A result on extension of C.R. functions

Derridj, Makhlouf; Fornaess, John Erik

Annales de l'Institut Fourier, Tome 33 (1983), p. 113-120 / Harvested from Numdam

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Résumé
Abstract

Soit $Ω$ un ouvert de $C^{n}$ , de classe $C^{4}$ près de $z_{0} \in \partial Ω$ , $λ$ une fonction holomorphe convenable près de $z_{0}$ . Sachant que l’on sait résoudre (voir [M. Derridj, Annali.Sci. Norm. Pisa, Série IV, vol. IX (1981)]) le problème : $\bar{\partial} u = λ f (f (0, 1)$ forme donnée dans $U (z_{0})$ , $\bar{\partial}$ fermée) dans $U (z_{0})$ avec supp $(u) \subset \bar{Ω} \cap U (z_{0})$ , on déduit un résultat d’extension de fonctions $C . R .$ sur $\partial Ω \cap U (z_{0})$ , en fonctions holomorphes dans $Ω \cap V (z_{0})$ .

Let $Ω$ an open set in $C^{4}$ near $z_{0} \in \partial Ω$ , $λ$ a suitable holomorphic function near $z_{0}$ . If we know that we can solve the following problem (see [M. Derridj, Annali. Sci. Norm. Pisa, Série IV, vol. IX (1981)]) : $\bar{\partial} u = λ f$ , ( $f$ is a $(0, 1)$ form, $\bar{\partial}$ closed in $U (z_{0})$ in $U (z_{0})$ with supp $(u) \subset \bar{Ω} \cap U (z_{0})$ , then we deduce an extension result for $C . R .$ functions on $\partial Ω \cap U (z_{0})$ , as holomorphic fonctions in $Ω \cap V (z_{0})$ .

Publié le : 1983-01-01

MR 85f:32031 | Zbl 0518.32010 | 1 citation dans Numdam

DOI : https://doi.org/10.5802/aif.933

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     author = {Derridj, Makhlouf and Fornaess, John Erik},
     title = {A result on extension of C.R. functions},
     journal = {Annales de l'Institut Fourier},
     volume = {33},
     year = {1983},
     pages = {113-120},
     doi = {10.5802/aif.933},
     mrnumber = {85f:32031},
     zbl = {0518.32010},
     language = {en},
     url = {http://dml.mathdoc.fr/item/AIF_1983__33_3_113_0}
}

Derridj, Makhlouf; Fornaess, John Erik. A result on extension of C.R. functions. Annales de l'Institut Fourier, Tome 33 (1983) pp. 113-120. doi : 10.5802/aif.933. http://gdmltest.u-ga.fr/item/AIF_1983__33_3_113_0/

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