TY - Type of reference TI - A priori estimates for super-linear elliptic equation: the Neumann boundary value problem AU - Abdellaziz Harrabi AU - Belgacem Rahal AU - Abdelbaki Selmi AB - $$\mbox{In this paper we study the nonexistence of finite Morse index solutions of the following} \\\mbox{Neumann boundary value problems}\\ {(Eq.H)} \begin{cases} -\Delta u = (u^{+})^{p} \;\; \text{in  \mathbb{R}_+^N}, \\ \frac{\partial u}{\partial x_{N}}=0 \quad\quad\;\; \text{ on  \partial\mathbb{R}_+^N}, \\ u \in C^2(\overline{\mathbb{R}_+^N}) \mbox{ and sign-changing, }\\u^+ \mbox{ is bounded and } i(u)<\infty,\end{cases}\\ \mbox{or}\\ {(Eq.H')}\begin{cases}-\Delta u = |u|^{p-1}u \;\; \text{in  \mathbb{R}_+^N}, \\ \frac{\partial u}{\partial x_{N}}=0 \;\;\;\;\;\;\;\;\quad\text{ on  \partial\mathbb{R}_+^N}, \\ u \in C^2(\overline{\mathbb{R}_+^N}),\\ u \mbox{ is bounded and } i(u) < \infty.\end{cases}\\ \mbox{ As a consequence, we establish the relevant Bahri-Lions's }L^\infty\mbox{-estimate [3] via}\\ \mbox{the boundedness of Morse index of solutions to}\\ $$\label{1.1} \left\{\begin{array}{lll} -\Delta u=f(x,u) &\text{in \Omega,}\\ \frac{\partial u}{\partial \nu}=0 &\text{on \partial \Omega,} \end{array} \right.$$\\ \mbox{where} f \mbox{ has an asymptotical behavior at in-nity} \mbox{which is not necessarily the same at} \pm\infty. \\\mbox{Our results complete previous Liouville type theorems and } L^\infty\mbox{-bounds via Morse index} \\\mbox{ obtained in [3, 6, 13, 16, 12, 21].}$$\$ DO - 10.21494/ISTE.OP.2021.0646 JF - Advances in Pure and Applied Mathematics KW - Morse index, Neumann boundary value problem, supercritical growth, Liouville-type problems, L∞1 -bounds., Morse index, Neumann boundary value problem, supercritical growth, Liouville-type problems, L∞1 -bounds., L1 - https://www.openscience.fr/IMG/pdf/iste_apam21v12n2_2.pdf LA - en PB - ISTE OpenScience DA - 2021/04/26 SN - 1869-6090 TT - Estimations à priori pour l’équation elliptique super-linéaire : le problème de la valeur au bord de Neumann UR - https://www.openscience.fr/A-priori-estimates-for-super-linear-elliptic-equation-the-Neumann-boundary IS - Issue 2 (May 2021) VL - 12 ER -