Versal deformations in generalized flag manifolds

Given an orbit space M/ and an equivalence relation defined in it by means of the action of a group G, we obtain a miniversal deformation of an orbit through a miniversal deformation in M with regard to a suitable group action of G × . We show some applications to the perturbations of m-tuples of su

In this paper we deal with Radon transforms for generalized flag manifolds in the framework of quasi-equivariant D-modules. We shall follow the method employed by Baston-Eastwood and analyze the Radon transform using the Bernstein-Gelfand-Gelfand resolution and the Borel-Weil-Bott theorem. We shall

Suppose that X is a generalized n-manifold, n 5, satisfying the disjoint disks property, and M and Q are topological m-and q-manifolds, respectively, 1-LCC embedded in X, with nm 3 and nq 3. We define what it means for M to be stably transverse to Q in X. In the metastable range, 3m 2(n -1) and 3(m

Let G be a connected semisimple algebraic group over C, P a parabolic subgroup, g and p their Lie algebras. We prove a microlocal version of Gyoja's conjectures [2] about a relation between the irreducibility of generalized Verma modules on g induced from p and the zeroes of b-functions of P -semi-i