From \'etale P+-representations to G-equivariant sheaves on G/P

Abstract

Let K/ Qp be a finite extension with ring of integers o, let G be a connected reductive split Qp-group of Borel subgroup P=TN and let α be a simple root of T in N. We associate to a finitely generated module D over the Fontaine ring over o endowed with a semilinear \'etale action of the monoid T+ (acting on the Fontaine ring via α), a G( Qp)-equivariant sheaf of o-modules on the compact space G( Qp)/P( Qp). Our construction generalizes the representation D P1 of GL(2, Qp) associated by Colmez to a (,)-module D endowed with a character of Qp*.