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Fri, 04. Jul at 14:15
TU (C 130)
Kovalevskaya Lecture
Sun, 06. Jul at 15:30
Rudower Chaussee ...
Positive sectional curvature and Ricci flow
Abstract
Tue, 08. Jul at 13:15
Humboldt-Universi...
Tue, 08. Jul at 14:00
1.023 (BMS Room, ...
A geometric recipe for constructing coordinates on the moduli space of flat connections
Abstract. The moduli space M(C, G) of flat G-connections on a Riemann surface C is an object that appears in various places in physics, especially in the context of supersymmetric gauge theories. It was shown that one could construct a particularly nice set of coordinates on M(C, G) provided C is equipped with some additional structure known as a spectral network W. This construction uses a technique called W-abelianisation. W-abelianisation, and the inverse map W-nonabelianisation, define a diffeomorphism between the space M(C, G) and a (possibly) simpler space M(ÎŁ, GL(1, C)) where ÎŁ is a branched cover over C. In this talk, I shall give a pedagogical introduction to the abelianisation and nonabelianisation maps that were introduced in [Gaiotto-Moore-Neitzke] and later expanded upon by [Hollands-Neitzke]. This talk should be accessible to anyone comfortable with differential geometry and complex geometry.
Wed, 09. Jul at 10:00
HVP 11 a, R.313, ...
Wed, 09. Jul at 11:30
Weierstrass Lectu...
Wed, 09. Jul at 13:15
Room: 3.007 John ...
p-adic zeta function and Hodge theory
Abstract. In 1988, Igusa proposed a mysterious conjecture, in the spirit of Weil's conjecture, which predicts certain arithmetic quantities of a given polynomial (poles of the p-adic zeta function) are in fact topological/geometric, i.e. they must induce roots of the Bernstein-Sato polynomial and monodromy eigenvalues on the cohomology of Milnor fibers. This conjecture is widely open, but for hyperplane arrangements, Budur-Mustațǎ-Teitler proposed the n/d-conjecture in 2009 and showed that it will imply Igusa's conjecture in this case. In this talk, I will report a recent work of mine with Dougal Davis, where we prove the n/d-conjecture, finishing the previous work of Saito, Walther, Budur, Yuzvinsky, Veys, Bath, Shi-Zuo and many others. The proof uses Hodge theory in an essential way, especially Schmid's nilpotent orbit theorem and its consequences.
Wed, 09. Jul at 15:30
WIAS, Erhard-Schm...
The three limits of the hydrostatic approximation
Abstract
Wed, 09. Jul at 16:30
EN 058
Is the squared inverse of the distance between kissing polytopes always an integer?
Abstract. A lattice $(d,k)$-polytope is the convex hull of a set of points in dimension $d$ whose coordinates are integers ranging from $0$ to $k$. We investigate the smallest possible distance between two disjoint lattice $(d,k)$-polytopes. A pair of such polytopes are called kissing polytopes. This question arises in various contexts where the minimal distance between such polytopes appears in complexity bounds for optimization algorithms. We provide nearly matching lower and upper bounds for this distance and propose an algebraic model. Our formulation yields explicit formulas in dimensions $2$ and $3$, and allows for the computation of previously intractable values. We also discuss related results, such as the Alon–Vu bounds for flat simplices — that is, the minimum distance between a vertex of a lattice $(d,1)$-simplex and the affine space spanned by the remaining vertices. Finally, we observe that all the known squared distances between kissing polytopes are inverses of integers, and we ask whether this observation holds in general. Based on joint-work with Shmuel Onn (Technion), Sebastian Pokutta (Zuse Institute Berlin and TU Berlin), and Lionel Pournin (Université Paris 13).
Thu, 10. Jul at 10:00
WIAS, Erhard-Schm...
Axisymmetric vortex rings at high Reynolds number
Abstract
Thu, 10. Jul at 11:15
WIAS, Erhard-Schm...
A mediocre two-component variant of the famous result on equilibration in scalar Fokker-Planck equations
Abstract
Thu, 10. Jul at 13:00
Configuration spaces and the chromatic polynomial
Abstract. We study the chromatic configuration space associated to a simple finite graph. This is the complement of the so-called graphic subspace arrangement associated to the graph. Using poset topology, we show that the Poincaré polynomial of the chromatic configuration space is the reciprocal of the chromatic polynomial of the graph (with signs). As an important application, we deduce the homology of spaces of configurations consisting of n>1 moving objects in a euclidean space, distinct or not, each avoiding a given subset of r>0 fixed obstacles.
Fri, 11. Jul at 14:15
FU (T9)
On optimality conditions for nonsmooth functions
Mon, 14. Jul at 13:00
Rudower Chaussee ...
Tue, 15. Jul at 11:15
1.023 (BMS Room, ...
How to freeze elliptic spin Ruijsenaars models
Abstract. The connection between integrable quantum many body systems and spin chains is formed by `freezing', an idea that goes back to Polychronakos. I will discuss a reformulation of freezing in the language of deformation quantisation, that builds on recent work by Mikhailov and Vanhaecke. I will show that there exists an SL(2,Z) famiy of equilibria on which one can freeze, yielding an infinite family of integrable spin chains. Based on work with Jules Lamers.
Wed, 16. Jul at 10:00
Weierstrass-Insti...
Wed, 16. Jul at 11:30
online
Data-Adaptive Discretization of Inverse Problems
Abstract
Wed, 16. Jul at 16:00
Thu, 17. Jul at 10:00
WIAS, Erhard-Schm...
Thu, 17. Jul at 15:00
Lorentzian polynomials and the incidence geometry of tropical linear spaces
Abstract. Tropical linear spaces are complicated. Even the most elementary questions about their incidence geometry can be hard. I will give some answers to three types of such questions that are especially important to other recent advancements. The central object is the moduli space of all codimension-1 tropical linear subspaces of a given tropical linear space. The structure of this moduli space is closely related to the structure of spaces of Lorentzian polynomials. I will show how convexity results about tropical linear spaces can be derived and can be used to derive convexity results about Lorentzian polynomials.
Tue, 29. Jul at 14:00
Rudower Chaussee ...