On some modular representations of the Borel subgroup of GL2(Qp)

Abstract

Colmez has given a recipe to associate a smooth modular representation Omega(W) of the Borel subgroup of GL2(Qp) to a Fpbar-representation W of Gal(Qpbar/Qp) by using Fontaine's theory of (phi,Gamma)-modules. We compute Omega(W) explicitly and we prove that if W is irreducible and dim(W)=2, then Omega(W) is the restriction to the Borel subgroup of GL2(Qp) of the supersingular representation associated to W in Breuil's correspondence.