On a Class of Fully Nonlinear Curvature Flows in Hyperbolic Space

Abstract

In this paper, we study a class of flows of closed, star-shaped hypersurfaces in hyperbolic space Hn+1 with speed ( r)α/β σk1/β, where σk is the k-th elementary symmetric polynomial of the principal curvatures, α, β are positive constants and r is the distance from points on the hypersurface to the origin. We obtain convergence results under some assumptions of k, α and β . When k = 1 , α > 1 + β, and the initial hypersurface is mean convex, we prove that the mean convex solution to the flow for k=1 exists for all time and converges smoothly to a sphere. When 1≤ k ≤ n, α > k+β, and the initial hypersurface is uniformly convex, we prove that the uniformly convex solution to the flow exists for all time and converges smoothly to a sphere. In particular, we generalize Li-Sheng-Wang's results from Euclidean space to hyperbolic space.