Links between generalized Montr\'eal-functors

Abstract

Let o be the ring of integers in a finite extension K/Qp and G=G(Qp) be the Qp-points of a Qp-split reductive group G defined over Zp with connected centre and split Borel B=TN. We show that Breuil's pseudocompact (,)-module D(π) attached to a smooth o-torsion representation π of B=B(Qp) is isomorphic to the pseudocompact completion of the basechange OE(N0),DSV(π) to Fontaine's ring (via a Whittaker functional N0=N(Zp) Zp) of the \'etale hull DSV(π) of DSV(π) defined by Schneider and Vigneras. Moreover, we construct a G-equivariant map from the Pontryagin dual π to the global sections Y(G/B) of the G-equivariant sheaf Y on G/B attached to a noncommutative multivariable version D,,∞(π) of Breuil's D(π) whenever π comes as the restriction to B of a smooth, admissible representation of G of finite length.