On problems with weighted elliptic operator and general growth nonlinearities

Abstract

This article establishes existence, non-existence and Liouville-type theorems for nonlinear equations of the form -div (|x|a D u ) = f(x,u), ~ u > 0,\, in , where N ≥ 3, is an open domain in RN containing the origin, N-2+a > 0 and f satisfies structural conditions, including certain growth properties. The first main result is a non-existence theorem for boundary-value problems in bounded domains star-shaped with respect to the origin, provided f exhibits supercritical growth. A consequence of this is the existence of positive entire solutions to the equation for f exhibiting the same growth. A Liouville-type theorem is then established, which asserts no positive solution of the equation in = RN exists provided the growth of f is subcritical. The results are then extended to systems of the form -div (|x|a D u1) \!=\! f1(x,u1,u2), -div (|x|a D u2) \!=\! f2(x,u1,u2), u1, u2 \!>\! 0,\, in , but after overcoming additional obstacles not present in the single equation. Specific cases of our results recover classical ones for a renowned problem connected with finding best constants in Hardy-Sobolev and Caffarelli-Kohn-Nirenberg inequalities as well as existence results for well-known elliptic systems.