On Peterson's open problem and representations of the general linear groups

Abstract

Fix Z/2 is the prime field of two elements and write A2 for the mod 2 Steenrod algebra. Denote by GLd:= GL(d, Z/2) the general linear group of rank d over Z/2 and by Pd the polynomial algebra Z/2[x1, x2, …, xd] as a connected unstable A2-module on d generators of degree one. We study the Peterson "hit problem" of finding the minimal set of A2-generators for Pd. It is equivalent to determining a Z/2-basis for the space of "cohits" Q Pd := Z/2 A2 Pd Pd/ A2+ Pd. This Q Pd is also a representation of GLd over Z/2. The problem for d= 5 is not yet completely solved, and unknown in general. In this work, we give an explicit solution to the hit problem of five variables in the generic degree n = r(2t -1) + 2ts with r = d = 5,\ s =8 and t an arbitrary non-negative integer. An application of this study to the cases t = 0 and t = 1 shows that the Singer algebraic transfer of rank 5 is an isomorphism in the bidegrees (5, 5+(13.20 - 5)) and (5, 5+(13.21 - 5)). Moreover, the result when t≥ 2 was also discussed. Here, the Singer transfer of rank d is a Z/2-algebra homomorphism from GLd-coinvariants of certain subspaces of Q Pd to the cohomology groups of the Steenrod algebra, Ext A2d, d+*( Z/2, Z/2). It is one of the useful tools for studying mysterious Ext groups and the Kervaire invariant one problem.