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Wed, 06. Nov at 10:00
WIAS Erhard-Schmi...
Wed, 06. Nov at 11:30
online
A Semismooth Newton Method for Obstacle-Type Quasivariational Inequalities
Abstract
Wed, 06. Nov at 13:15
Room: 3.007 John ...
On the Andre-Pink-Zannier conjecture and its generalisations
Abstract. This is a joint work with Rodolphe Richard (Manchester). The Andre-Pink-Zannier conjecture is a case of Zilber-Pink conjecture on unlikely intersections in Shimura varieties. We will present this conjecture and a strategy for proving it as well as its proof for Shimura varieties of abelian type. In the second talk we present a "hybrid conjecture" combining the recently proved Andre-Oort conjecture and Andre-Pink-Zannier. It is motivated by its analogy with Mordell-Lang for abelian varieties. We will explain this analogy as well as the proof of the hybrid conjecture for Shimura varieties of abelian type. (This is the second talk, the first one taking place on Tuesday at the Arithmetic Geometry Seminar).
Wed, 06. Nov at 16:00
Wed, 06. Nov at 16:00
Wed, 06. Nov at 16:30
EN 058
Algebraic approach to barycentric coordinates
Abstract. Barycentric coordinates provide solutions to the problem of expressing an element of a compact convex set as a convex combination of a finite number of extreme points of the set. They have been studied widely within the geometric literature, typically in response to the demands of numerical analysis and computer graphics. In this talk we bring an algebraic perspective to the problem, based on barycentric algebras. We present some recent results obtained together with A. Romanowska and J.D.H Smith.
Thu, 07. Nov at 14:00
Thu, 07. Nov at 16:15
TU Berlin, Instit...
Portfolio optimization under transaction costs with recursive preferences
Abstract. The solution to the investment-consumption problem in a frictionless Black-Scholes market for an investor with additive CRRA preferences is to keep a constant fraction of wealth in the risky asset. But this requires continuous adjustment of the portfolio and as soon as transaction costs are added, any attempt to follow the frictionless strategy will lead to immediate bankruptcy. Instead as many authors have proposed the optimal solution is to keep the pair (cash, value of risky assets) in a no-transaction (NT) wedge. We return to this problem to see what we can say about: When is the problem well-posed? Where does the NT wedge lie? How do the results change if we use recursive preferences? We introduce the shadow fraction of wealth and show how we can make significant progress towards the solution by focussing on this quantity. Indeed many of the qualitative features of the solution can described by looking at a quadratic whose parameters depend on the parameters of the problem. This is joint work with Martin Herdegen and Alex Tse.
Thu, 07. Nov at 17:15
TU Berlin, Instit...
Concave Cross Impact
Abstract. The price impact of large orders is well known to be a concave function of trade size. We discuss how to extend models consistent with this “square-root law” to multivariate settings with cross impact, where trading each asset also impacts the prices of the others. In this context, we derive consistency conditions that rule out price manipulation. These minimal conditions make risk-neutral trading problems tractable and also naturally lead to parsimonious specifications that can be calibrated to historical data. We illustrate this with a case study using proprietary CFM meta order data. (Joint work in progress with Natascha Hey and Iacopo Mastromatteo)
Fri, 08. Nov
Burning game
Tue, 12. Nov at 11:15
1.023 (BMS Room, ...
Three universality classes in non-Hermitian random matrices
Abstract. Non-Hermitian random matrices with complex eigenvalues have important applications, for example in open quantum systems in their chaotic regime. It has been conjectured that amongst all 38 symmetry classes of non-Hermitian random matrices only 3 different local bulk statistics exist. This conjecture has been based on numerically generated nearest-neighbour spacing distributions between complex eigenvalues so far. In this talk I will present first analytic evidence for this conjecture. It is based on expectation values of characteristic polynomials in the three simplest representatives for these statistics: the well-known Ginibre ensemble of complex normal matrices, complex symmetric and complex self-dual random matrices. After giving a basic introduction into the complex eigenvalue statistics of the Ginibre ensemble, I will present results for all three ensembles for finite matrix size N as well as in various large-N limits. These are expected to be universal, that is valid beyond ensembles with Gaussian distribution of matrix elements. This paper is based on joint work with Noah Aygün, Mario Kieburg and Patricia Päßler in arXiv/2410.21032
Wed, 13. Nov at 13:15
Room: 3.007 John ...
Wed, 13. Nov at 14:15
WIAS, Erhard-Schm...
A scaling law for a model of epitaxial growth with dislocations
Abstract
Wed, 13. Nov at 16:30
EN 058
Cyclic polytopes through the lens of iterated integrals
Abstract. The volume of a cyclic polytope P can be obtained as a linear combination of iterated integrals along any convex piecewise linear path running through the edges of P. We explore the question what other functions on the set of cyclic (or more precisely, alternating) polytopes arise as iterated integrals in this way. In fact, we show that there are infinitely many such features which are algebraically independent. We obtain descriptive rings of functions on the set of alternating d-polytopes with n vertices, compatible with restrictions to subpolytopes.
