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Wed, 02. Apr at 16:30
EN 058
When alcoved polytopes add
Abstract. Alcoved polytopes are characterized by the property that all facet normal directions are parallel to the roots e_i - e_j. This fundamental class of polytopes appears in several applications such as optimization, tropical geometry or physics.<br>This talk focuses on the type fan of alcoved polytopes which is the subdivision of the metric cone by combinatorial types of alcoved polytopes. The type fan governs when the Minkowski sum of alcoved polytopes is again alcoved. We prove that the structure of the type fan is governed by its two-dimensional faces and give criteria to study the rays of alcoved simplices.<br>This talk is based on joint work with Nick Early and Leonid Monin.
Thu, 03. Apr at 11:00
Rudower Chaussee ...
Generalized Lorentzian products
Abstract
Tue, 08. Apr at 13:00
ZIB, Room 2006 (S...
Frank-Wolfe for strongly convex sets
Abstract. The Frank-Wolfe method is a classical first-order algorithm for constrained optimization that avoids projections by relying on linear minimization oracles. While extensively studied over polytopes, its behavior over strongly convex domains remains less understood, especially near the boundary. In this talk, we will explore the challenges of optimizing over such sets, with a particular focus on the difficulty of finding optima located on the boundary. Using the simple example of projections onto the L2-ball, we will provide geometric insights into convergence behavior of Frank-Wolfe. This example illustrates fundamental limitations of the method in boundary regimes and motivates further analysis of step size strategies and alternative update directions.
Wed, 09. Apr at 13:00
ZIB, Room 2006 (S...
Koopman von Neumann mechanics
Wed, 16. Apr at 13:00
Minimization on the sphere and cut selection for the Capra-cutting plane method
Wed, 16. Apr at 15:15
WIAS, Erhard-Schm...
Higher regularity for elliptic systems with mixed boundary conditions
Abstract
Wed, 16. Apr at 16:30
EN 058
D-Finite Functions
Abstract. A function is called D-finite if it satisfies a linear differential equations with polynomial coefficients. Such functions play a role in many different areas, including combinatorics, number theory, and mathematical physics. Computer algebra provides many algorithms for dealing with D-finite functions. Of particular importance are operations that preserve D-finiteness. In the talk, we will give an overview over some of these techniques.
Tue, 22. Apr at 11:15
1.023 (BMS Room, ...
W-constraints for the ancestor potential of (r,s)-theta classes
Abstract. Witten’s conjecture, which was proved by Kontsevich, states that the generating series for intersection numbers on the moduli space of curves is a tau-function for the KdV integrable hierarchy. It can be reformulated as the statement that the ancestor potential of the trivial cohomological field theory is the unique solution to a system of differential constraints that form a representation of the Virasoro algebra. In this talk I will present a new generalization of this celebrated result. The object of study becomes the ancestor potential of an interesting set of cohomology classes on the moduli space of curves, called (r,s) theta classes, which form a non-semisimple cohomological field theory. (Here, r is a positive integer and s is a positive integer between 1 and r-1.) The (r,s) theta classes are constructed as the top Chern classes of the Chiodo classes, and can be understood as a higher generalization of the Norbury classes. We show that the ancestor potential is the solution of a system of differential constraints that form a representation of a W-algebra. However, the differential constraints form an Airy structure (and thus uniquely fix the ancestor potential) only in the cases s=1 and s=r-1. An equivalent way of stating this result is that we determine loop equations satisfied by the correlators for all (r,s), but only when s=1 or s=r-1 are the loop equations uniquely solved by (shifted) topological recursion. This talk is based on work in progress with N. K. Chidambaram, A. Giacchetto and S. Shadrin and previous work by many people such as https://arxiv.org/abs/2412.09120, https://arxiv.org/abs/2408.02608, https://arxiv.org/abs/2205.15621, https://arxiv.org/abs/1812.08738, to name a few.
Tue, 22. Apr at 13:00
2.417
Wed, 23. Apr at 11:30
online
Entanglement Detection via Frank-Wolfe Algorithms
Abstract
Wed, 23. Apr at 13:00
ZIB, Room 2006 (S...
Multi-node quantum circuit simulation with decision diagram in HPC
Wed, 23. Apr at 16:30
EN 058
Colored multiset Eulerian polynomials
Abstract. The central objects in this talk are the descent polynomials of colored permutations on multisets, referred to as colored multiset Eulerian polynomials. These polynomials generalize the colored Eulerian polynomials that appear frequently in algebraic combinatorics and are known to admit desirable distributional properties, including real-rootedness, log-concavity, unimodality and the alternatingly increasing property. In joint work with Bin Han and Liam Solus, symmetric colored multiset Eulerian polynomials are identified and used to prove sufficient conditions for a colored multiset Eulerian polynomial to satisfy the self-interlacing property. This property implies that the polynomial obtains all of the aforementioned distributional properties as well as others, including bi-gamma-positivity. To derive these results, multivariate generalizations of a generating function identity due to MacMahon are deduced. The results are applied to a pair of questions, both previously studied in several special cases, that are seen to admit more general answers when framed in the context of colored multiset Eulerian polynomials. The first question pertains to s-Eulerian polynomials, and the second to interpretations of gamma-coefficients. We will see some of these results in detail, depending on the pace of the talk. We may also discuss some connections between multiset permutations and polytopes from algebraic statistics.
Tue, 29. Apr at 11:15
1.023 (BMS Room, ...
Wed, 30. Apr at 15:15
WIAS, Erhard-Schm...
