Jacquet modules of parabolically induced representations and Weyl groups (Q2762707)

The author proves some general results about Jacquet modules of parabolically induced representations of reductive \(p\)-adic groups. These results are then applied to the case of ``generalized Steinberg'' representations of classical groups.NEWLINENEWLINENEWLINEIn particular, let \(M\) be a parabolic subgroup of the reductive group \(G\). The main idea in this paper is to consider an intermediate parabolic \(N\) (or several of them) such that \(M\subset N\subset G\) and to describe a Jacquet module with respect to \(N\) of a parabolically induced representation from \(M\). The main result of this paper is a description of the constituents of a Jacquet module with respect to \(M\) of a parabolically induced representation from \(M\), a description which uses the intermediate parabolic \(N\).NEWLINENEWLINENEWLINEThese results are then applied by the author to study ``generalized Steinberg'' representations of classical \(p\)-adic groups. In particular, the author proves the existence, and in some cases the uniqueness, of a square integrable subquotient of certain induced representations. Some of these last results were first proved by Tadić for certain cases [\textit{M. Tadić}, Am. J. Math. 120, 159-210 (1998; Zbl 0903.22008)].