1. Non-parametric mean curvature flow with prescribed contact angle in Riemannian products
- Author
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Jean-Baptiste Casteras, Esko Heinonen, Ilkka Holopainen, Jorge H. De Lira, Department of Mathematics and Statistics, and Geometric Analysis and Partial Differential Equations
- Subjects
Mathematics - Differential Geometry ,Applied Mathematics ,Mean curvature flow ,differentiaaligeometria ,mean curvature flow ,Differential Geometry (math.DG) ,FOS: Mathematics ,111 Mathematics ,Geometry and Topology ,Mathematics::Differential Geometry ,prescribed contact angle ,translating graphs ,53C21, 53E10 ,Analysis - Abstract
Assuming that there exists a translating soliton $u_\infty$ with speed $C$ in a domain $\Omega$ and with prescribed contact angle on $\partial\Omega$, we prove that a graphical solution to the mean curvature flow with the same prescribed contact angle converges to $u_\infty +Ct$ as $t\to\infty$. We also generalize the recent existence result of Gao, Ma, Wang and Weng to non-Euclidean settings under suitable bounds on convexity of $\Omega$ and Ricci curvature in $\Omega$., Comment: This replaces the previous versions. We have added Remark 1.2, Theorem 1.3 and its proof in Section 3
- Published
- 2022