A Liouville theorem for solutions of degenerate Monge-Amp\`ere equations

Abstract

In this paper, we give a new proof of a celebrated theorem of J\"orgens which states that every classical convex solution of \[ ∇2 u (x)=1 in R2 \] has to be a second order polynomial. Our arguments do not use complex analysis, and can be applied to establish such Liouville type theorems for solutions of a class of degenerate Monge-Amp\`ere equations. We prove that every convex generalized (or Alexandrov) solution of \[ ∇2 u(x1,x2)=|x1|α in R2, \] where α>-1, has to be \[ u(x1,x2)= a(α+2)(α+1)|x1|2+α+a b22x12 +bx1x2+ 12a x22+(x1,x2) \] for some constants a>0, b and a linear function (x1,x2). This work is motivated by the Weyl problem with nonnegative Gauss curvature.