The Steenrod algebra from the group theoretical viewpoint

Abstract

In the paper "The Steenrod algebra and its dual", J.Milnor determined the structure of the dual Steenrod algebra which is a graded commutative Hopf algebra of finite type. We consider the affine group scheme Gp represented by the dual Hopf algebra of the mod p Steenrod algebra. Then, Gp assigns a graded commutative algebra A* over a prime field of finite characteristic p to a set of isomorphisms of the additive formal group law over A*, whose group structure is given by the composition of formal power series. The aim of this paper is to show some group theoretic properties of Gp by making use of this presentation of Gp(A*). We give a decreasing filtration of subgroup schemes of Gp which we use for estimating the length of the lower central series of finite subgroup schemes of Gp. We also give a successive quotient maps Gp0Gp11Gp22·sk-1 Gp kkGp k+1k+1·s of affine group schemes over a prime field Fp such that the kernel of k is a maximal abelian subgroup.