Sur les champs de vecteurs invariants sur l'espace tangent d'un espace sym\'etrique

Abstract

Let G be a real reductive connected Lie group and σ an involution of G. Let H denote the identity component of the group of fixed points of σ, g the Lie algebra of G and q the -1 eigenspace of σ in g. The group H acts naturally on q via the adjoint representation. Let C∞( q)H denote the algebra of H-invariant smooth functions on q, and X( q)H the space of H-invariant smooth vetor fields on q. Any vetor field X∈ X( q)H defines naturally a derivation DX of the algebra C∞( q)H. We prove that the image of the map X DX is the set of derivations of the algebra C∞( q)H preserving the ideal C∞( q)H of C∞( q)H, where is a discriminant function on q.