Berlin Math Seminars

Applied Analysis

Mon, 21. Oct at 13:00

Rudower Chaussee ...

Olexandr Burylko Institute of Mathematics, Kyiv, Ukraine

Reversible saddle-node separatrix-loop bifurcation

Combinatorics

Mon, 21. Oct at 14:15

T9/046

Victor Falgas-Ravry Umea University

1-independent percolation on high dimensional lattices

Abstract

Optimization

Mon, 21. Oct at 15:00

Rudower Chaussee ...

Rolf Krause Università della Svizzera italiana

Multilevel methods for non-smooth minimization and variational inequalities

Arithmetic Geometry

Tue, 22. Oct at 13:15

Room 3.006, Rudow...

Jean-Baptiste Teyssier Paris

Boundedness for Betti numbers of étale sheaves in positive characteristic

Abstract.

Let X be a smooth proper variety over an algebraically closed field of characteristic p>0 and let D be a divisor of X. In this talk, we will advertise the existence of bounds for the Betti numbers of a local system L on X-D depending only on local numerical data: the rank of L and the ramification conductors of L at the generic points of D. If time permits, we will explain a consequence of these bounds to a form of the wild Lefschetz theorem envisioned by Deligne. This is joint work with Haoyu Hu.

Optimization

Tue, 22. Oct at 14:00

WIAS HVP5-7 R411 ...

Ioannis Papadopoulos

A semismooth Newton method for obstacle-type quasivariational inequalities

Abstract.

Quasivariational inequalities (QVIs) are ubiquitous but, in particular, arise in PDE-constrained optimization in cases where the constraint set depends on the solution itself. In obstacle-type QVIs, this manifests as an obstacle that bends according to the state of the system. QVIs are notoriously hard to analyze, especially in the infinite-dimensional setting, and developing fast solvers posed in infinite dimensions has proven particularly challenging. As such most solvers in the literature rely on fixed point algorithms which can be slow to converge. In this talk, we introduce the first semismooth Newton method, posed in a Banach space setting, for such problems. We will see that the solver enjoys favourable properties such as local superlinear convergence and mesh independence.

Math. Statistics

Wed, 23. Oct at 10:00

HVP 11 a, R.313

Weining Wang University of Groningen

Conditional nonparametric variable screening by neural factor regression

Abstract.

High-dimensional covariates often admit linear factor structure. To effectively screen correlated covariates in high-dimension, we propose a conditional variable screening test based on non-parametric regression using neural networks due to their representation power. We ask the question whether individual covariates have additional contributions given the latent factors or more generally a set of variables. Our test statistics are based on the estimated partial derivative of the regression function of the candidate variable for screening and a observable proxy for the latent factors. Hence, our test reveals how much predictors contribute additionally to the non-parametric regression after accounting for the latent factors. Our derivative estimator is the convolution of a deep neural network regression estimator and a smoothing kernel. We demonstrate that when the neural network size diverges with the sample size, unlike estimating the regression function itself, it is necessary to smooth the partial derivative of the neural network estimator to recover the desired convergence rate for the derivative. Moreover, our screening test achieves asymptotic normality under the null after finely centering our test statistics that makes the biases negligible, as well as consistency for local alternatives under mild conditions. We demonstrate the performance of our test in a simulation study and two real world applications.

MATH+ Spotlight

Wed, 23. Oct at 11:30

online

Arsen Hnatiuk

An Inexact Generalized Conditional Gradient Method

Abstract

Algebraic Geometry

Wed, 23. Oct at 13:15

Room: 3.007 John ...

Pedro Montero Universidad Técnica Valparaíso

Additive structures on quintic del Pezzo varieties

Abstract.

A classical problem of F. Hirzebruch concerns the classification of compactifications of affine space into smooth projective varieties with Picard rank one. It turns out that any such compactification must be a Fano manifold, i.e., it has an ample anti-canonical divisor. After reviewing some known results, I will focus on the specific case of equivariant compactifications of affine space (i.e., of the "vector group" \(\mathcal{G}_a^n\)), particularly in the case of del Pezzo varieties.<br>We will recall that del Pezzo varieties are a natural higher-dimensional generalization of classical del Pezzo surfaces. Over the field of complex numbers, these varieties were extensively studied by T. Fujita in the 1980s, who classified them by their degree.<br>I will present a result on the existence and uniqueness of "additive structures" on del Pezzo quintic varieties. Specifically, we determine when and how many distinct ways they can be obtained as equivariant compactifications of the commutative unipotent group. As an application, we obtain results on the k-forms of quintic del Pezzo varieties over an arbitrary field k of characteristic zero, as well as for singular quintic varieties. This is a joint work with Adrien Dubouloz and Takashi Kishimoto.

Algebraic Geometry

Wed, 23. Oct at 15:15

Room: 3.007 John ...

Jean Baptiste Teyssier Paris

Probability

Wed, 23. Oct at 16:00

Arno Siri-Jegousse UNAM

Discrete Math

Wed, 23. Oct at 16:30

EN 058

Evgeny Feigin Tel Aviv University

Generalized chain polytopes, Grassmannians and representations

Abstract.

