CRC 1442 - Geometric evolution equations
Basic data for this project
Type of project: Subproject in DFG-joint project hosted at University of Münster
Duration at the University of Münster: 01/07/2020 - 30/06/2024 | 1st Funding period
Description
Hamilton’s Ricci flow is a geometric evolution equation on the space of Riemannian metrics of a smooth manifold. In a first subproject we would like to show a differentiable stability result for noncollapsed converging sequences of Riemannian manifolds with nonnegative sectional curvature, generalising Perelman’s topological stability. In a second subproject, next to classifying homogeneous Ricci solitons on non-compact homogeneous spaces, we would like to prove the dynamical Alekseevskii conjecture. Finally, in a third subproject we would like to find new Ricci flow invariant curvature conditions, a starting point for introducing a Ricci flow with surgery in higher dimensions.
Keywords: Differential Geometry; Analysis; Mathematics
Website of the project: https://www.uni-muenster.de/MathematicsMuenster/CRC-Geometry/research/projects/b02.html
DFG-Gepris-ID: https://gepris.dfg.de/gepris/projekt/444017888
Funding identifier: SFB 1442/1, B02 | DFG project number: 427320536
Funder / funding scheme:
- DFG - Collaborative Research Centre (SFB)
Project management at the University of Münster
| Böhm, Christoph | Professur für Theoretische Mathematik (Prof. Böhm) |
| Wilking, Burkhard | Professur für Differentialgeometrie (Prof. Wilking) |
Applicants from the University of Münster
| Böhm, Christoph | Professur für Theoretische Mathematik (Prof. Böhm) |
| Wilking, Burkhard | Professur für Differentialgeometrie (Prof. Wilking) |