On the projective structure of a real hypersurface in C...
On the proof of Kuranishi's embedding theorem
On the pythagoras numbers of real analytic surfaces
On the Radial Cluster Sets for Holomorphic Functions in the Unit Ball of Cn.
On the radical of J*-triples.
On the radius of convergence of an entire function in a normed space
On the rationality of the period mapping
On the real analytic Levi flat hypersurfaces in complex tori of dimension two
We compute the Levi form of the logarithm of the distance function for real hypersurfaces in two dimensional complex tori, and discuss the characterization of Levi flat hypersurfaces there.
On the Real Points of an Arithmetic Quotient of a Bounded Symmetrie Domain.
On the real secondary classes of transversely holomorphic foliations
In this paper we study the real secondary classes of transversely holomorphic foliations. We define a homomorphism from the space of the real secondary classes to the space of the complex secondary classes that corresponds to forgetting the transverse holomorphic structure. By using this homomorphism we show, for example, the decomposition of the Godbillon-Vey class into the imaginary part of the Bott class and the first Chern class of the complex normal bundle of the foliation. We show also...
On the Real Spectrum of a Ring of Global Analytic Functions
On the reflections in bounded symmetric domains
On the regularity of CR structures for almost CR vector bundles.
On the regularity of extension to strictly pseudoconvex domains of functions holomorphic in a submanifold in general position
On the relative Nash approximation of analytic maps.
On the removable singularities for meromorphic mappings.
If E is a closed subset of locally finite Hausdorff (2n-2)-measure on an n-dimensional complex manifold Ω and all the points of E are nonremovable for a meromorphic mapping of Ω E into a compact Kähler manifold, then E is a pure (n-1)-dimensional complex analytic subset of Ω.
On the removal of subharmonic singularities of plurisubharmonic functions
It is proved that any subharmonic function in a domain Ω ⊂ ℂⁿ which is plurisubharmonic outside of a real hypersurface of class C¹ is indeed plurisubharmonic in Ω.
On the Rigidity of Certain Discrete Groups and Algebraic Varieties.
On the rigidity of horizontal slices.
On the rings of formal solutions of polynomial differential equations
The paper establishes the basic algebraic theory for the Gevrey rings. We prove the Hensel lemma, the Artin approximation theorem and the Weierstrass-Hironaka division theorem for them. We introduce a family of norms and we look at them as a family of analytic functions defined on some semialgebraic sets. This allows us to study the analytic and algebraic properties of this rings.