For a finite poset P we introduce a two-parameter family X(m,M) of polytopes defined by the set of inequalities labeled by subposets of P. The polytopes enjoy Minkowski sum property and are important for geometric and algebraic applications. We will discuss the connection of X(m,M) with the geometry of the classical Grassmann varieties. We will also construct a family of representations of the degenerate sl(n) Lie algebra admitting monomial bases labeled by integer points of X(m,M) (for the Grassmann poset P). The talk is based on https://arxiv.org/abs/2403.10074 (joint with Wojciech Samotij).

Villa Seminar

Thu, 24. Oct at 13:00

FUB Villa

Matthew Dupraz FU Berlin

Tropical linear series

Abstract.

Tropicalization is a process that allows us to obtain from algebro-geometric objects combinatorial ones, while preserving many interesting properties. For example, we may tropicalize an algebraic curve to obtain a metric graph, and study divisors on the latter. Surprisingly, certain properties, like the Riemann-Roch theorem stay true for systems of divisors on a metric graph, and so we may wonder just how much are these objects related. In this talk I would like to introduce the tropical analog of linear series, and mention some interesting properties that they exhibit.

IOL Seminar

Thu, 24. Oct at 14:00

Zuse Institute Be...

Ronald de Wolf QuSoft, CWI and University of Amsterdam

Quantum Algorithms for Optimization

Abstract.

Faster algorithms for optimization problems are among the main potential applications for future quantum computers. There has been interesting progress in this area in recent years, for instance improved quantum algorithms for gradient descent and for solving linear and semidefinite programs. In this talk I will survey what we know about quantum speed-ups both for discrete and for continuous optimization, with a bit more detail about two speed-ups I worked on recently: for regularized linear regression and for Principal Component Analysis. I'll also discuss some issues with this line of work, in particular that quadratic or subquadratic quantum speed-ups will only kick in for very large instance sizes and that many of these algorithms require some kind of quantum RAM.

Discrete Math

Fri, 25. Oct at 16:00

EN 058

Bernd Sturmfels MPI-MiS Leipzig

The Two Lives of the Grassmannian

Abstract.

The Grassmannian parametrizes linear subspaces of a real vector space. It is both a projective variety (via Plücker coordinates) and an affine variety (via orthogonal projections). We examine these two representations, through the lenses of linear algebra, commutative algebra, and statistics.

Math. Physics

Tue, 29. Oct at 11:15

1.023 (BMS Room, ...

Bernadette Lessel Bonn Universität

On the early history of quantum gravity

Abstract.

Quantum gravity, in the sense of a formal quantization of general relativity, had a first beginning in the year 1930. That year, the Belgian physicist Léon Rosenfeld published a seminal paper called "Zur Quantelung der Wellenfelder" in which he developed Heisenberg and Pauli's recently constructed method to quantize the electromagnetic field in order to apply it to the tetrad formulation of general relativity. In my talk, I aim to shed light on a perhaps surprising crucial historical influence that made this piece of intellectual work possible: that of unified field theory. A purely classical program, most prominently pursued by Albert Einstein and Hermann Weyl, to formally reduce the (classical) electromagnetic field to the gravitational field as described by general relativity.

Math. Statistics

Wed, 30. Oct at 10:00

HVP 11 a, R.313

Olga Klopp ESSEC Business School, Paris

Langenbach

Wed, 30. Oct at 14:15

WIAS, Erhard-Schm...

Tomáš Roubíček Charles University Prague and Inst. of Thermomechanics, Czech Acad. Sci.

Time discretization in visco-elastodynamics at large displacements and strains in the Eulerian frame

Abstract

Discrete Math

Wed, 30. Oct at 16:30

EN 058

Rainer Sinn Leipzig University

Positive Geometry in the plane

Abstract.

I want to introduce positive geometries in the plane and discuss examples from discrete, convex, and algebraic geometry. There are open problems in this relatively simple case already and I will present one. This is mostly based on joint work with Kathlén Kohn, Ragni Piene, Kristian Ranestad, Felix Rydell, Boris Shapiro, Miruna-Stefana Sorea, and Simon Telen.

Villa Seminar

Thu, 31. Oct at 14:00

FUB Villa

Sebastian Meyer

MATH+ Friday

Fri, 01. Nov at 14:15

TU (C130)

Heather Harrington MPI Dresden

Topology Data Analysis for Multiscale Biology

Math. Physics

Tue, 05. Nov at 11:15

1.023 (BMS Room, ...

Guilherme Feitosa de Almeida Hannover Universität

1D Landau-Ginzburg superpotential of big quantum cohomology of CP2

Abstract.

Using the inverse period map of the Gauss-Manin connection associated with QH∗(CP2) and the Dubrovin construction of Landau-Ginzburg superpotential for Dubrovin Frobenius manifolds, we construct a one-dimensional Landau-Ginzburg superpotential for the quantum cohomology of CP2. In the case of small quantum cohomology, the Landau-Ginzburg superpotential is expressed in terms of the cubic root of the j-invariant function. For big quantum cohomology, the one-dimensional Landau-Ginzburg superpotential is given by Taylor series expansions whose coefficients are expressed in terms of quasi-modular forms. Furthermore, we express the Landau-Ginzburg superpotential for both small and big quantum cohomology of QH∗(CP2) in closed form as the composition of the Weierstrass ℘-function and the universal coverings of C \ (Z ⊕ jZ) and C \ (Z ⊕ zZ) respectively. This seminar is based on the results of arXiv/2402.09574.