Wed, 30. Apr at 15:45
Rudower Chaussee ...
Wed, 30. Apr at 16:30
EN 058
Wed, 07. May at 11:30
online
A New Approach to Metastability in Multi-Agent Systems
Abstract
Wed, 07. May at 15:15
WIAS, Erhard-Schm...
Tue, 13. May at 11:15
1.023 (BMS Room, ...
Symplectic groupoid and cluster algebras
Abstract. The symplectic groupoid is a set of pairs (B,A) with A unipotent upper-triangular matrices and B in GLn being such that the matrix A~ = BABT is itself unipotent upper triangular. It turned out recently that the problem of description of such pairs can be explicitly solved in terms of Fock--Goncharov--Shen cluster variables; moreover, for B satisfying the standard semiclassical Lie--Poisson algebra, the matrices B, A, and A~ satisfy the closed Poisson algebra relations expressible in the r-matrix form. Since works of J.Nelson, T.Regge and B.Dubrovin, it was known that entries of A can be identified with geodesic functions on Riemann surfaces with holes. In our approach, we are able to construct a complete set of geodesic functions for a closed Riemann surface. We have a complete description for genus two; I'm also about to discuss moduli spaces of higher genera. Based on my joint papers with MIsha Shapiro and our students.
Wed, 14. May at 14:00
WIAS, Erhard-Schm...
Wed, 14. May at 15:30
WIAS, Erhard-Schm...
Fri, 16. May at 09:00
1.023 (BMS Room, ...
Moduli spaces of curves and the classification of integrable systems
Abstract. I will present several results and conjectures on the classification of different classes of integrable systems of evolutionary PDEs, up to the appropriate transformation groups. These include Hamiltonian systems, tau symmetric systems and systems of conservation laws. I will then explain in what sense we expect that integrable systems arising from intersection theory on the moduli space of stable curves are universal objects with respect to these classifications. In the rank one case I will present strong evidence in support of these claims. This is joint work with A. Buryak.
Fri, 16. May at 10:00
1.023 (BMS Room, ...
On the DR/DZ equivalence
Abstract. There are two main recipes to associate to a Cohomological Field Theory (CohFT) an integrable hierarchy of hamiltonian PDEs: the first one was introduced by Dubrovin and Zhang (DZ, 2001), the second by Buryak (DR, 2015). It is interesting to notice that the latter relies on the geometric properties of the Double Ramification cycle — hence the name DR — to work. As soon as the second recipe was introduced, it was conjectured that the two had to be equivalent in some sense, and it was checked in a few examples. In the forthcoming years several papers by Buryak, Dubrovin, Guerè, Rossi and others followed, checking more examples of CohFTs, making the conjecture more precise, proving the conjecture in low genera, and eventually turning the statement of the conjecture in a purely intersection theoretic statement on the moduli spaces of stable curves. Lately, the conjecture was proved in its intersection theoretic form, employing virtual localisation techniques. (j.w.w. Blot, Rossi, Shadrin).
Fri, 16. May at 11:30
1.023 (BMS Room, ...
Leaky Hurwitz numbers and topological recursion
Abstract. Leaky Hurwitz numbers were introduced by Cavalieri-Markwig-Ranganathan by extending the branching morphism from the logarithmic double ramification cycle to its pluricanonical counterpart. These numbers also have a natural interpretation in terms of tropical geometry and yield (non-hypergeometric) KP tau functions. I will explain how to think about these numbers, and how we can extend the recent works of Alexandrov-Bychkov-Dunin-Barkowski-Kazarian-Shadrin to prove (at least blobbed) topological recursion. Along the way, I will interpret the cut-and-join operator as a hamiltonian whose flow generates the spectral curve. This is joint work in progress with M. A. Hahn.
Wed, 21. May at 11:30
online
Demand Strip Packing
Fri, 23. May at 14:15
TU (C 130)
Wed, 04. Jun at 11:30
online
On the Expressivity of Neural Networks
Abstract
Wed, 11. Jun at 15:15
WIAS, Erhard-Schm...
Wed, 18. Jun at 11:30
online
Convolutional Brenier Generative Networks
Abstract
Wed, 18. Jun at 13:00
ZIB, Room 2006 (S...
Bounding geometric penalties in Riemannian optimization
Abstract. Riemannian optimization refers to the optimization of functions defined over Riemannian manifolds. Such problems arise when the constraints of Euclidean optimization problems can be viewed as Riemannian manifolds, such as the symmetric positive-definite cone, the sphere, or the set of orthogonal linear layers for a neural network. This Riemannian formulation enables us to leverage the geometric structure of such problems by viewing them as unconstrained problems on a manifold. The convergence rates of Riemannian optimization algorithms often rely on geometric quantities depending on the sectional curvature and the distance between iterates and an optimizer. Numerous previous works bound the latter only by assumption, resulting in incomplete analysis and unquantified rates. In this talk, I will discuss how to remove this limitation for multiple algorithms and as a result quantify their rates of convergence.
Wed, 02. Jul at 11:30
online
Informing Opinion Dynamics Models with Online Social Network Data
Abstract
Wed, 02. Jul at 15:15
WIAS, Erhard-Schm...
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
Wed, 09. Jul at 15:15
WIAS, Erhard-Schm...
Wed, 16. Jul at 11:30
online
Data-Adaptive Discretization of Inverse Problems
Abstract
Wed, 16. Jul at 15:15
WIAS, Erhard-Schm...