A family of sharp inequalities for Sobolev functions
Abstract
Let N≥ 5, be a smooth bounded domain in RN, 2*=2NN-2, a>0, S=∈f\. ∫RN|∇ u|2\,|\,u∈ L2*(RN), ∇ u∈ L2(RN), ∫RN|u|2*=1 \ and ||u||2=|∇ u|22+a|u|22. We define 2= 2NN-1, 2\#=2(N-1)N-2 and consider q such that 2≤ q≤2\#. We also define s=2-N+q2*-q and t=2N-2· 12*-q. We prove that there exists an α0(q,a,)>0 such that, for all u∈ H1()\0\, S2 2N|u|2*2≤||u||2+α0 (||u|||u|2*2*/2)s|u|qqt,(I)q where the norms are over . Inequality (I)2 is due to M. Zhu.
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