On a non-homogeneous version of a problem of Firey

Abstract

We investigate the uniqueness for the Monge-Amp\`ere type equation equation eq-abstract det(uij+δiju)i,j=1n-1=G(u),\ \ \ \ \ \ \ (*)equationon Sn-1, where u is the restriction of the support function on the sphere Sn-1 of a convex body that contains the origin in its interior and G:(0,∞)(0,∞) is a continuous function. The problem was initiated by Firey (1974) who, in the case G(θ)=θ-1, asked if u 1 is the unique solution to (*). Recently, Brendle, Choi and Daskalopoulos [9] proved that if G(θ)=θ-p, p>-n-1, then u has to be constant, providing in particular a complete solution to Firey's problem. Our primary goal is to obtain uniqueness (or nearly uniqueness) results for (*) for a broader family of functions G. Our approach is very different than the techniques developed in [9].