On the algebraic transfers of ranks 4 and 6 at generic degrees

Abstract

Let A denote the classical singly-graded Steenrod algebra over the binary field Z/2. We write Pk:= Z/2[t1, t2, …, tk] as the polynomial algebra on k generators, each having a degree of one. Let GLk be the general linear group of rank k over Z/2. Then, Pk is an A[GLk]-module. The structure of the cohomology groups, Ext Ak, k+( Z/2, Z/2), of the Steenrod algebra has, thus far, resisted clear understanding and full description for all homological degrees k. In the study of these groups, the algebraic transfer -- constructed by W. Singer in [Math. Z. 202, 493--523 (1989)] -- plays an important role. The Singer transfer is represented by the following homomorphism: Trk: Hom([( Z/2 A Pk)]GLk, Z/2) Ext Ak, k+( Z/2, Z/2). Among Singer's contributions is an interesting open conjecture asserting the monomorphism of Trk for all k. For this reason, our main aim in this article is to ascertain the validity of the Singer conjecture for ranks 4 and 6 in certain families of internal degrees. We place particular emphasis on the rank 4 case. More precisely, we present a detailed proof for certain generic degree cases when verifying the conjecture of rank four, which were succinctly noted in our previous work [Proc. Roy. Soc. Edinburgh Sect. A 153, 1529--1542 (2023)].