On a Vector Field Formula for the Lie Algebra of a Homogeneous Space

Let ᒄ be the Lie algebra of vector fields on an affine smooth curve ⌺. Our goal is to establish an orbit method for ᒄ. Since ᒄ is infinite-dimensional, we face some technical problems. Without having groups acting on ᒄ, we try nevertheless to define the notion of ''orbits.'' So, we focus our attenti

The space of linear differential operators on a smooth manifold M has a natural one-parameter family of Diff(M )-(and Vect(M )-) module structures, defined by their action on the space of tensor densities. It is shown that, in the case of secondorder differential operators, the Vect(M)-module struct

For a smooth compactification V of a principal homogeneous space E under a connected linear algebraic group G defined over a field k of characteristic zero, we present two formulas expressing Br V/Br k in terms of G.

In this paper we show that the vector field X {, h on a based path space W o (M) over a Riemannian manifold M defined by parallel translating a curve h in the initial tangent space T o M via an affine connection { induces a solution flow which preserves the Wiener measure on the based path space W o

If F is the finite field of characteristic p and order q s p , let F F q be the q category whose objects are functors from finite dimensional F -vector spaces to q F -vector spaces, and with morphisms the natural transformations between such q functors. Ž . A fundamental object in F F q is the injec

The aim of this paper is to determine the first three spaces of weight -1 of the adjoint cohomology of the Nijenhuis-Richardson algebra of the functions of a manifold, which are important in deformation theory (the first and second will be computed for an arbitrary weight q ≤ -1).