On the uniqueness of Lp-Minkowski problems: the constant p-curvature case in R3

Abstract

We study the C4 smooth convex bodies K⊂Rn+1 satisfying K(x)=u(x)1-p, where x∈Sn, K is the Gauss curvature of ∂K, u is the support function of K, and p is a constant. In the case of n=2, either when p∈[-1,0] or when p∈(0,1) in addition to a pinching condition, we show that K must be the unit ball. This partially answers a conjecture of Lutwak, Yang, and Zhang about the uniqueness of the Lp-Minkowski problem in R3. Moreover, we give an explicit pinching constant depending only on p when p∈(0,1).