Humboldt Universität zu Berlin
Mathem.-Naturwissenschaftliche Fakultät
Institut für Mathematik
Wintersemester 2015/16
Das Forschungsseminar findet mittwochs in der Zeit von 15:00 - 17:00 Uhr in der Rudower Chaussee 25, 12489 Berlin-Adlershof, Raum 2.006 (Haus 2, Erdgeschoss), statt.
Seminar: Algebraic Geometry an der FU
14.10.2015 | kein Seminar |
21.10.2015 | Samuel Grushevsky (Stony Brook University) |
Title: Compactified strata of meromorphic differentials | |
Abstract: We consider the locus of smooth curves together with a meromorphic one-form, with prescribed multiplicities of all its zeroes and poles, and study its closure over the Deligne-Mumford moduli space of stable curves. We describe this compactification completely, and illustrate our results with various examples. Based on joint work with M. Bainbridge, D. Chen, Q. Gendron, M. Moeller. | |
28.10.2015 | Maksym Fedorchuk (Boston College) |
Title: GIT semistability of Hilbert points of Milnor algebras | |
Abstract: The famous Mather-Yau theorem says that two isolated hypersurface singularities are biholomorphically equivalent if and only if their moduli algebras are isomorphic. However, the reconstruction problem of explicitly recovering the singularity from its moduli algebra is open. In the case of quasi-homogeneous hypersurface singularities, Eastwood and Isaev proposed an invariant-theoretic approach to the reconstruction problem. For homogeneous hypersurface singularities, Alper and Isaev gave a geometric invariant theory reformulation of this approach, in which GIT stability of the Hilbert points of the Milnor algebra of the singularity plays a key role. In particular, Alper and Isaev pose several problems concerning GIT stability of the associated form and the gradient point of a homogeneous form, which they recently solved in the binary case and in the case of generic forms in any number of variables. In my talk, I will explain these recent developments. I will then proceed to prove semistability of the gradient point of a semistable form, and semistability of the associated form of a non-degenerate form. This will answer several (but not all) questions of Alper and Isaev. | |
04.11.2015 | Ananyo Dan (HU Berlin) |
Title: New methods on non-reduced components of Hilbert schemes of curves | |
Abstract: We study non-reduced components of Hilbert schemes of local complete intersection curves (not necessarily reduced) using techniques from Hodge theory. | |
11.11.2015 | Jérémy Guéré (HU Berlin) |
Title: From Koszul cohomology to tautological relations in the moduli space of curves | |
Abstract: I will explain how to derive tautological relations in the moduli space of stable curves from a vanishing of the cohomology of some Koszul complex. The vanishing property comes from a result of Green on the study of base-point free linear systems and the Koszul complex comes from the algebraic definition of Witten r-spin class. Precisely, our tautological relations hold in the Chow ring of the moduli space of r-spin curves and do not rely on any semi-simplicity condition. I will also discuss the information we obtain on this Witten r-spin class, its generalization to some non-semi-simple cohomological field theories, and its application to the double ramification hierarchy recently introduced by Buryak. | |
18.11.2015 | Stefan Schreieder (Universität Bonn) |
Title: A very general quartic or quintic fivefold is not stably rational | |
Abstract: Totaro showed recently that a wide range of hypersurfaces are not stably rational. In this talk I explain how to improve Totaro's result in dimension 5, where it covers very general hypersurfaces of degree at least 6. Namely, we prove that a very general quartic or quintic fivefold is not stably rational. It was not known whether these varieties were rational. Moreover, general quartic fivefolds are known to be unirational; they are in fact the first smooth hypersurfaces that are known to be unirational but not stably rational. This is joint work with L. Tasin. | |
25.11.2015 | Sándor Kovács (University of Washington) |
Title: Positivity results for push-forwards of relative pluri-canonical sheaves with applications | |
Abstract: This is a report on joint work with Zsolt Patakfalvi. We prove various positivity results for push-forwards of relative pluri-canonical sheaves of families of stable log-varieties. The primary motivation for these results is that they are used to prove projectivity of the moduli space of stable log-varieties and to confirm the Iitaka-Viehweg conjecture on the subadditivity of log-Kodaira dimension for fiber spaces whose general fiber is of log general type. However they turn out to be useful in other situations as well. I will mention briefly other applications of these positivity results by Patakfalvi and Xu to prove that the CM line bundle is ample on the proper moduli space parametrizing KSBA stable varieties and by Ascher and Turchet to prove a logarithmic version of the Correlation Theorem of Caporaso-Harris-Mazur (dim 1), Hassett (dim 2), and Abramovich (general). | |
26.11.2015 | Sándor Kovács (University of Washington) *Room 1.012 Time: 16:00-17:00* |
Title: What's the "right" definition of a moduli functor of higher dimensional stable varieties? | |
Abstract: As a first approximation one might expect that the definition of a moduli functor in arbitrary dimensions is simply the same as the one for curves after replacing the members of families with higher dimensional ones. In this talk I will explain some obstacles that show that this is not the case and possible ways to deal with these issues. The plan is to discuss some explicit examples. | |
02.12.2015 | kein Seminar |
09.12.2015 | Valentin Tonita (HU Berlin) |
Title: Quantum K-theory | |
Abstract: For a project manifold X, let X_{0,n,d} be the moduli spaces of (genus 0, degree d) stable maps to X. I will define both "ordinary" and permutation equivariant K-theoretic Gromov-Witten invariants (recently introduced by A. Givental) as holomorphic Euler characteristics on X_{0,n,d}, respectively X_{0,n,d}/S_{n} . I will characterize their generating series in terms of the cohomological Gromov-Witten theory of X, which is easier to compute. Time permitting I will explain recent progress in the permutation-equivariant theory: use of localization for K -theoretic I functions of toric manifolds, twisted K-theoretic Gromov-Witten invariants etc. | |
06.01.2016 | Aaron Bertram (University of Utah) |
Title:To be announced | |
Abstract: To be announced | |
5.01.2016 | Samuel Grushevsky (Stony Brook University) SFB Seminar. *Place: IRIS-Haus. Time: 15:30-16:30* |
Title:Moduli of abelian varieties: homology and compactifications | |
5.01.2016 | Gavril Farkas (Humboldt Universität zu Berlin) SFB Seminar. *Place: IRIS-Haus. Time: 17:00-18:00* |
Title:Moduli of abelian varieties: uniformization | |
13.01.2016 | Pawel Borówka (Jagiellonian University, Krakow ) |
Title:To be announced | |
Abstract: To be announced | |
20.01.2016 | Herbert Lange (Erlangen) |
Title:To be announced | |
Abstract: To be announced |