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 where , is an open domain in containing the origin, and 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 exhibits supercritical growth. A consequence of this is the existence of positive entire solutions to the equation for exhibiting the same growth. A Liouville-type theorem is then established, which asserts no positive solution of the equation in exists provided the growth of is subcritical. The results are then extended to systems of the form 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.
Cite
@article{arxiv.1807.04940,
title = {On problems with weighted elliptic operator and general growth nonlinearities},
author = {John Villavert},
journal= {arXiv preprint arXiv:1807.04940},
year = {2021}
}
Comments
The previous version was substantially revised. A set of existence (and non-existence) results are now established for a general class of problems