of curves with geometric genus \(\leq h \). As expected, \(V_h(S,L) \) has dimension \(h \). We consider the case \(h=1 \), where the Severi variety is a (singular) curve. Our first result is that the geometric genus of \(V_1(S,L) \) goes to infinity with \(g \); we give a lower bound \(\sim e^{c\sqrt{g}} \). Next we consider the analogous question for Severi curves of a rational elliptic surface, and give a polynomial upper bound instead. Modular forms play a central role in both arguments. | ||

12.05.2021 | (17:00) Mina Aganagic (University of California Berkeley) | |

Title: Khovanov Homology from Mirror Symmetry |
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Abstract: Khovanov showed, more than 20 years ago, that there is a deeper theory underlying the Jones polynomial. The “knot categorification problem” is to find a uniform description of this theory, for all gauge groups, which originates from physics, or geometry. I will describe two solutions to this problem, which I recently discovered, related by a version of two dimensional (homological) mirror symmetry. The theories are significantly more efficient than the algebraic descriptions mathematicians have found, even in the Khovanov homology case. | ||

19.05.2021 | (17:00) Salim Tayou (Harvard University) | |

Title: Equidistribution of Hodge loci |
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Abstract: Given a polarized variation of Hodge structures, it is a classical result that the Hodge locus is a countable union of proper algebraic subvarieties. In this talk, I will explain a general equidistribution theorem for these Hodge loci and explain several applications: equidistribution of higher codimension Noether-Lefschetz loci, equidistribution of Hecke translates of a curve in \(A_g\) and equidistribution of some families of CM points in Shimura varieties. The results of this talk are joint work with Nicolas Tholozan.
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26.05.2021 | Rahul Pandharipande (ETH Zürich) | |

Title: Tevelev degrees and Hurwitz moduli spaces |
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Abstract: I will explain various numerical and cohomological questions related to Hurwitz moduli spaces (including older results with Faber on tautological classes and newer calculations with Cela and Schmitt on Tevelev degrees). | ||

02.06.2021 | ||

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09.06.2021 | David Holmes (University of Leiden) | |

Title: The double-double ramification cycle |
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Abstract: A basic question in the geometry of Riemann surfaces is to decide when a given divisor of degree 0 is the divisor of a rational function (is principal). In the 19th century Abel and Jacobi gave a beautiful solution: one writes the divisor as the boundary of a 1-cycle, and the divisor is principal if and only if every holomorphic differential integrates to zero against this cycle. From a modern perspective it is natural to allow the curve and divisor to vary in a family, perhaps allowing the curve to degenerate to a singular (stable) curve so that the corresponding moduli space is compact. The double ramification cycle can then be seen as a virtual fundamental class of the locus in the moduli space of curves over which our divisor becomes principal. We will focus on two basic questions: where does the double ramification cycle naturally live, and what happens when we intersect two double ramification cycles? We will see why (logarithmically) blowing up the moduli space can make life easier. This is joint work with Rosa Schwarz, building on earlier joint work with Aaron Pixton and Johannes Schmitt. | ||

16.06.2021 | Gerard Freixas i Montplet (IMJ-PRG) | |

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23.06.2021 | ||

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