Non-Parametric Mean Curvature Flow with Prescribed Contact Angle in Riemannian Products

Casteras Jean-Baptiste; Heinonen Esko; Holopainen Ilkka; De Lira Jorge H.

doi:10.1515/agms-2020-0132

Analysis and Geometry in Metric Spaces (Mar 2022)

Non-Parametric Mean Curvature Flow with Prescribed Contact Angle in Riemannian Products

Casteras Jean-Baptiste,
Heinonen Esko,
Holopainen Ilkka,
De Lira Jorge H.

Affiliations

Casteras Jean-Baptiste: Department of Mathematics and Statistics, University of Helsinki, Helsinki, Finland
Heinonen Esko: Department of Mathematics and Statistics, University of Jyväskylä, Jyväskylä, Finland
Holopainen Ilkka: Department of Mathematics and Statistics, University of Helsinki, Helsinki, Finland
De Lira Jorge H.: Departamento de Matemática, Universidade Federal do Ceará, Fortaleza, Ceará, Brazil

DOI: https://doi.org/10.1515/agms-2020-0132
Journal volume & issue: Vol. 10, no. 1
pp. 31 – 39

Abstract

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Assuming that there exists a translating soliton u∞ with speed C in a domain Ω and with prescribed contact angle on ∂Ω, we prove that a graphical solution to the mean curvature flow with the same prescribed contact angle converges to u∞ + Ct as t →∞. We also generalize the recent existence result of Gao, Ma, Wang and Weng to non-Euclidean settings under suitable bounds on convexity of Ω and Ricci curvature in Ω.

Published in Analysis and Geometry in Metric Spaces

ISSN: 2299-3274 (Online)
Publisher: De Gruyter
Country of publisher: Poland
LCC subjects: Science: Mathematics: Analysis
Website: https://www.degruyter.com/journal/key/agms/html

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