Equivariant de Rham cohomology of homogeneous spaces

The space 1 X of all locally finite configurations in a Riemannian manifold X of infinite volume is considered. The deRham complex of square-integrable differential forms over 1 X , equipped with the Poisson measure, and the corresponding deRham cohomology are studied. The latter is shown to be unit

C\*-algebraic deformations of homogeneous spaces GÂ1 are constructed by completing dense subspaces of C 0 (GÂ1 ) in a different multiplication and C\*-norm; these deformations are equivariant in the sense that they still carry a natural action of G by left translation. The motivating examples are th

We assume that G is in general position, so any l hyperplanes intersect in a point and any l+1 hyperplanes have empty intersection. We call Q=> n i=1 : i a defining polynomial for G. Let S be the coordinate ring of V and identify S with the polynomial ring C[u 1 , ..., u l ]. Let 0 p [V ] denote the

Let X = C n . In this paper we present an algorithm that computes the de Rham cohomology groups H i dR (U, C) where U is the complement of an arbitrary Zariski-closed set Y in X. Our algorithm is a merger of the algorithm given in Oaku and Takayama (1999), who considered the case where Y is a hyper