Oberseminar Differentialgeometrie: Prof. Dr. Julian Scheuer (Goethe Universität Frankfurt), Vortrag: Mean curvature flow in null hypersurfaces
Monday, 14.04.2025 16:15 im Raum SRZ 216
A hypersurface of a Lorentzian manifold is called null, if its induced metric is degenerate. In such geometries, classical some geometric concepts are unavailable and for this reason there is little knowledge about curvature flows in such spaces. Building upon a definition of mean curvature flow I developed with Henri Roesch few years ago, we extend and improve the analysis to constrained mean curvature flows, which will then enable us to foliate large classes of null hypersurfaces by surfaces of constant spacetime mean curvature. This is joint work with Wilhelm Klingenberg (Durham) and Ben Lambert (Leeds).
Angelegt am 27.03.2025 von Anke Pietsch
Geändert am 27.03.2025 von Anke Pietsch
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Oberseminar Differentialgeometrie: Prof. Dr. Julian Scheuer (Goethe Universität Frankfurt), Vortrag: tba
Monday, 14.04.2025 16:15 im Raum SRZ 216
A hypersurface of a Lorentzian manifold is called null, if its induced metric is degenerate. In such geometries, classical some geometric concepts are unavailable and for this reason there is little knowledge about curvature flows in such spaces. Building upon a definition of mean curvature flow I developed with Henri Roesch few years ago, we extend and improve the analysis to constrained mean curvature flows, which will then enable us to foliate large classes of null hypersurfaces by surfaces of constant spacetime mean curvature. This is joint work with Wilhelm Klingenberg (Durham) and Ben Lambert (Leeds).
Angelegt am 18.02.2025 von Anke Pietsch
Geändert am 27.03.2025 von Anke Pietsch
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Keivan Mallahi Karei (Constructor University Bremen): Random free semigroups of affine transformations. Oberseminar C*-Algebren.
Tuesday, 06.05.2025 16:15 im Raum tba.
The question of the existence of free subgroups in a given group traces back to a problem posed by von Neumann. When such subgroups exist, their genericity has been the focus of extensive research. In this talk, we formulate and investigate a version of the genericity question for subgroups of the affine group over a field of characteristic zero. Let $G$ denote the affine group over a field $F$, and let $\mu$ be a probability measure on $G \times G$. Consider the left or right random walk $(X_n, Y_n)$ on $G \times G$ driven by $\mu$. I will discuss several results on conditions under which the semigroup generated b $X_n$, $Y_n$ is free, either eventually or infinitely often. The talk is based on a work in progress with Richard Aoun.
Angelegt am 07.04.2025 von Elke Enning
Geändert am 07.04.2025 von Elke Enning
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