A remark to a paper of Janas “Toeplitz operators related to certain domains in ”
A Simplification and Extension of Fefferman's Theorem on Biholomorphic Mappings.
A smooth Pseudoconvex domain without pseudoconvex exhaustion.
A tame splitting theorem for exact sequences of Fréchet spaces.
Addendum to: A Reduction Theorem for Cohomology Groups of Very Strongly q-Convex Kähler Manifolds.
Algebraic approximation in analytic geometry.
Ambient Deformations for Exceptional Sets in Two-Manifolds.
An eigenvalue problem for the complex Monge-Ampère operator in pseudoconvex domains
An integral formula on submanifolds of domains of Cn..
A Bochner-Martinelli-Koppelman type integral formula on submanifolds of pseudoconvex domains in Cn is derived; the result gives, in particular, integral formulas on Stein manifolds.
An open mapping theorem for analytic multifunctions
The paper gives sufficient conditions for projections of certain pseudoconcave sets to be open. More specifically, it is shown that the range of an analytic set-valued function whose values are simply connected planar continua is open, provided there does not exist a point which belongs to boundaries of all the fibers. The main tool is a theorem on existence of analytic discs in certain polynomially convex hulls, obtained earlier by the author.
Analycity of CR Equivalences Between Some Real Hypersurfaces in ...n with Degenerate Levi Forms.
Analytic functionals and Bergman spaces
Analyticité globale pour sur certaines hypersurfaces compactes de
Analyticité semi-globale pour le -Neumann dans des domaines pseudoconvexes
Aneurysms of pseudoconcave CR manifolds.
Application des techniques à la théorie des idéaux d’une algèbre de fonctions holomorphes avec poids
Approximation by Holomorphic Functions on Pseudokonvex Domains with Isolated Degeneracies.
Approximation d'operateurs d'extension minimale et de division.
Approximation par des fonctions holomorphes à croissance contrôlée.
Let Ω be a bounded pseudo-convex domain in Cn with a C∞ boundary, and let S be the set of strictly pseudo-convex points of ∂Ω. In this paper, we study the asymptotic behaviour of holomorphic functions along normals arising from points of S. We extend results obtained by M. Ortel and W. Schneider in the unit disc and those of A. Iordan and Y. Dupain in the unit ball of Cn. We establish the existence of holomorphic functions of given growth having a "prescribed behaviour" in almost all normals arising...
Approximation Theory on Totally Real Submanifolds.