On the principal series representations of semisimple groups with Frobenius maps

Abstract

Let G be a simply connected semisimple algebraic group over =Fq, the algebraically closure of Fq (the finite field with q=pe elements), and F be the standard Frobenius map. Let B be an F-stable Borel subgroup and T an F-stable maximal torus contained in B. Set Gqr= GFr and Bqr= BFr for any r>0. This paper studies the original induced module Ind B Gλ= G Bλ (here H is the group algebra of the group H, and λ is a rational character of T regarded as a B-module). We show that if λ is regular and dominant, then there is a surjective G-module homomorphism IndBqr Gλ→ St L(λ) for any r>0, where St is the infinite dimensional Steinberg module defined by Nanhua Xi. As a consequence, we show that Ind B Gλ is irreducible if λ if and only if λ is regular and antidominant. Moreover, for G=SL2(Fq) and 0<λ<p, we show that Ind B Gλ have infinite many composition factors with each finite dimensional. Consequently, we find certain λ for which Ind B Gλ has an infinite submodule filtration for the general G.