Uniqueness of solutions to some classes of anisotropic and isotropic curvature problems

Abstract

In this paper, we apply various methods to establish the uniqueness of solutions to some classes of anisotropic and isotropic curvature problems. Firstly, by employing integral formulas derived by S. S. Chern Ch59, we obtain the uniqueness of smooth admissible solutions to a class of Orlicz-(Christoffel)-Minkowski problems. Secondly, inspired by Simon's uniqueness result Si67, we then prove that the only smooth strictly convex solution to the following isotropic curvature problem equationab-1 (Pk(W)Pl(W))1k-l=(u,r) on\ Sn equation must be an origin-centred sphere, where W=(∇2 u+u g0), ∂1 0,∂2 0 and at least one of these inequalities is strict. As an application, we establish the uniqueness of solutions to the isotropic Gaussian-Minkowski problem. Finally, we derive the uniqueness result for the following isotropic Lp dual Minkowski problem equationab-2 u1-p rq-n-1(W)=1 on\ Sn, equation where -n-1<p -1 and n+1 q n+12+14-(1+p)(n+1+p)n(n+2). This result utilizes the method developed by Ivaki and Milman IM23 and generalizes a result due to Brendle, Choi and Daskalopoulos BCD17.