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A priori estimate for a family of semi-linear elliptic equations with critical nonlinearity

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 Added by Lei Zhang
 Publication date 2008
  fields
and research's language is English
 Authors Lei Zhang




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We consider positive solutions of $Delta u-mu u+Ku^{frac{n+2}{n-2}}=0$ on $B_1$ ($nge 5$) where $mu $ and $K>0$ are smooth functions on $B_1$. If $K$ is very sub-harmonic at each critical point of $K$ in $B_{2/3}$ and the maximum of $u$ in $bar B_{1/3}$ is comparable to its maximum over $bar B_1$, then all positive solutions are uniformly bounded on $bar B_{1/3}$. As an application, a priori estimate for solutions of equations defined on $mathbb S^n$ is derived.



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We prove the existence of positive solutions to a sys- tem of k non-linear elliptic equations corresponding to standing- wave k-uples solutions to a system of non-linear Klein-Gordon equations. Our solutions are characterised by a small energy/charge ratio, appropriately defined.
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