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Remarques sur la frontière de martin biharmonique et la représentation intégrale des fonctions biharmoniques

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  • Mohamed El Kadiri
  • Sabah Haddad

Abstract

Soit ( Ω , ℋ ) un espace biharmonique fort au sens de Smyrnelis dont les espaces harmoniques associés sont des espaces de Brelot qui vérifient l'axiome de proportionnalité. On montre que s'il existe un couple ℋ -harmonique > 0 sur Ω , alors lénsemble des points minimaux de la frontière de Martin biharmonique de Ω qui ne sont pas les pôles de couples biharmoniques minimaux est négiligeable dans un sens que l'on précisera. Dans le cas classique d'un domaine lipschitzien borné de ℝ n , nous montrons que cet ensemble est vide. Let ( Ω , ℋ ) be a strong biharmonic space of Smyrnelis such that the harmonic spaces associeted are Brelot spaces satisfying the axiom of proportionnality. We prove that if there exists a biharmonic pair greater than 0 on Ω , then the set of minimal points of the biharmonic Martin boundary of Ω , that are not the poles of minimal biharmonic pairs, is negligible in some meaning that we will precise. For the classical case of a bounded Lipschitz domain of ℝ n , we prove that this set is empty.

Suggested Citation

  • Mohamed El Kadiri & Sabah Haddad, 2005. "Remarques sur la frontière de martin biharmonique et la représentation intégrale des fonctions biharmoniques," International Journal of Mathematics and Mathematical Sciences, Hindawi, vol. 2005, pages 1-12, January.
    • Handle: RePEc:hin:jijmms:714318
    DOI: 10.1155/IJMMS.2005.1461
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