Self-similar solutions of σkα-curvature flow
Abstract
In this paper, employing a new inequality, we show that under certain curvature pinching condition, the strictly convex closed smooth self-similar solution of σkα-flow must be a round sphere. We also obtain a similar result for the solutions of F=- X, en+1 \, (*) with a non-homogeneous function F. At last, we prove that if F can be compared with (n-k+1)σk-1kσk, then a closed strictly k-convex solution of (*) must be a round sphere.
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