On the induction functor from group algebras to distribution algebras

Abstract

Let G be a reductive algebraic group scheme defined over Fp and k be an algebraically closed field of characteristic p. There are two associated families of finite group schemes, the r-th Frobenius kernels, denoted by Gr, and the fixed points of the iterated Frobenius map, the finite groups of Lie type, denoted by G(Fq). Bendel, Nakano and Pillen initiated the investigation of the induction functor indG(Fq)G-. Using filtrations and truncation, large amounts of data coming from the algebraic group and the Frobenius kernels can be transferred to the finite group. This paper looks at connections between a fundamental theorem of Chastkofsky and Jantzen and the induction functor via the cohomology and representation theory of G.