Mathematics > Analysis of PDEs
[Submitted on 17 Apr 2018 (v1), last revised 20 Nov 2019 (this version, v3)]
Title:A nonlinear problem witha weight and a nonvanishing boundary datum
View PDFAbstract:We consider the problem: $$\inf_{{u}\in {H}^{1}_{g}(\Omega),\|u\|_{q}=1} \int_{\Omega}{p(x)}|\nabla{u(x)}|^{2}dx-\lambda\int_{\Omega}| u(x)|^{2}dx$$ where $\Omega$ is a bounded domain in $\R^{n}$, ${n}\geq{4}$, $ p : \bar{\Omega}\longrightarrow \R$ is a given positive weight such that $p\in H^{1}(\Omega)\cap C(\bar{\Omega})$, $0< c_1 \leq p(x) \leq c_2$, $\lambda$ is a real constant and $q=\frac{2n}{n-2}$ and $g$ a given positive boundary data. The goal of this present paper is to show that minimizers do exist. We distinguish two cases, the first is solved by a convex argument while the second is not so straightforward and will be treated using the behavior of the weight near its minimum and the fact that the boundary datum is not zero.
Submission history
From: Rejeb Hadiji [view email][v1] Tue, 17 Apr 2018 21:35:41 UTC (11 KB)
[v2] Mon, 27 May 2019 12:26:53 UTC (13 KB)
[v3] Wed, 20 Nov 2019 15:25:52 UTC (14 KB)
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