On subhomogeneous indefinite $p$-Laplace equations in supercritical spectral interval (2110.11849v1)

Abstract: We study the existence, multiplicity, and certain qualitative properties of solutions to the zero Dirichlet problem for the equation $-\Delta_p u = \lambda |u|^{p-2}u + a(x)|u|^{q-2}u$ in a bounded domain $\Omega \subset \mathbb{R}^N$, where $1<q<p$, $\lambda\in\mathbb{R}$, and $a$ is a continuous sign-changing weight function. Our primary interest concerns ground states and nonnegative solutions which are positive in $\{x\in \Omega: a(x)\>0}$, when the parameter $\lambda$ lies in a neighborhood of the critical value $\lambda^* = \inf\left{\int_\Omega |\nabla u|^p \, dx/\int_\Omega |u|^p \, dx: u\in W_0^{1,p}(\Omega) \setminus {0},\ \int_\Omega a|u|^q\,dx \geq 0\,\right}$. Among main results, we show that if $p>2q$ and either $\int_\Omega a\varphi_p^q\,dx=0$ or $\int_\Omega a\varphi_p^q\,dx>0$ is sufficiently small, then such solutions do exist in a right neighborhood of $\lambda^*$. Here $\varphi_p$ is the first eigenfunction of the Dirichlet $p$-Laplacian in $\Omega$. This existence phenomenon is of a purely subhomogeneous and nonlinear nature, since either in the superhomogeneous case $q>p$ or in the sublinear case $q<p=2$ the nonexistence takes place for any $\lambda \geq \lambda^*$. Moreover, we prove that if $p\>2q$ and $\int_\Omega a\varphi_p^q\,dx>0$ is sufficiently small, then there exist three nonzero nonnegative solutions in a left neighborhood of $\lambda^*$, two of which are strictly positive in ${x\in \Omega: a(x)>0}$.