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Proprietes de Recouvrement des Sous-Ensembles de la Frontiere d’un Domaine Strictement Pseudo-Convexe

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Part of the Lecture Notes in Mathematics book series (LNM,volume 1276)

Keywords

  • Gevrey Class
  • Proposition Suivante
  • Strictement Pseudoconvexe
  • Bibl Iographie
  • Obtient Alors

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Bibliographie

  1. Ababou-Boumaaz R. Ensembles de zéros et ensembles pics pour des classes de fonctions holomorphes dans des domaines strictement pseudo-convexes C.R. Acad. Sc. Paris 302 (1986) p. 507–510.

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  2. Chollet A.M. Ensembles de zéros à la frontière de fonctions analytiques dans des domaines strictement pseudo-convexes Ann. Inst. Fourier 26 (1976) p.51–80.

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  3. Chollet A.M. Zéros à la frontière de fonctions analytiques d’une ou plusieurs variables complexes. Thèse Orsay 1976.

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  4. Chollet A.M. Carleson sets in ℂn, n≥1. Aspects of contemporary Complex Analysis. Proceedings London Math. Soc. Durham 1980.

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  5. Chaumat J. et Chollet A.M. Ensemble de zéros et d’interpolation à la frontière de domaines strictement pseudo-convexes Ark.for Mat. 1986 (à paraître).

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  6. Chaumat J. et Chollet A.M. Dimension de Hausdorff des ensembles de zéros et d’interpolation pour A(D). Trans. Math. Soc. (à paraître).

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  7. Davie A.M. et Øksendal B.K. Peak interpolation sets for some algebras of analytic functions Pacific J. math. 41 (1972) p.81–87.

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  8. Fatou P. Séries trigonométriques et séries de Taylor Acta. Math. 30 (1906) p.335–400.

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  9. Hruscev S.V. Sets of uniqueness for the Gevrey classes Ark. Mat. 15 (1977) p.253–304.

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  10. Korenbulm B.I. Holomorphic functions in a disk and smooth in its closure Soviet Math. Dokl. 12 (1971) p.1312–1315.

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© 1987 Springer-Verlag

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Chollet, AM. (1987). Proprietes de Recouvrement des Sous-Ensembles de la Frontiere d’un Domaine Strictement Pseudo-Convexe. In: Berenstein, C.A. (eds) Complex Analysis II. Lecture Notes in Mathematics, vol 1276. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0078956

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  • DOI: https://doi.org/10.1007/BFb0078956

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  • Print ISBN: 978-3-540-18357-0

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