Stability of the centers of group algebras of general affine groups GAn(q)

Abstract

The general affine group GAn(q) consisting of invertible affine transformations of an affine space of codimension one in the vector space Fqn over a finite field Fq, can be viewed as a subgroup of the general linear group GLn(q) over Fq. In the article, we introduce the notion of the type of each matrix in GAn(q) and give an explicit representative for each conjugacy class. Then the center An(q) of the integral group algebra Z[GAn(q)] is proved to be a filtered algebra via the length function defined via the reflections lying in GAn(q). We show in the associated graded algebras Gn(q) the structure constants with respect to the basis consisting of the conjugacy class sums are independent of n. The structure constants in Gn(q) is further shown to contain the structure constants in the graded algebras introduced by the first author and Wang for GLn(q) as special cases. The stability leads to a universal stable center G(q) with positive integer structure constants only depending on q which governs the algebras Gn(q) for all n.