Volume preserving centro-affine normal flows
Abstract
We study the long time behavior of the volume preserving p-flow in Rn+1 for 1≤ p<n+1n-1. By extending Andrews' technique for the flow along the affine normal, we prove that every centrally symmetric solution to the volume preserving p-flow converges sequentially to the unit ball in the C∞ topology, modulo the group of special linear transformations.
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