On the hit problem for the Steenrod algebra in some generic degrees and applications

Abstract

Let Pn:=H*((RP∞)n) F2[x1,x2,…,xn] be the polynomial algebra over the prime field of two elements, F2. We investigate the Peterson hit problem for the polynomial algebra Pn, viewed as a graded left module over the mod-2 Steenrod algebra, A. For n>4, this problem is still unsolved, even in the case of n=5 with the help of computers. The purpose of this paper is to continue our study of the hit problem by developing a result in ph31 for Pn in the generic degree r(2s-1)+m.2s where r=n=5,\ m=13, and s is an arbitrary non-negative integer. Note that for s=0, and s=1, this problem has been studied by Phuc ph20ta, and ph31, respectively. As an application of these results, we get the dimension result for the polynomial algebra in the generic degree d=(n-1).(2n+u-1-1)+.2n+u-1 where u is an arbitrary non-negative integer, ∈ \23, 67 \, and n=6. One of the major applications of hit problem is in surveying a homomorphism introduced by Singer, which is a homomorphism Trn :Tor An, n+d ( F2, F2) (F2A Pn)dGL(n; F2) from the homology of the Steenrod algebra to the subspace of (F2A Pn)d consisting of all the GL(n; F2)-invariant classes. It is a useful tool in describing the homology groups of the Steenrod algebra, Tor An, n+d( F2, F2). The behavior of the fifth Singer algebraic transfer in degree 5(2s-1)+13.2s was also discussed at the end of this paper.

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