Mixed volume preserving flow by powers of homogeneous curvature functions of degree one

Abstract

This paper concerns the evolution of a closed hypersurface of dimension n(≥ 2) in the Euclidean space Rn+1 under a mixed volume preserving flow. The speed equals a power β (≥ 1) of homogeneous, either convex or concave, curvature functions of degree one plus a mixed volume preserving term, including the case of powers of the mean curvature and of the Gauss curvature. The main result is that if the initial hypersurface satisfies a suitable pinching condition, there exists a unique, smooth solution of the flow for all times, and the evolving hypersurfaces converge exponentially to a round sphere, enclosing the same mixed volume as the initial hypersurface. This result covers and generalises the previous results for convex hypersurfaces in the Euclidean space by McCoy McC05 and Cabezas-Rivas and Sinestrari CS10 to more general curvature flows for convex hypersurfaces with similar curvature pinching condition.