A note on the hit problem for the Steenrod algebra and its applications

Abstract

Let Pk=H*((RP∞)k) be the modulo-2 cohomology algebra of the direct product of k copies of infinite dimensional real projective spaces RP∞. Then, Pk is isomorphic to the graded polynomial algebra F2[x1,…,xk] of k variables, in which each xj is of degree 1, and let GLk be the general linear group over the prime field F2 which acts naturally on Pk. Here the cohomology is taken with coefficients in the prime field F2 of two elements. We study the hit problem, set up by Frank Peterson, of finding a minimal set of generators for the polynomial algebra Pk as a module over the mod-2 Steenrod algebra, A. In this Note, we explicitly compute the hit problem for k = 5 and the degree 5(2s-1)+24.2s with s an arbitrary non-negative integer. These results are used to study the Singer algebraic transfer which is a homomorphism from the homology of the mod-2 Steenrod algebra, TorAk, k+n(F2, F2), to the subspace of F2APk consisting of all the GLk-invariant classes of degree n. We show that Singer's conjecture for the algebraic transfer is true in the case k=5 and the above degrees. This method is different from that of Singer in studying the image of the algebraic transfer. Moreover, as a consequence, we get the dimension results for polynomial algebra in some generic degrees in the case k=6.