The direct summand theorem
Heidelberg, Mathematikon, SR 8 INF 205, Heidelberg, GermanyTalk 5: Lars Wüste-Schmülling (Universität Heidelberg): Adic spaces I
Moduli of Quiver Representations and GIT Quotients
Frankfurt, Robert-Mayer-Str. 6-8, Raum 309Talk 2.1: Nicole Müller (Goethe Universität): Affine GIT
Talk 2.2: Felix Göbler (Goethe Universität): Projective GIT
Jacobi forms, mock modular forms and qMZVs in enumerative geometry
Heidelberg, MATHEMATIKON, SR 10 INF 205, Heidelberg, GermanyJan-Willem van Ittersum (Cologne) Abstract: There are several instances where Gromov-Witten invariants can be expressed in terms of (quasi)Jacobi forms. In other examples in enumerative geometry, one also encounters mock … Continue reading Jacobi forms, mock modular forms and qMZVs in enumerative geometry
Antisymmetry in the theory of rigid meromorphic cocycles
Heidelberg, Mathematikon, SR A and LivestreamSören Sprehe (Universität Bielefeld) Around six years ago Darmon and Vonk initiated the theory of p-adic singular moduli for real quadratic fields by defining “rigid meromorphic cocycles". These are elements … Continue reading Antisymmetry in the theory of rigid meromorphic cocycles
Seminar on Arithmetic Geometry
Darmstadt, Room 401 and Zoom Schlossgartenstraße 7, Darmstadt, GermanyLudwig Modin (Leibniz Universität Hannover): Moduli spaces for Theta-strata and non-reductive quotients
Vector bundles on curves
Darmstadt, Room 401 and Zoom Schlossgartenstraße 7, Darmstadt, GermanyMichelle Klemt : Vector bundles on curves of low genus
Cones of Noether-Lefschetz divisors and moduli of hyperkähler manifolds
ZoomLaure Flapan (Michigan State University): Cones of Noether-Lefschetz divisors and moduli of hyperkähler manifolds
Hodge Theory
Mainz, Hilbertraum (05-432)Andreas Gieringer (Universität Mainz): Harmonic forms I
The direct summand theorem
Heidelberg, Mathematikon, SR 8 INF 205, Heidelberg, GermanyTalk 6: Yanik Kleibrink (Universität Frankfurt): Adic spaces II
Anabelian geometry – Mochizuki’s proof of the Hom-Conjecture [d’après Faltings]
HeidelbergTalk 3: Leonie Scherer (Goethe Universität): Unipotent Tannakian categories
Talk 4: Construction of 𝔥 and Hodge-Tateness of rational sections
Differential operators on automorphic forms, special functions, and arithmetic applications
Heidelberg, MATHEMATIKON, SR 10 INF 205, Heidelberg, GermanyTomoyoshi Ibukiyama, Professor Emeritus Department of Mathematics Graduate School of Science, Osaka University
Heights of modular polynomials
Heidelberg, Mathematikon, SR A and LivestreamProf. Dr. Florian Breuer (University of Newcastle) For every positive integer $N$, the modular polynomial $\Phi_N(X,Y)$ has integer coefficients and vanishes precisely at pairs of $j$-invariants of elliptic curves linked … Continue reading Heights of modular polynomials