G-equivariance of formal models of flag varieties

Abstract

Let G be a split connected reductive group scheme over the ring of integers o of a finite extension L|Qp and λ∈ X(T) an algebraic character of a split maximal torus T⊂eqG. Let us also consider Xrig the rigid analytic flag variety of G and G=G(L). In the first part of this paper, we introduce a family of λ-twisted differential operators on a formal model Y of Xrig. We compute their global sections and we prove coherence together with several cohomological properties. In the second part, we define the category of coadmissible G-equivariant arithmetic D(λ)-modules over the family of formal models of the rigid flag variety Xrig. We show that if λ is such that λ + is dominant and regular ( being the Weyl character), then the preceding category is anti-equivalent to the category of admissible locally analytic G-representations, with central character λ. In particular, we generalize the results of Huyghe-Patel-Strauch-Schmidt for algebraic characters (cf. [25] in the text).