A Beilinson-Bernstein theorem for twisted arithmetic differential operators on the formal flag variety

Abstract

Let us suppose that Qp is the field of p-adic numbers and G is a split connected reductive group scheme over Zp. In this work we will introduce a sheaf of twisted arithmetic differential operators on the formal flag variety of G, associated to a general character. We will generalize the arguments of C. Huyghe and T. Schmidt, concerning the D-affinity of the formal flag variety of G, of certain sheaves of p-adically complete twisted arithmetic differential operators associated to an algebraic character, and the calculation of the global sections.