The graded algebra of Steenrod qth powers

Abstract

The algebra Aq of Steenrod qth powers, where q = pe is a power of a prime p, is isomorphic to a subalgebra A'q of the algebra of Steenrod pth powers Ap. The filtration of Ap by powers of its augmentation ideal was studied by J. P. May in his Princeton thesis of 1964. We extend some of May's results to Aq and obtain a convenient set of defining relations for the graded algebra E0( Aq). In the case q=p, we recover the observation of S. B. Priddy that the subalgebra E0( Ap(n-2)) of E0( Ap) generated by the elements Ppj for 0 j n-2 is isomorphic to the graded algebra associated to the augmentation ideal filtration of the group algebra Fp U(n), where U(n) is the group of upper unitriangular matrices over Fp. The Arnon A basis of Ap is given by monomials which are minimal in the left lexicographic order of formal monomials in the Steenrod powers. K. G. Monks (for p=2) and D. Yu. Emelyanov and Th. Yu. Popelensky (for p>2) have found a triangular relation between this basis and the Milnor basis using a certain ordering on the Milnor basis. We introduce a variant of the Arnon A basis which is minimal for the right order, and show that this basis and Arnon's original A basis are also triangularly related to the Milnor basis of Aq using the right order on the Arnon A basis.