Abstract
Letp be an analytic disc attached to a generating CR-submanifoldM of C n. It is proved that some recently introduced conditions onp andM which imply that the family of all smallC α holomorphic perturbations ofp alongM is a Banach submanifold of (Aα(D))n are equivalent. These conditions are given in terms of the partial indices of the discp attached toM and “holomorphic sections” of the conormal bundle ofM along p(∂D). Also, a sufficient geometric conditionon p andM is given so that the family of all smallC α holomorphic perturbationsof p alongM, fixed at some boundary point, is a Banach submanifold of (A α (D))n.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
H. Alexander,Hulls of deformations in C n, Trans. Amer. Math. Soc.266 (1981), 243–257.
M. S. Baouendi, L. P. Rothschild and J.-M. Trépreau,On the geometry of analytic discs attached to real manifolds, J. Differential Geom.39 (1994), 379–405.
E. Bedford,Stability of the polynomial hull of T 2, Ann. Scuola Norm. Sup. Pisa Cl. Sci. (4)8 (1981), 311–315.
E. Bedford,Levi flat hypersurfaces in C2 with prescribed boundary: Stability, Ann. Scuola Norm. Sup. Pisa Cl. Sci. (4)9 (1982), 529–570.
E. Bedford and B. Gaveau,Envelopes of holomorphy of certain two-spheres in C2, Amer. J. Math.105(1983), 975–1009.
M. černe,Analytic discs attached to a generating CR-manifold, Ark. Mat.33 (1995), 217–248.
F. Forstnerič,Analytic discs with boundaries in a maximal real submanifolds of C 2, Ann. Inst. Fourier37 (1987), 1–44.
F. Forstneric,Polynomial hulls of sets fibered over the circle, Indiana Univ. Math. J.37 (1988), 869–889.
J. Globevnik,Perturbation by analytic discs along maximal real submanifold of C n, Math. Z.217 (1994), 287–316.
J. Globevnik,Perturbing analytic discs attached to maximal real submanifolds of C n, Indag. Math.7(1996), 37–46.
M. Gromov,Pseudo-holomorphic curves in symplectic manifolds, Invent. Math.81 (1985), 307–347.
L. Lempert,La métrique de Kobayashi et la représentation des domaines sur la boule, Bull. Soc. Math. France109 (1981), 427–474.
Y.-G. Oh,The Fredholm-regularity and realization of the Riemann—Hilbert problem and application to the perturbation theory of analytic discs, preprint.
Y.-G. Oh,Fredholm theory of holomorphic discs with Lagrangian or totally real boundary conditions under the perturbation of boundary conditions, Math. Z.222 (1996), 505–520.
S. Trapani,Defect and evaluations, preprint.
J-M. Trépreau,On the global Bishop equation, preprint.
A. E. Tumanov,Extension of CR-functions into a wedge from a manifold of finite type (Russian), Mat. Sbornik136 (1988), 128–139; English transi.: Math. USSR Sbornik64 (1989), 129–140.
N. P. Vekua,Systems of Singular Integral Equations, Nordhoff, Groningen, 1967.
N. P. Vekua,Systems of Singular Integral Equations, 2nd edition (Russian), Nauka, Moscow, 1970.
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Cerne, M. Regularity of discs attached to a submanifold ofC n . J. Anal. Math. 72, 261–278 (1997). https://doi.org/10.1007/BF02843161
Received:
Revised:
Issue Date:
DOI: https://doi.org/10.1007/BF02843161