On a construction for the generators of the polynomial algebra as a module over the Steenrod algebra

Abstract

Let Pn be the graded polynomial algebra F2[x1,x2,… ,xn] with the degree of each generator xi being 1, where F2 denote the prime field of two elements. The Peterson hit problem is to find a minimal generating set for Pn regarded as a module over the mod-2 Steenrod algebra, A. Equivalently, we want to find a vector space basis for F2 A Pn in each degree d. Such a basis may be represented by a list of monomials of degree d. In this paper, we present a construction for the A-generators of Pn and prove some properties of it. We also explicitly determine a basis of F2 A Pn for n = 5 and the degree d = 15.2s - 5 with s an arbitrary positive integer. These results are used to verify Singer's conjecture for the fifth Singer algebraic transfer in respective degree.