This thesis is dedicated to the interior and boundary regularity of the mean curvature flow. We prove that, if a mean curvature flow with boundary and transport term is close enough to a stationary half-plane with density one, then it is $C^{1,\alpha}$. Our approach exploits the maximum principle for the mean curvature flow and Huisken's monotonicity formula. With the same techniques, we also provide a self-contained proof of Allard's regularity theorem.
Epsilon-regularity for the mean curvature flow with boundary and transport term: a viscosity approach
Gasparetto, Carlo
2022
Abstract
This thesis is dedicated to the interior and boundary regularity of the mean curvature flow. We prove that, if a mean curvature flow with boundary and transport term is close enough to a stationary half-plane with density one, then it is $C^{1,\alpha}$. Our approach exploits the maximum principle for the mean curvature flow and Huisken's monotonicity formula. With the same techniques, we also provide a self-contained proof of Allard's regularity theorem.File in questo prodotto:
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Utilizza questo identificativo per citare o creare un link a questo documento:
https://hdl.handle.net/20.500.14242/168785
Il codice NBN di questa tesi è
URN:NBN:IT:SISSA-168785