Sharp Liouville results for fully nonlinear equations with power-growth nonlinearities

Abstract

We study fully nonlinear elliptic equations such as \[ F(D2u) = up, p>1, \] in n or in exterior domains, where F is any uniformly elliptic, positively homogeneous operator. We show that there exists a critical exponent, depending on the homogeneity of the fundamental solution of F, that sharply characterizes the range of p>1 for which there exist positive supersolutions or solutions in any exterior domain. Our result generalizes theorems of Bidaut-V\'eron B as well as Cutri and Leoni CL, who found critical exponents for supersolutions in the whole space n, in case -F is Laplace's operator and Pucci's operator, respectively. The arguments we present are new and rely only on the scaling properties of the equation and the maximum principle.