On the holomorphic separabilitiy of discrete quotients of complex Lie groups.
On the Kobayashi and Caratheodory pseudometric reductions of homogeneous complex spaces
On the Lie algebra of holomorphic infinitesimal isometries of some classical complex symmetric Banach manifolds
The Banach-Lie algebras ℌκ of all holomorphic infinitesimal isometries of the classical symmetric complex Banach manifolds of compact type (κ = 1) and non compact type (κ = −1) associated with a complex JB*-triple Z are considered and the Lie ideal structure of ℌκ is studied.
On the order of the automorphism group of a surface of general type.
On the radical of J*-triples.
On the Real Points of an Arithmetic Quotient of a Bounded Symmetrie Domain.
On the reflections in bounded symmetric domains
On the Rigidity of Certain Discrete Groups and Algebraic Varieties.
On the Segal-Shale-Weil Representations and Harmonic Polynomials.
On the Torelli problem of Abelian complex Lie groups.
On weighted Bergman kernels of bounded domains
We build on work by Z. Pasternak-Winiarski [PW2], and study a-Bergman kernels of bounded domains for admissible weights .
Optimal destabilizing vectors in some Gauge theoretical moduli problems
We prove that the well-known Harder-Narsimhan filtration theory for bundles over a complex curve and the theory of optimal destabilizing -parameter subgroups are the same thing when considered in the gauge theoretical framework.Indeed, the classical concepts of the GIT theory are still effective in this context and the Harder-Narasimhan filtration can be viewed as a limit object for the action of the gauge group, in the direction of an optimal destabilizing vector. This vector appears as an extremal...
Orbifold-Uniformizing Differential Equations.