A sharp inequality for Sobolev functions

Girão, Pedro M.

doi:10.1016/S1631-073X(02)02215-X

A sharp inequality for Sobolev functions
[Une inégalité dans un espace de Sobolev]

Girão, Pedro M.¹

¹ Department of Mathematics, Instituto Superior Técnico, Av. Rovisco Pais, 1049-001 Lisbon, Portugal

Comptes Rendus. Mathématique, Tome 334 (2002) no. 2, pp. 105-108.

Résumé
Abstract

Nous considérons N⩾5, a>0, $Ω$ un ouvert borné régulier de $ℝ^{N}$ , $2^{*} = \frac{2 N}{N - 2}$ , $2^{#} = \frac{2 (N - 1)}{N - 2}$ et ||u||²=|∇u|₂²+a|u|₂². Nous prouvons qu'il existe α₀>0 tel que, pour toute fonction $u \in H^{1} (Ω) ⧹ {0}$ ,

\frac{S}{2^{2 / N}} ⩽ \frac{{∥ u ∥}^{2}}{{| u |}_{2^{*}}^{2}} (1 + α_{0} \frac{{| u |}_{2^{#}}^{2^{#}}}{{∥ u ∥ \cdot | u |}_{2^{*}}^{2^{*} / 2}}) .

Cette inégalité implique l'inégalité de Cherrier.

Let N⩾5, a>0, $Ω$ be a smooth bounded domain in $ℝ^{N}$ , $2^{*} = \frac{2 N}{N - 2}$ , $2^{#} = \frac{2 (N - 1)}{N - 2}$ and ‖u‖²=|∇u|₂²+a|u|₂². We prove there exists an α₀>0 such that, for all $u \in H^{1} (Ω) ⧹ {0}$ ,

\frac{S}{2^{2 / N}} ⩽ \frac{{∥ u ∥}^{2}}{{| u |}_{2^{*}}^{2}} (1 + α_{0} \frac{{| u |}_{2^{#}}^{2^{#}}}{{∥ u ∥ \cdot | u |}_{2^{*}}^{2^{*} / 2}}) .

This inequality implies Cherrier's inequality.

Accepté le : 2001-11-15
Publié le : 2002-01-01

DOI : 10.1016/S1631-073X(02)02215-X

Affiliations des auteurs :

Girão, Pedro M. ¹

¹ Department of Mathematics, Instituto Superior Técnico, Av. Rovisco Pais, 1049-001 Lisbon, Portugal

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     title = {A sharp inequality for {Sobolev} functions},
     journal = {Comptes Rendus. Math\'ematique},
     pages = {105--108},
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Girão, Pedro M. A sharp inequality for Sobolev functions. Comptes Rendus. Mathématique, Tome 334 (2002) no. 2, pp. 105-108. doi : 10.1016/S1631-073X(02)02215-X. http://archive.numdam.org/articles/10.1016/S1631-073X(02)02215-X/

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