MATH+ Spotlight

Wed, 06. Nov at 11:30

online

Ioannis Papadopoulos

Computing Multiple Solutions of Topology Optimization Problems

Probability

Wed, 06. Nov at 16:00

David Hobson U of Warwick

Discrete Math

Wed, 06. Nov at 16:30

EN 058

Anna Zamojska-Dzienio Warsaw University of Technology

Villa Seminar

Thu, 07. Nov at 14:00

FUB Villa

Alex Black

Stochastic Analysis

Thu, 07. Nov at 16:15

TU Berlin, Instit...

David Hobson University of Warwick

Stochastic Analysis

Thu, 07. Nov at 17:15

TU Berlin, Instit...

Johannes Muhle-Karbe Imperial College London

Math. Physics

Tue, 12. Nov at 11:15

1.023 (BMS Room, ...

Gernot Akemann Bielefeld Universität

Universality classes in non-Hermitian random matrices

Algebraic Geometry

Wed, 13. Nov at 13:15

Room: 3.007 John ...

Alessandro Verra Università Roma Tre

Langenbach

Wed, 13. Nov at 14:15

WIAS, Erhard-Schm...

Lukas Abel HUB

A scaling law for a model of epitaxial growth with dislocations

Abstract

Villa Seminar

Thu, 14. Nov at 14:00

FUB Villa

Enrico Bortoletto and Berenike Masing

MATH+ Friday

Fri, 15. Nov at 14:15

HU (ESZ, 0'115 an...

Ana Maria Botero U Bielefeld and José Ignacio Burgos Gil ICMAT and Jean-Benoît Bost U Paris XI and Maryna Viazovska EPFL

A Day of Arithmetic Geometry (on the occasion of the retirement of Jürg Kramer)

Zuse Research

Tue, 19. Nov at 11:00

ZIB Lecture Hall

Stefan Volkwein

Certified Reduced-Order Methods for Model Predictive Control of Time-Varying Evolution Processes

Abstract.

In this talk model predictive control (MPC) is utilized to stabilize a class of linear time-varying parabolic partial differential equations (PDEs). In our first example the control input is only finite-dimensional, i.e., it enters as a time-depending linear combination of finitely many indicator functions whose total supports cover only a small part of the spatial domain. In the second example the PDE involve switching coefficient functions. We discuss stabilizability and the application of reduced-order models to derive algorithms with closed-loop guarantees. <p>This is joint work with , and Benjamin Unger (Stuttgart).</p>

Math. Physics

Tue, 19. Nov at 11:15

1.023 (BMS Room, ...

Guillaume Baverez Aix-Marseille Université

Uniqueness of Malliavin-Kontsevich-Suhov measures

Abstract.

About 20 years ago, Kontsevich & Suhov conjectured the existence and uniqueness of a family of measures on the set of Jordan curves, characterised by conformal invariance and another property called 'conformal restriction'. This conjecture was motivated by (seemingly unrelated) works of Schramm, Lawler & Werner on stochastic Loewner evolutions (SLE), and Malliavin, Airault & Thalmaier on 'unitarising measures'. The existence of this family was settled by works of Werner-Kemppainen and Zhan, using a loop version of SLE. The uniqueness was recently obtained in a joint work with Jego. I will start by reviewing the different notions involved before giving some ideas of our proof of uniqueness: in a nutshell, we construct a family of 'orthogonal polynomials' which completely characterise the measure. In the remaining time, I will discuss the broader context in which our construction fits, namely the conformal field theory associated with SLE.

Arithmetic Geometry

Tue, 19. Nov at 13:15

Room 3.006, Rudow...

Ya Deng Nancy

Euler Characteristic of Algebraic Varieties

Abstract.

This talk is based on joint works with Botong Wang. A conjecture by Chern-Hopf-Thurston states that an aspherical closed real n-manifold \(X\) satisfies \( (-1)^n\chi(X) \geq 0 \), where \( \chi(X) \) denotes the Euler characteristic of \(X\). I will focus on the case where \(X\) has the structure of a complex algebraic variety, which implies that \(X\) has large fundamental group. Inspired by this, in 1995, Kollár proposed the following conjecture: a complex projective manifold \(X\) satisfies \(\chi(K_X) \geq 0\) if it has generically large fundamental group. In this talk, I will outline the proofs of both conjectures under the assumption that \(\pi_1(X)\) is linear.

Math. Statistics

Wed, 20. Nov at 10:00

HVP 11 a, R.313

Bernhard Stankewitz Universität Potsdam

MATH+ Spotlight

Wed, 20. Nov at 11:30

online

Martin Winter Dirichlet Postdoc

Of Rigid and Flexible Polytopes

Probability

Wed, 20. Nov at 16:00

Julia Komjathy TU Delft