Shintani descent for standard supercharacters of algebra groups

Abstract

Let A(q) be a finite-dimensional nilpotent algebra over a finite field Fq with q elements, and let G(q) = 1+A(q). On the other hand, let denote the algebraic closure of Fq, and let A = A(q) Fq . Then G = 1+A is an algebraic group over equipped with an Fq-rational structure given by the usual Frobenius map F:G G, and G(q) can be regarded as the fixed point subgroup GF. For every n ∈ N, the nth power Fn:G G is also a Frobenius map, and GFn identifies with G(qn) = 1 + A(qn). The Frobenius map restricts to a group automorphism F:G(qn) G(qn), and hence it acts on the set of irreducible characters of G(qn). Shintani descent provides a method to compare F-invariant irreducible characters of G(qn) and irreducible characters of G(q). In this paper, we show that it also provides a uniform way of studying supercharacters of G(qn) for n ∈ N. These groups form an inductive system with respect to the inclusion maps G(qm) G(qn) whenever m n, and this fact allows us to study all supercharacter theories simultaneously, to establish connections between them, and to relate them to the algebraic group G. Indeed, we show that Shintani descent permits the definition of a certain ``superdual algebra'' which encodes information about the supercharacters of G(qn) for n ∈ N.