Math Calendar
Tuesday, April 29, 2025
10:00-11:00
HFG 707
AG Seminar
Shizang Li (Chinese Academy of Sciences) on "u-power torsions of prismatic cohomology"
see description
Abstract: In this talk, we will explain relation between u-power torsions in Breuil--Kisin prismatic cohomology and various pathologies in p-adic cohomology theories, as well as mention some new results. Part of the talk will be based on earlier joint works with Tong Liu, we shall also report some recent ongoing projects with Ofer Gabber and Alexander Petrov separately.
Wednesday, April 30, 2025
14:00-16:00
HFG 7.07
Friday, May 2, 2025
13:00-15:00
HFG 707
Friday Fish
Guillermo Sánchez - h-principles for Holomorphic Partial Differential Relations in Stein Manifolds
see description
The goal of the h-principle theory is to understand when a geometric problem is governed by the laws of differential topology. When topology (more flexible) overrides geometry (more rigid), we say that the h-principle holds in that context.
The identity principle and the resulting lack of partitions of unity endow complex geometry with great rigidity. However, there is a class of complex manifolds—Stein manifolds—in which the Oka principle, a type of h-principle for holomorphic functions, holds. The flexible properties of Stein manifolds have been exploited by F. Forstnerič and M. Slapar to establish h-principles for holomorphic immersions and submersions, and by F. Forstnerič for complex contact forms. In this talk, we will explore how these techniques can be abstracted to obtain more general h-principles in this type of complex manifolds.
The identity principle and the resulting lack of partitions of unity endow complex geometry with great rigidity. However, there is a class of complex manifolds—Stein manifolds—in which the Oka principle, a type of h-principle for holomorphic functions, holds. The flexible properties of Stein manifolds have been exploited by F. Forstnerič and M. Slapar to establish h-principles for holomorphic immersions and submersions, and by F. Forstnerič for complex contact forms. In this talk, we will explore how these techniques can be abstracted to obtain more general h-principles in this type of complex manifolds.
Tuesday, May 6, 2025
16:00-17:00
HFG 611
UGC colloquium
Jared Wunsch (Northwestern University) - Propagation of waves with low regularity
see description
The connection between solutions to wave equations and dynamics of particles, known variously in different contexts as the method of geometric optics, the WKB approximation, and Bohr's Correspondence Principle, becomes tenuous in the presence of singularities of the physical potential or underlying geometry. I will describe what we know about diffractive corrections to wave equation solutions, as well as some of their consequences in spectral and scattering theory.
UGC seminar webpage https://utrechtgeometrycentre.nl/ugc-seminar/
UGC seminar webpage https://utrechtgeometrycentre.nl/ugc-seminar/
Wednesday, May 7, 2025
14:00-16:00
HFG 7.07
Friday, May 9, 2025
11:00-16:15
JKH 2-3, Room 220
Mark Kac seminar in mathematical physics and probability with Nathanael Berestycki (U Vienna)
see description
Title: On the spectral geometry of Liouville quantum gravity.
Abstract:
In these talks we will discuss the spectral geometry of the Laplace-Beltrami operator associated to Liouville quantum gravity. Over the course of two lectures, our goals will be to:
- Explain how eigenvalues and eigenfunctions for LQG are defined;
- Show that the eigenvalues a.s. obey a Weyl law (joint work with Mo Dick Wong). This is closely related to the short time asymptotics of the LQG heat kernel;
- Discuss the second term in the Weyl law and its relation to the KPZ (Knizhnik-Polyakov-Zamolodchikov) scaling relation;
- Finally we will talk about some conjectures which suggest a rather beautiful connection to a phenomenon called quantum chaos.
Monday, May 12, 2025
Tuesday, May 13, 2025
Wednesday, May 14, 2025
08:30-17:00
Ruppert B
VBAC website: https://vbac-2025.ncag.info/
14:00-16:00
HFG 7.07
Thursday, May 15, 2025
08:30-17:00
Bolognalaan 101, room 1.204
VBAC website: https://vbac-2025.ncag.info/
Friday, May 16, 2025
Tuesday, May 20, 2025
Wednesday, May 21, 2025
14:00-16:00
HFG 7.07
Monday, May 26, 2025
13:00-14:30
To be determined
Tuesday, May 27, 2025
Wednesday, May 28, 2025
Tuesday, June 3, 2025
Wednesday, June 4, 2025
14:00-16:00
HFG 7.07
Tuesday, June 10, 2025
Monday, June 16, 2025
Tuesday, June 17, 2025
Tuesday, June 24, 2025
16:15-17:15
Utrecht University Hall, Domplein 29, 3512 JE Utrecht, Netherlands
Tuesday, July 1, 2025
Tuesday, July 8, 2025
Tuesday, July 15, 2025
Tuesday, July 29, 2025
Tuesday, August 12, 2025
Tuesday, August 26, 2025
Tuesday, September 9, 2025
Thursday, September 18, 2025
13:00-14:00
Host: Wioletta Ruszel
Title: Extremes in dynamical systems: max-stable and max-semistable laws
Abstract:
Extreme value theory for chaotic, deterministic dynamical systems is a rapidly expanding area of research. Given a dynamical system and a real-valued observable defined on its state space, extreme value theory studies the limit probabilistic laws for asymptotically large values attained by the observable along orbits of the system. Under suitable mixing conditions the extreme value laws are the same as those for stochastic processes of i.i.d. random variables.
Max-stable laws typically arise for probability distributions with regularly varying tails. However, in the context of dynamical systems, where the underlying invariant measure can be irregular, max-semistable distributions also have a natural place in studying extremal behaviour. In this talk I will first discuss a family of autoregressive processes with marginal distributions resembling the Cantor function. The resulting extreme value law can be proven to be a max-semistable distribution. Alternatively, we can describe the autoregressive process in terms of an iterated map with an invariant measure. Further examples of extreme value laws in dynamical systems are discussed as well.
Title: Extremes in dynamical systems: max-stable and max-semistable laws
Abstract:
Extreme value theory for chaotic, deterministic dynamical systems is a rapidly expanding area of research. Given a dynamical system and a real-valued observable defined on its state space, extreme value theory studies the limit probabilistic laws for asymptotically large values attained by the observable along orbits of the system. Under suitable mixing conditions the extreme value laws are the same as those for stochastic processes of i.i.d. random variables.
Max-stable laws typically arise for probability distributions with regularly varying tails. However, in the context of dynamical systems, where the underlying invariant measure can be irregular, max-semistable distributions also have a natural place in studying extremal behaviour. In this talk I will first discuss a family of autoregressive processes with marginal distributions resembling the Cantor function. The resulting extreme value law can be proven to be a max-semistable distribution. Alternatively, we can describe the autoregressive process in terms of an iterated map with an invariant measure. Further examples of extreme value laws in dynamical systems are discussed as well.
Tuesday, September 23, 2025
Tuesday, October 7, 2025
Tuesday, October 21, 2025