James McCoy
Published 2020-05-19Version 1
A recent article Li and Lv considered contraction of convex hypersurfaces by certain nonhomogeneous functions of curvature, showing convergence to points in finite time in certain cases where the speed is a function of a degree-one homogeneous, concave and inverse concave function of the principle curvatures. In this article we extend the result to various other cases that are analogous to those considered in other earlier work, and we show that in all cases, where sufficient pinching conditions are assumed on the initial hypersurface, then under suitable rescaling the final point is asymptotically round and convergence is exponential in the $C^\infty$-topology.
Convergence to equilibrium of gradient flows defined on planar curves
On the convergence of statistical solutions of the 3D Navier-Stokes-$α$ model as $α$ vanishes
Convergence of perturbed Allen-Cahn equations to forced mean curvature flow
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