Idisplays

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Julia Moudden

Ralf Schindler: Das erste Hilbertsche Problem nach 126 Jahren

Saturday, 04.07.2026 11:00 im Raum per Aushang

Mathematik und Informatik

Im Rahmen des Alumni-Tages hält Prof. Dr. Ralf Schindler einen Vortrag. Abstract: Das erste der im Rahmen des ICM-Vortrags von David Hilbert im Jahre 1900 vorgestellten Probleme fragte, wieviele reelle Zahlen es gäbe. Ist Cantors Kontinuumshypothese wahr? Diese Frage war seither Ansporn und Triebkraft mathematischer Grundlagenforschung. Durch neuere Ergebnisse ist das Problem wieder in den Fokus der Forschung gerückt. Interessierte sind herzlich willkommen!



Angelegt am 05.05.2026 von Julia Moudden
Geändert am 05.05.2026 von Julia Moudden
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Sonstige Vorträge
Highlights des FB10
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Anke Pietsch

Tea Seminar: Bianca Firmbach ( University of Muenster): On the Uniqueness of the Topology of SL2(Qp).

Thursday, 02.07.2026 10:15 im Raum SR1D

Mathematik und Informatik

A central question in the theory of automatic continuity is whether the topology of a topological group is uniquely determined by its algebraic structure. My PhD project investigates this question in the setting of p-adic Lie groups. In this talk, I will discuss the group SL2(Qp) as a first example. We will see that SL2(Qp) admits a unique topology, and I will outline the strategy used to prove this result



Angelegt am 29.06.2026 von Anke Pietsch
Geändert am 29.06.2026 von Anke Pietsch
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Oberseminare und sonstige Vorträge
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Claudia Giesbert

Oberseminar Stochastik: Dr. Francesco Deangelis (Universität Münster): Stochastic homogenization of fractional obstacle problems

Wednesday, 01.07.2026 16:00 im Raum SRZ 216/217

Mathematik und Informatik

Nonlocal energies, such as fractional Sobolev seminorms, arise naturally in mathematical models involving long-range interactions. In this talk, we consider minimizers of such energies vanishing on a set of obstacles with random positions and sizes. This leads to what is commonly called the (bilateral) fractional obstacle problem. Our goal is to obtain a simplified description of the problem in the limit of many obstacles of small average size. Homogenization results of this type are known in both deterministic and random settings, but existing results in the random case typically rely on strong structural assumptions. I will present a new homogenization result that works under substantially weaker hypotheses. The obstacles may be generated by a broad class of spatial random models, allowing both their locations and their sizes to vary in a quite general way. In particular, obstacles are allowed to overlap, giving rise to a complex microstructure. The analysis identifies the limit of the energies and highlights how this reflects the probability distribution of the obstacles. The talk will be kept at an elementary level, starting with the classical local setting based on Poisson?s equation and then transitioning to the nonlocal framework, where the Laplace operator is replaced by its fractional counterpart.



Angelegt am 29.06.2026 von Claudia Giesbert
Geändert am 29.06.2026 von Claudia Giesbert
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Oberseminare und sonstige Vorträge
Stochastik
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Elke Enning

Christoph Winges (Regensburg): The deformation theory of E_1-groups. Oberseminar Topologie.

Monday, 06.07.2026 14:15 im Raum SRZ 216/217

Mathematik und Informatik

I will explain the result of applying Lurie?s tangent complex formalism to the infinity-category of E_1-groups, and how the resulting deformation-theoretic notions relate to classical concepts in algebraic topology.



Angelegt am 13.04.2026 von Elke Enning
Geändert am 30.06.2026 von Elke Enning
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Oberseminare und sonstige Vorträge
Vorträge des SFB 1442
Veranstaltungen am Mathematischen Institut
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Sandra Huppert

Oberseminar Differentialgeometrie: Lucía Martín-Merchán (HU Berlin), Vortrag: Compact holonomy G? manifolds need not be formal

Monday, 06.07.2026 16:15 im Raum SRZ 216

Mathematik und Informatik

Abstract: Within Berger?s classification of holonomy groups, G? is the distinguished case in dimension seven, and a G?-holonomy metric determines a parallel 3-form. As in other special geometries, the existence of such metrics imposes topological constraints on compact manifolds; analogues in Kähler geometry include the hard Lefschetz property, the Hodge decomposition, and formality. Formality, first discovered as a property of compact Kähler manifolds by Deligne, Griffiths, Morgan, and Sullivan in 1975, depends on the rational homotopy type of a manifold. Subsequent results lead to the conjecture that special and exceptional holonomy manifolds should be formal. In this talk, we discuss the only counterexample known to date: a compact holonomy G? manifold that is not formal.



Angelegt am 12.03.2026 von Sandra Huppert
Geändert am 08.06.2026 von Sandra Huppert
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Oberseminare und sonstige Vorträge
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Anke Pietsch

Oskar Schiller (Universität Hamburg): tba

Tuesday, 07.07.2026 12:00 im Raum 503

Mathematik und Informatik

tba



Angelegt am 08.04.2026 von Anke Pietsch
Geändert am 21.04.2026 von Anke Pietsch
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Oberseminare und sonstige Vorträge