A concave-convex problem with a variable operator
Analysis of PDEs
2017-03-10 v1
Abstract
We study the following elliptic problem with Dirichlet boundary conditions, where is the Laplacian in one part of the domain, , and the Laplacian (with ) in the rest of the domain, . We show that this problem exhibits a concave-convex nature for . In fact, we prove that there exists a positive value such that the problem has no positive solution for and a minimal positive solution for . If in addition we assume that is subcritical, that is, then there are at least two positive solutions for almost every , the first one (that exists for all ) is obtained minimizing a suitable functional and the second one (that is proven to exist for almost every ) comes from an appropriate (and delicate) mountain pass argument.
Keywords
Cite
@article{arxiv.1703.03376,
title = {A concave-convex problem with a variable operator},
author = {Alexis Molino and Julio D. Rossi},
journal= {arXiv preprint arXiv:1703.03376},
year = {2017}
}