Configurations of flags in orbits of real forms

We obtain a branched spherical CR structure on the com- plement of the figure eight knot whose holonomy representation was given in [4].. We make explicit some fundamental

Indeed, for that specific example, we will check that the solutions to the compatibility equations give one and only one boundary unipotent complete spherical CR structure on the

Observe that in the case of an ideal triangulation of a hyperbolic manifold with shape parameters having all positive imaginary part and satisfying the edge conditions and

Key-words : Free group - Uniformly bounded representations... parametrized by spherical functions was given. There arises a prob- lem of finding the theorem for a free group related

This generalises both Deligne et al.’s result on the de Rham fundamental group, and Goldman and Millson’s result on deforming representations of K¨ ahler groups, and can be regarded

Thus the results of Section 6 give a com- binatoric way of constructing, in the special case of the orbits of a real form in a complex flag manifold, the basis of the fundamental

In characteristic zero, any finite group scheme is reduced, and its representations certainly form a semisimple category. GROTHENDIECK: Éléments de Géométrie

We construct the de Rham moduli space M^(X, G) for principal G-bundles with integrable connection, and the Dolbeault moduli space Mp^(X, G) for principal Higgs bundles for the group