A note on the modular representation on the Z/2-homology groups of the fourth power of real projective space and its application

Abstract

One knows that, the connected graded ring P h= Z/2[t1, …, th]= \Pn h\n≥ 0, which is graded by the degree of the homogeneous terms P hn of degree n in h generators with the degree of each ti being one, admits a left action of A as well as a right action of the general linear group GLh. A central problem of homotopy theory is to determine the structure of the space of GLh-coinvariants, Z/2GLh Ann A[P hn]*. Solving this problem is very difficult and still open for h≥ 4. In this Note, our intent is of studying the dimension of Z/2GLh Ann A[P hn]* for the case h = 4 and the "generic" degrees n of the form nk, r, s = k(2s - 1) + r.2s, where k,\, r,\, s are positive integers. Applying the results, we investigate the behaviour of the Singer cohomological "transfer" of rank 4. Singer's transfer is a homomorphism from a certain subquotient of the divided power algebra (a1(1), …, ah(1)) to mod-2 cohomology groups Ext Ah, h+*( Z/2, Z/2) of the algebra A. This homomorphism is useful for depicting the Ext groups. Additionally, in higher ranks, by using the results on A-generators for P 5 and P 6, we show in Appendix that the transfer of rank 5 is an isomorphism in som certain degrees of the form nk, r, s, and that the transfer of rank 6 does not detect the non-zero elements h22g1 = h4Ph2∈ Ext A6, 6+n6, 10, 1( Z/2, Z/2), and D2∈ Ext A6, 6+n6, 10, 2( Z/2, Z/2). Besides, we also probe the behavior of the Singer transfer of ranks 7 and 8 in internal degrees ≤ 15.

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