Explicit subsolutions and a Liouville theorem for fully nonlinear uniformly elliptic inequalities in halfspaces

Abstract

We prove a Liouville type theorem for arbitrarily growing positive viscosity supersolutions of fully nonlinear uniformly elliptic equations in halfspaces. Precisely, let M-λ, be the Pucci's inf- operator, defined as the infimum of all linear uniformly elliptic operators with ellipticity constants ≥ λ >0. Then, we prove that the inequality M-λ, (D2u) +up ≤ 0 does not have any positive viscosity solution in a halfspace provided that -1≤ p ≤ (/λ n+1)/(/λ n-1), whereas positive solutions do exist if either p < -1 or p > (/λ (n-1)+2)/(/λ (n-1)). This will be accomplished by constructing explicit subsolutions of the homogeneous equation M-λ, (D2u)=0 and by proving a nonlinear version in a halfspace of the classical Hadamard three-circles Theorem for entire superharmonic functions.