- Convergence of the Helfrich flow of closed surfaces
- Free boundary problems for the elastic flow
- Convergence of the Willmore flow of rotationally invariant surfaces with and without boundary
- Minimization of Willmore-type energies of surfaces with prescribed boundary
Manuel Schlierf
Publications and Preprints
On Google Scholar >> | On Researchgate >>
[5] F. Rupp, C. Scharrer and M. Schlierf. Gradient flow dynamics for cell membranes in the Canham-Helfrich model (preprint)
[4] M. Schlierf. Introducing spontaneous curvature to the Helfrich flow: Singularities and convergence (preprint)
[3] M. Schlierf. Global existence for the Willmore flow with boundary via Simon's Li-Yau inequality (preprint)
[2] M. Schlierf. Singularities of the hyperbolic elastic flow: Convergence, quantization and blow-ups (preprint | journal)
[1] M. Schlierf. On the convergence of the Willmore flow with Dirichlet boundary conditions (preprint | journal)
Teaching
- WiSe 2021/22 Maßtheorie
- WiSe 2021/22 Analysis 3
- SoSe 2022 Analysis 1
- SoSe 2023 Analysis 2
- WiSe 2023/24 Advanced Topics in PDEs
Education
- Mathematics and Management (B.Sc.) - Ulm University (2016-2019)
- Mathematics (M.Sc.) - Ulm University (2019 - 2021)
- Mathematics (M.Sc.) - Syracuse University (2020 - 2021)
By appointment.
Contact details
Address: Helmholtzstraße 18
Room: E.24
Phone: 0731/ 50-23523
E-mail: manuel.schlierf(at)uni-ulm.de
Ph.D. student of Anna Dall'Acqua
Doctoral scholarship from the Studienstiftung des Deutschen Volkes