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Title
EVOLUTION OF CONVEX HYPERSURFACES BY A FULLY NONLINEAR MIXED VOLUME PRESERVING CURVATURE FLOW
Type of Research Article
Keywords
Fully nonlinear Curvature flow, Maximum principle
Abstract
In this paper we study the evolution of closed convex hypersurfaces under the mixed volume preserving curvature flow in Euclidean space with the speed given by reversed function that is symmetric and homogeneous of degree one. We prove that the hypersurfaces preserve convexity under the flow, the maximum existence time is infinite and the hypersurfaces asymptotically approach to sphere
Researchers Ghodrat Moazzaf (First Researcher)، Esmaiel Abedi (Second Researcher)