SOME CLASSES OF COMPLEX CARTAN SPACES

A related problem is to approximate up to any given order a local holomorphic map sending two real-algebraic submanifolds (in complex spaces of arbitrary dimension) into each other

The origin of this paper is the following natural question: Given two Banach spaces B and E, is it possible to describe all the operators from B to E that can be extended to

In the framework of symmetric tensors and multivariate homogeneous polyno- mials, we study the spectral properties of multilinear forms attached to the Finsler metric and Cartan

We prove that the deRham cohomology classes of Lee forms of lo- cally conformally symplectic structures taming the complex struc- ture of a compact complex surface S with first

On every reduced complex space X we construct a family of complexes of soft sheaves X ; each of them is a resolution of the constant sheaf C X and induces the ordinary De Rham

They start with a family of Banach spaces associated with the boundary of the unit disk d in C (the set of complex numbers) and, for each complex number in the

n-dimensional projective variety, let !F be an analytic coherent sheaf on X locally free and let !F(m) denote the twisted sheaves associated to the

In these complexes the spaces are all duals of spaces of Fréchet-Schwartz and the maps are continuous, therefore topological homomorphisms.. Note that the maps a,