Ordinary representations of G(Qp) and fundamental algebraic representations

Abstract

Let G be a split connected reductive algebraic group over Qp such that both G and its dual group G-hat have connected centres. Motivated by a hypothetical p-adic Langlands correspondence for G(Qp) we associate to an n-dimensional ordinary (i.e. Borel valued) representation rho : Gal(Qp-bar/Qp) to G-hat(E) a unitary Banach space representation Pi(rho)ord of G(Qp) over E that is built out of principal series representations. (Here, E is a finite extension of Qp.) Our construction is inspired by the "ordinary part" of the tensor product of all fundamental algebraic representations of G. There is an analogous construction over a finite extension of Fp. In the latter case, when G=GLn we show under suitable hypotheses that Pi(rho)ord occurs in the rho-part of the cohomology of a compact unitary group. We also prove a weaker version of this result in the p-adic case.