Ebook: Neckpinch Dynamics for Asymmetric Surfaces Evolving by Mean Curvature Flow
Author: Zhou Gang, Dan Knopf, Israel Michael Sigal
- Tags: Evolution equations-Asymptotic theory., Asymptotic expansions., Curvature., Singularities (Mathematics)
- Series: Memoirs of the American Mathematical Society Ser.
- Year: 2018
- Publisher: American Mathematical Society
- City: Providence, United States
- Edition: 1
- Language: English
- pdf
The authors study noncompact surfaces evolving by mean curvature flow (mcf). For an open set of initial data that are $C^3$-close to round, but without assuming rotational symmetry or positive mean curvature, the authors show that mcf solutions become singular in finite time by forming neckpinches, and they obtain detailed asymptotics of that singularity formation. The results show in a precise way that mcf solutions become asymptotically rotationally symmetric near a neckpinch singularity.
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