Irreducible Modules of Reductive Groups with Borel-stable Line

Abstract

Let p be a prime number and =Fp, the algebraic closure of the finite field Fp of p elements. Let G be a connected reductive group defined over Fp and B be a Borel subgroup of G (not necessarily defined over Fp). We show that for each (one-dimensional) character θ of B (not necessarily rational), there is a unique (up to isomorphism) irreducible G-module L(θ) containing θ as a B-submodule, and moreover, L(θ) is isomorphic to a parabolic induction from a finite-dimensional irreducible L-module for some Levi subgroup L of G. Thus, we have classified and constructed all (abstract) irreducible G-modules with B-stable line (i.e. an one-dimensional B-submodule). As a byproduct, we give a new proof of a result of Borel and Tits on the classification of finite-dimensional irreducible G-modules.