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A sharp inequality for Sobolev functions
Published 23 Jul 2014 in math.AP | (1407.6233v1)
Abstract: Let $N\geq 5$, $a>0$, $\Omega$ be a smooth bounded domain in $\mathbb{R}{N}$, $2*=\frac{2N}{N-2}$, $2#=\frac{2(N-1)}{N-2}$ and $||u||2=|\nabla u|{2}2+a|u|{2}2$. We prove there exists an $\alpha_{0}>0$ such that, for all $u\in H1(\Omega)\setminus{0}$, $$\frac{S}{2{\frac 2N}}\leq\frac{||u||2}{|u|{2*}2}\left(1+\alpha{0}\frac{|u|{2#}{2#}}{||u||\cdot|u|{2}{2^/2}}\right).$$ This inequality implies Cherrier's inequality.
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