Compact embedded hypersurfaces with constant higher order anisotropic mean curvatures

Abstract

Given a positive function F on Sn which satisfies a convexity condition, for 1≤ r≤ n, we define the r-th anisotropic mean curvature function HFr for hypersurfaces in Rn+1 which is a generalization of the usual r-th mean curvature function. We prove that a compact embedded hypersurface without boundary in n+1 with HFr=constant is the Wulff shape, up to translations and homotheties. In case r=1, our result is the anisotropic version of Alexandrov Theorem, which gives an affirmative answer to an open problem of F. Morgan.