Structure of the space of GL4( Z2)-coinvariants Z2GL4( Z2) PH*( Z24, Z2) in some generic degrees and its application

Abstract

Let A denote the Steenrod algebra at the prime 2 and let k = Z2. An open problem of homotopy theory is to determine a minimal set of A-generators for the polynomial ring Pq = k[x1, …, xq] = H*(kq, k) on q generators x1, …, xq with |xi|= 1. Equivalently, one can write down explicitly a basis for the graded vector space Q q := kA Pq in each non-negative degree n. This is the content of the classical "hit problem" in literature [30]. Based on this problem, we are interested in the q-th cohomological transfer TrqA of Singer [39], which is one of the useful tools for describing mod-2 cohomology of the algebra A. This transfer is a linear map from the space of GLq(k)-coinvariant k GLq(k) P((Pq)n*) of Q q to the k-cohomology group of the Steenrod algebra, ExtAq, q+n(k, k). Here GLq(k) is the general linear group of degree q over the field k, and P((Pq)n*) is the primitive part of (Pq)*n under the action of A. Singer conjectured that TrqA is a monomorphism, but this remains unanswered for all q≥ 4. The present paper is to devoted to the investigation of this conjecture for the rank 4 case. More specifically, basing the techniques of the hit problem of four variables, we explicitly determine the structure of k GL4(k) P((P4)n*) in some generic degrees n. Applying these results and a representation of Tr4A over the lambda algebra, we notice that Singer's conjecture is true for the rank 4 transfer in those degrees n. Also, we give some conjectures on the dimensions of kGLq(k) ((P4)n*) for the remaining degrees n. As a consequence, Singer's conjecture holds for Tr4A. This study and our previous results have been provided a panorama of the behavior of the fourth cohomological transfer.