Long time behavior of a class of non-homogeneous anisotropic fully nonlinear curvature flows

Abstract

In this paper, we study a class of non-homogeneous anisotropic fully nonlinear curvature flows in Rn+1. More precisely, we consider a hypersurface M in Rn+1 deformed by a flow along its unit normal with its speed f(r)σkα where σk is the k-th elementary symmetric polynomial of M's principle curvatures, r is the distance of the point on M to the origin, f is a smooth nonnegative function on [0,∞) and α > 0. Under some suitable conditions on f, we prove that starting from a star-shaped and k-convex hypersurface, the flow exists for all time and converges smoothly to a sphere after normalization. In particular, we generalize the results in li2022asymptotic.