Vladimir Bobkov, Mieko Tanaka
Published 2014-11-19Version 1
We study the existence and non-existence of positive solutions for the $(p,q)$-Laplace equation $-\Delta_p u -\Delta_q u = \alpha |u|^{p-2} u + \beta |u|^{q-2} u$, where $p \neq q$, under the zero Dirichlet boundary condition in $\Omega$. The main result of our research is the construction of a continuous curve in $(\alpha,\beta)$ plane, which becomes a threshold between the existence and non-existence of positive solutions. Furthermore, we provide the example of domains $\Omega$ for which the corresponding first Dirichlet eigenvalue of $-\Delta_p$ is not monotone w.r.t. $p > 1$.
Comments: 28 pages, 3 figures
Remarks on minimizers for $(p,q)$-Laplace equations with two parameters
On sufficient "local" conditions for existence results to generalized $p(\cdot)$-Laplace equations involving critical growth
Classification of positive $\mathcal {D}^{1,p}(\R^N)$-solutions to the critical $p$-Laplace equation in $\mathbb{R}^N$
![QR code for arXiv:1411.5192 [math.AP]](http://oss.arxitics.com/images/favicon.svg)