Soit un domaine borné strictement pseudoconvexe dans à frontière régulière . On montre que tout compact d’une sous-variété de dont l’espace tangent en chaque point de est contenu dans le sous-espace complexe maximal de est un ensemble pic pour , la classe des fonctions analytiques dans dont toutes les dérivées sont continues dans .
Let be a bounded strictly pseudoconvex domain in with smooth boundary . Let be the class of functions analytic in and continuous with all their derivatives in . Let be a -submanifold of whose tangent space lies in the maximal complex subspace of , for every . In this work, we show that every compact subset of is a peak set for .
@article{AIF_1979__29_3_171_0, author = {Chaumat, Jacques and Chollet, Anne-Marie}, title = {Ensembles pics pour $A^\infty (D)$}, journal = {Annales de l'Institut Fourier}, volume = {29}, year = {1979}, pages = {171-200}, doi = {10.5802/aif.757}, mrnumber = {81c:32036}, zbl = {0398.32004}, language = {fr}, url = {http://dml.mathdoc.fr/item/AIF_1979__29_3_171_0} }
Chaumat, Jacques; Chollet, Anne-Marie. Ensembles pics pour $A^\infty (D)$. Annales de l'Institut Fourier, Tome 29 (1979) pp. 171-200. doi : 10.5802/aif.757. http://gdmltest.u-ga.fr/item/AIF_1979__29_3_171_0/
[1] Les méthodes mathématiques de la mécanique classique, Editions MIR (1976), Moscou. | MR 57 #14033a | Zbl 0385.70001
,[2] Extending functions from submanifolds of the boundary, Duke Math. J., 43 (1976), 391-404. | MR 54 #3028 | Zbl 0328.32013
, and ,[3] The Neumann problem for the Cauchy-Riemann complex, Princeton University Press (1972). | MR 57 #1573 | Zbl 0247.35093
and ,[4] Estimates for the ∂b complex and analysis on the Heisenberg group, Com. Pure Appl. Math., 27 (1974), 429-522. | MR 51 #3719 | Zbl 0293.35012
and ,[5] Géométrie symplectique et physique mathématique, Colloque Intern. C.N.R.S, Aix en Provence (1974).
,[6] Ensembles pics dans des domaines strictement pseudoconvexes, Duke Math. J., 45 (1978), 601-617. | MR 80c:32007 | Zbl 0402.32008
et ,[7] Holomorphic approximation and hyperfunction theory on a C1 totally real submanifold of a complex manifold, Math. Ann., 197 (1972), 287-318. | MR 46 #9379 | Zbl 0246.32019
and ,[8] C.R. Ecole d'été à Drogobytch (1974).
, et ,[9] Transformation groups in differential geometry, Springer-Verlag (1972), Appendice 1. | MR 50 #8360 | Zbl 0246.53031
,[10] Global regularity for ∂ on weakly pseudoconvex manifolds, Trans. Amer. Math. Soc., 181 (1973), 273-292. | MR 49 #9442 | Zbl 0276.35071
,[11] Smooth zero sets and interpolation sets for some algebras of holomorphic functions on strictly pseudoconvex domains, Duke Math. J., 43 (1976), 323-348. | MR 56 #670 | Zbl 0343.32016
,[12] Peak interpolation sets of classe C1, Pacific J. Math., 75 (1978), 267-279. | MR 58 #6346 | Zbl 0383.32007
,[13] Lectures on symplectic manifolds, Regional conference series in mathematics 29, Amer. Math. Soc. | Zbl 0406.53031
,