Thu, 14. Nov at 10:00
WIAS HVP5-7 R411 ...
Free boundary problems as limits of a bulk-surface model for receptor-ligand interactions on evolving domains
Abstract. We derive various free boundary problems as reaction or singular limits of a coupled bulk-surface reaction-diffusion system on an evolving domain. These limiting free boundary problems may be formulated as Stefan-type problems on an evolving hypersurface. These results, which are new even in the setting where there is no domain evolution, are of particular relevance to an application in cell biology. In this talk, I will discuss the modelling, sketch the analysis, show some numerical simulations and finish with some open questions. Based on a joint work with Charlie Elliott, Chandrasekhar Venkataraman and Diogo Caetano.
Thu, 14. Nov at 14:00
Fri, 15. Nov at 14:15
HU (ESZ, 0'115 an...
A Day of Arithmetic Geometry (on the occasion of the retirement of Jürg Kramer)
Abstract
Tue, 19. Nov at 11:00
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>
Tue, 19. Nov at 11:15
1.023 (BMS Room, ...
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.
Tue, 19. Nov at 13:15
Room 3.006, Rudow...
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.
Wed, 20. Nov at 10:00
HVP 11 a, R.313
Wed, 20. Nov at 11:30
online
Rigidity and Reconstruction of Convex Polytopes via Wachspress Geometry
Abstract
Wed, 20. Nov at 16:00
Thu, 21. Nov at 14:00
Thu, 21. Nov at 16:15
TU Berlin, Instit...
Wed, 27. Nov at 10:00
HVP 11 a, R.313
Fri, 29. Nov at 14:15
Urania
Undecidable problems in group theory
Wed, 04. Dec at 11:30
online
Calabi-Yau 3-Folds with Boundary
Wed, 04. Dec at 16:00
Wed, 04. Dec at 16:00
Thu, 05. Dec at 17:15
TU Berlin, Instit...
Wed, 11. Dec at 14:15
WIAS, Erhard-Schm...
Thu, 12. Dec at 14:00
Thu, 12. Dec at 16:00
BEL 301
Thesis defense
Abstract. Thesis defense Dante Luber
Fri, 13. Dec at 14:15
FU
Wed, 18. Dec at 11:30
online
Computational Aspects of Quadratic Forms in Determining the Representation Type of Quiver Algebras
Wed, 18. Dec at 16:00
Wed, 18. Dec at 16:00
Thu, 09. Jan at 14:00
Fri, 10. Jan at 14:15
FU
Fri, 10. Jan at 14:15
FU
Wed, 15. Jan at 11:30
online
Data Transmission in Dynamical Random Networks
Abstract
Wed, 15. Jan at 11:30
online
Data Transmission in Dynamical Random Networks
Abstract
Tue, 21. Jan at 11:15
1.023 (BMS Room, ...
Wed, 22. Jan at 14:15
WIAS, Erhard-Schm...
Wed, 29. Jan at 11:30
online
Coherent Transport of Semiconductor Spin-Qubits: Modeling, Simulation and Optimal Control
Abstract
Thu, 30. Jan at 17:15
TU Berlin, Instit...
Robust Portfolio Selection Under Recovery Average Value at Risk
Abstract. We study mean-risk optimal portfolio problems where risk is measured by Recovery Average Value at Risk, a prominent example in the class of recovery risk measures. We establish existence results in the situation where the joint distribution of portfolio assets is known as well as in the situation where it is uncertain and only assumed to belong to a set of mixtures of benchmark distributions (mixture uncertainty) or to a cloud around a benchmark distribution (box uncertainty). The comparison with the classical Average Value at Risk shows that portfolio selection under its recovery version allows financial institutions to better control the recovery of liabilities while still allowing for tractable computations. The talk is based on joint work with Cosimo Munari, Justin Plückebaum and Lutz Wilhelmy.
Tue, 04. Feb at 11:15
1.023 (BMS Room, ...
Bi-Hamiltonian geometry of WDVV equations: general results
Abstract. It is known (work by Ferapontov and Mokhov) that a system of N-dimensional WDVV equations can be written as a pair of N-2 commuting quasilinear systems (first-order WDVV systems). In recent years, particular examples of such systems were shown to possess two compatible Hamiltonian operators, of the first and third order. It was also shown that all $3$-dimensional first-order WDVV systems possess such bi-Hamiltonian formalism. We prove that, for arbitrary N, if one first-order WDVV system has the above bi-Hamiltonian formalism, than all other commuting systems do. The proof needs some interesting results on the structure of the WDVV equations that will be discussed as well. (Joint work with S. Opanasenko).
Wed, 12. Feb at 11:30
online
Hybrid Models for Large Scale Infection Spread Simulations
Abstract