Hyperbolic Alexandrov-Fenchel quermassintegral inequalities II

Abstract

In this paper we first establish an optimal Sobolev type inequality for hypersurfaces in n(see Theorem mainthm1). As an application we obtain hyperbolic Alexandrov-Fenchel inequalities for curvature integrals and quermassintegrals. Precisely, we prove a following geometric inequality in the hyperbolic space n, which is a hyperbolic Alexandrov-Fenchel inequality, equation* arrayrcl ∫ 2k Cn-12kωn-1\(||ωn-1 ) 1k + (||ωn-1 ) 1k n-1-2kn-1 \k, array equation* provided that is a horospherical convex, where 2k≤ n-1. Equality holds if and only if is a geodesic sphere in n. Here σj=j() is the j-th mean curvature and =(1,2,·s, n-1) is the set of the principal curvatures of . Also, an optimal inequality for quermassintegrals in n is as following: W2k+1()≥ ωn-1nΣi=0kn-1-2kn-1-2k+2i\,Cki(nW1()ωn-1)n-1-2k+2in-1, provided that ⊂n is a domain with =∂ horospherical convex, where 2k≤ n-1. Equality holds if and only if is a geodesic sphere in n. Here Wr() is quermassintegrals in integral geometry.