Multiple solutions for Grushin operator without odd nonlinearity
Abstract
We deal with existence and multiplicity results for the following nonhomogeneous and homogeneous equations, respectively: \begin{eqnarray*} (P_g)\quad - \Delta_{\lambda} u + V(x) u = f(x,u)+g(x),\;\mbox{ in } \R^N,\; \end{eqnarray*} and \begin{eqnarray*} (P_0)\quad - \Delta_{\lambda} u + V(x) u = K(x)f(x,u),\;\mbox{ in } \R^N,\; \end{eqnarray*} where is the strongly degenerate operator, is allowed to be sign-changing, , is a perturbation and the nonlinearity is a continuous function does not satisfy the Ambrosetti-Rabinowitz superquadratic condition ( for short). First, via the mountain pass theorem and the Ekeland's variational principle, existence of two different solutions for are obtained when satisfies superlinear growth condition. Moreover, we prove the existence of infinitely many solutions for if is odd in thanks an extension of Clark's theorem near the origin. So, our main results considerably improve results appearing in the literature.
Cite
@article{arxiv.1909.03417,
title = {Multiple solutions for Grushin operator without odd nonlinearity},
author = {Mohamed Karim Hamdani},
journal= {arXiv preprint arXiv:1909.03417},
year = {2019}
}
Comments
15 pages