Sobolev improvements on sharp Rellich inequalities

Abstract

There are two Rellich inequalities for the bilaplacian, that is for ∫ ( u)2dx, the one involving |∇ u| and the other involving |u| at the RHS. In this article we consider these inequalities with sharp constants and obtain sharp Sobolev-type improvements. More precisely, in our first result we improve the Rellich inequality with |∇ u| obtained recently by Cazacu in dimensions n=3,4 by a sharp Sobolev term thus complementing existing results for the case n≥ 5. In the second theorem the sharp constant of the Sobolev improvement for the Rellich inequality with |u| is obtained.

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