Mathematics – Analysis of PDEs
Scientific paper
2007-07-10
Mathematics
Analysis of PDEs
Scientific paper
We give two results about Harnack type inequalities. First, on compact smooth Riemannian surface without boundary, we have an estimate of the type $\sup +\inf$. The second result concerns the solutions of prescribed scalar curvature equation on the unit ball of ${\mathbb R}^n$ with Dirichlet condition. Next, we give an inequality of the type $(\sup_K u)^{2s-1} \times \inf_{\Omega} u \leq c$ for positive solutions of $\Delta u=Vu^5$ on $\Omega \subset {\mathbb R}^3$, where $K$ is a compact set of $\Omega$ and $V$ is $s-$ h\"olderian, $s\in ]-1/2,1]$. For the case $s=1/2$, we prove that if $\min_{\Omega} u>m>0$ and the h\"olderian constant $A$ of $V$ is small enough (in certain meaning), we have the uniform boundedness of the supremum of the solutions of the previous equation on any compact set of $\Omega$. ----- Nous donnons quelques estimations des solutions d'equations elliptiques sur les surfaces de Riemann et sur des ouverts en dimension n> 2. Nous traitons le cas holderien pour l'equation de la courbure scalaire prescrite en dimension 3.
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