Zoom-Meeting: https://wwu.zoom.us/j/97461739978
Abstract: Abstract: The soap bubble theorem says that a closed, embedded surface of the Euclidean space with constant mean curvature must be a round sphere. Especially in real-life problems it is of importance whether and to what extent this phenomenon is stable, i.e. when a surface with almost constant mean curvature is close to a sphere. This problem has been receiving lots of attention until today. The purpose of this talk is to discuss further problems of this type and to provide two approaches to their solution. The first one is a new general approach based on stability of the so-called "Nabelpunktsatz". The second one is of variational nature and employs the theory of curvature flows.
Angelegt am Wednesday, 23.09.2020 10:25 von Sandra Huppert
Geändert am Friday, 06.11.2020 07:17 von Frank Wübbeling
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