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start [2021/10/24 16:32] – [Seminars and conferences] kalinin0 | start [2023/12/05 11:49] – slavitya_gmail.com | ||
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- | PhD graduated: Kristin Shaw (December 2011), Lionel Lang (December 2014), [[http://mathcenter.spb.ru/nikaan/|Nikita Kalinin]] (December 2015), [[Mikhail Shkolnikov|Mikhail Shkolnikov]] (June 2017), | + | PhD graduated: Kristin Shaw (December 2011), Lionel Lang (December 2014), [[https://scholar.google.com/citations? |
Johannes Josi (February 2018). | Johannes Josi (February 2018). | ||
- | Current members: | + | Current members: Thomas Blomme, |
- | Alumni: Ivan Bazhov, Johan Bjorklund, Rémi Crétois, Yi-Ning Hsiao, Jens Forsgard, Maxim Karev, Ilya Karzhemanov, | + | Alumni: Ivan Bazhov, Johan Bjorklund, Rémi Crétois, Weronika Czerniawska, Yi-Ning Hsiao, Jens Forsgard, Maxim Karev, Ilya Karzhemanov, |
We organize several seminars: | We organize several seminars: | ||
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[[fables|Séminaire " | [[fables|Séminaire " | ||
- | pre-2017 [[batelle|Battelle Seminar]] and | + | pre-2017 |
[[working|Tropical working group Seminar]]. | [[working|Tropical working group Seminar]]. | ||
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====== Seminars and conferences ====== | ====== Seminars and conferences ====== | ||
- | Seminar | + | ---- |
- | Nov 1, 16h15. Room 06-13 | + | Francesca Carocci (Genève), Dec 8, 14h30, Salle 06-13 |
- | | + | |
- | | + | "Degenerations of Limit linear series" |
+ | |||
+ | Maps to projective space are given by basepoint-free linear series, thus these are key to understanding the extrinsic geometry of algebraic curves. | ||
+ | How does a linear series degenerate when the underlying curve degenerates and becomes nodal? | ||
+ | Eisenbud and Harris gave a satisfactory answer to this question when the nodal curve is of compact type. Eisenbud-Harris' | ||
+ | I will report on a joint work in progress with Lucaq Battistella and Jonathan Wise, in which we review this question from a moduli-theoretic and logarithmic perspective. The logarithmic prospective helps understanding the rich polyhedral and combinatorial structures underlying degenerations of linear series. These are linked with matroids and buildings of Bruhat-. | ||
+ | |||
+ | ---- | ||
+ | Diego MATESSI (Milano), Dec 4, 15h, Salle 06-13 | ||
+ | |||
+ | " | ||
+ | |||
+ | I will present some work in progress jont with Arthur Renaudineau. | ||
+ | |||
+ | |||
+ | ---- | ||
+ | Thomas Blomme, université de Genève, Thursday, | ||
+ | |||
+ | " | ||
+ | |||
+ | Bielliptic surfaces were classified by Bagnera & de Francis more than a century ago. They form a family spread into seven subfamilies of the Kodaira-Enriques surface classification which have nearly trivial canonical class in the sense that it is non-zero, but torsion. Thus, the virtual dimension of the moduli space of curves only depends on the genus, and contrarily to abelian and K3 surfaces, it yields non-zero invariants. In this talk we'll focus on some techniques to compute GW invariants of these surfaces along with some regularity properties. | ||
+ | |||
+ | ---- | ||
+ | Antoine Toussaint, université de Genève, Monday, Oct 23, at 15h, Salle 06-13 | ||
+ | | ||
+ | "Real Structures of Phase Tropical Surfaces" | ||
+ | |||
+ | Phase tropical surfaces can appear as a limit of a 1-parameter family of smooth complex algebraic surfaces. A phase tropical surface admits a stratified fibration over a smooth tropical surface. We study the real structures compatible with this fibration and give a description in terms of tropical cohomology. As an application, we deduce combinatorial criteria for the type of a real structure of a phase tropical surface. Time permitting, we will also discuss the connection with Renaudineau and Shaw's spectral sequence and Kalinin' | ||
+ | |||
+ | ---- | ||
+ | Ozgur CEYHAN (University of Luxembourg), Monday, Oct 16, at 15h, Salle 06-13 | ||
+ | |||
+ | " | ||
+ | |||
+ | The backpropagation algorithm and its variations are the primary training method of multi-layered neural networks. The backpropagation is a recursive gradient descent technique that works on large matrices. | ||
+ | This talk explores backpropagation | ||
+ | |||
+ | ---- | ||
+ | |||
+ | | ||
+ | |||
+ | “Universal polynomials for coefficients of tropical refined invariant in genus 0” | ||
+ | |||
+ | In enumerative geometry, some numbers of curves on surfaces are known to behave polynomially when the cogenus is fixed and the linear system varies, whereas it grows more than exponentially fast when the genus is fixed. In the first case, Göttsche' | ||
- | This is a report on joint work with Don Zagier, and joint work | + | Tropical refined invariants are polynomials resulting of a weird way of counting curves, but linked |
- | in progress with Kilian Bönisch | + | |
- | The rigid Calabi-Yau threefolds that appear as conifold fibers | ||
- | in the hypergeometric Landau-Ginzburg models of Fano | ||
- | complete intersection fourfolds in [weighted] projective spaces | ||
- | are expected to be modular, but what is lacking is the | ||
- | construction of actual correspondences with Kuga-Sato | ||
- | threefolds. I will explain how the technique of fibered motives | ||
- | can be used to provide `opportunistic' | ||
- | proofs for such fibers. | ||
+ | [[symplectic| seminar page]] | ||
====== Geneva-Neuchâtel Symplectic Geometry Seminar ====== | ====== Geneva-Neuchâtel Symplectic Geometry Seminar ====== | ||
Ligne 65: | Ligne 100: | ||
- | If you want to register, say me (Misha Shkolnikov). | + | You should be approved user to edit pages. |
You can write here something. (Create a small web page about you, write about you interests, explain tropical philosophy of our group, upload articles etc). | You can write here something. (Create a small web page about you, write about you interests, explain tropical philosophy of our group, upload articles etc). | ||
start.txt · Dernière modification : 2024/03/12 13:13 de slavitya_gmail.com