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Fully nonlinear curvature flow of axially symmetric hypersurfaces with boundary conditions

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posted on 2024-11-16, 09:09 authored by James McCoyJames McCoy, Fatemah Mofarreh, Graham WilliamsGraham Williams
Inspired by earlier results on the quasilinear mean curvature flow, and recent investigations of fully nonlinear curvature flow of closed hypersurfaces which are not convex, we consider contraction of axially symmetric hypersurfaces by convex, degree-one homogeneous fully nonlinear functions of curvature. With a natural class of Neumann boundary conditions, we show that evolving hypersurfaces exist for a finite maximal time. The maximal time is characterised by a curvature singularity at either boundary. Some results continue to hold in the cases of mixed Neumann-Dirichlet boundary conditions and more general curvature-dependent speeds.

Funding

New directions in geometric evolution equations

Australian Research Council

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History

Citation

McCoy, J. A., Mofarreh, F. Y Y. & Williams, G. H. (2014). Fully nonlinear curvature flow of axially symmetric hypersurfaces with boundary conditions. Annali di Matematica Pura ed Applicata, 193 (5), 1443-1455.

Journal title

Annali di Matematica Pura ed Applicata

Volume

193

Issue

5

Pagination

1443-1455

Language

English

RIS ID

78238

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