Keywords
- Gevrey Class
- Proposition Suivante
- Strictement Pseudoconvexe
- Bibl Iographie
- Obtient Alors
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Bibliographie
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.
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.
Chollet A.M. Zéros à la frontière de fonctions analytiques d’une ou plusieurs variables complexes. Thèse Orsay 1976.
Chollet A.M. Carleson sets in ℂn, n≥1. Aspects of contemporary Complex Analysis. Proceedings London Math. Soc. Durham 1980.
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).
Chaumat J. et Chollet A.M. Dimension de Hausdorff des ensembles de zéros et d’interpolation pour A∞(D). Trans. Math. Soc. (à paraître).
Davie A.M. et Øksendal B.K. Peak interpolation sets for some algebras of analytic functions Pacific J. math. 41 (1972) p.81–87.
Fatou P. Séries trigonométriques et séries de Taylor Acta. Math. 30 (1906) p.335–400.
Hruscev S.V. Sets of uniqueness for the Gevrey classes Ark. Mat. 15 (1977) p.253–304.
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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