Approximation forte pour les vari\'et\'es avec une action d'un groupe lin\'eaire

Abstract

Let G be a connected linear algebraic group over a number field. Let U X be a G-equivariant open embedding of a G-homogeneous space with connected stabilizers into a smooth G-variety. We prove that X satisfies strong approximation with Brauer-Manin condition off a set S of places of k under either of the following hypotheses : (i) S is the set of archimedean places; (ii) S is a nonempty finite set and k×= k[X]×. The proof builds upon the case X=U, which has been the object of several works.