fables
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fables [2023/03/23 03:24] – kalinin0 | fables [2023/04/20 21:29] – kalinin0 | ||
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====== Séminaire " | ====== Séminaire " | ||
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+ | FABLES GEOMETRIQUES MINICOURSE, April 24-27 | ||
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+ | **Sergey Finashin (METU Ankara)** | ||
+ | |||
+ | Lecture 1, Monday, April 24, 15h, room 6-13 | ||
+ | Lecture 2, Tuesday, April 25, 13h, Room 1-07 | ||
+ | Lecture 3, Thursday, April 27, 16h15, Room 1-15 | ||
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+ | |||
+ | **Strong Invariants in Real Enumerative Geometry** | ||
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+ | In the first lecture I will discuss a signed count of real lines on real projective hypersurfaces, | ||
+ | All the results are joint with V.Kharlamov. | ||
+ | |||
+ | ---- | ||
+ | |||
+ | Monday, April 3, 2023 | ||
+ | room 6-13 | ||
+ | **15h00 — Alexander Bobenko (TU Berlin)** | ||
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+ | **Discrete conformal mappings, ideal hyperbolic polyhedra, and Ronkin function** | ||
+ | |||
+ | The general idea of discrete differential geometry is to find and investigate discrete models that exhibit properties and structures characteristic for the corresponding smooth geometric objects. We focus on a discrete notion of conformal equivalence of polyhedral metrics. Two triangulated surfaces are considered discretely conformally equivalent if the edge lengths are related by scale factors associated with the vertices. This simple definition leads to a surprisingly rich theory. We review connections between conformal geometry of triangulated surfaces, the geometry of ideal hyperbolic polyhedra and discrete uniformization of Riemann surfaces. Surprisingly, | ||
+ | |||
+ | ---- | ||
Monday, March 27, 2023 | Monday, March 27, 2023 | ||
room 6-13 | room 6-13 | ||
Ligne 8: | Ligne 34: | ||
**Mirror Lagrangians to lines in P^3** | **Mirror Lagrangians to lines in P^3** | ||
- | We discuss work in progress in which we construct, for any tropical curve in R^n with vertices of valence at most 4, a Lagrangian submanifold of (C^*)^n whose moment map projection is a tropical amoeba. These Lagrangians will have singular points modeled on the Harvey-Lawson cone over a 2-torus. We also consider a certain 4-valent tropical curve in R^3, for which we can modify the singular Lagrangian lift to obtain a cleanly immersed Lagrangian. The objects of the wrapped Fukaya category supported on this Lagrangian correspond, under mirror symmetry, to lines in CP^3. If time permits, we will explain how to use functors induced by Lagrangian correspondences to see this mirror relation. | + | We discuss work in progress in which we construct, for any tropical curve in $R^n$ with vertices of valence at most $4$, a Lagrangian submanifold of $(C^*)^n$ whose moment map projection is a tropical amoeba. These Lagrangians will have singular points modeled on the Harvey-Lawson cone over a $2$-torus. We also consider a certain |
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Monday, March 20, 2023 | Monday, March 20, 2023 |
fables.txt · Dernière modification : 2023/12/05 11:54 de slavitya_gmail.com