Parabolic Induction via the Parabolic pro-p Iwahori--Hecke Algebra

Abstract

Let G be a connected reductive group defined over a locally compact non-archimedean field F, let P be a parabolic subgroup with Levi M and compatible with a pro-p Iwahori subgroup of G := G(F). Let R be a commutative unital ring. We introduce the parabolic pro-p Iwahori--Hecke R-algebra HR(P) of P := P(F) and construct two R-algebra morphisms PM HR(P) HR(M) and PG HR(P) HR(G) into the pro-p Iwahori--Hecke R-algebra of M := M(F) and G, respectively. We prove that the resulting functor Mod-HR(M) Mod-HR(G) from the category of right HR(M)-modules to the category of right HR(G)-modules (obtained by pulling back via PM and extension of scalars along PG) coincides with the parabolic induction due to Ollivier--Vign\'eras. The maps PM and PG factor through a common subalgebra HR(M,G) of HR(G) which is very similar to HR(M). Studying these algebras HR(M,G) for varying (M,G) we prove a transitivity property for tensor products. As an application we give a new proof of the transitivity of parabolic induction.