A note on the non-trivial elements in the cohomology groups of the Steenrod algebra

Abstract

Let F2 be the prime field of two elements and let GLs:= GL(s, F2) be the general linear group of rank s. Denote by A the Steenrod algebra over F2. The (mod-2) Lambda algebra, , is one of the tools to describe those mysterious "Ext-groups". In addition, the s-th algebraic transfer of William Singer Singer is also expected to be a useful tool in the study of them. This transfer is a homomorphism Trs: F2 GLsP A(H*(B Vs, F2)) Ext As,s+*(F2, F2), where Vs denotes the elementary abelian 2-group of rank s, and H*(B Vs) is the homology group of the classifying space of Vs, while P A(H*(B Vs, F2)) means the primitive part of H*(B Vs, F2) under the action of A. It has been shown that Trs is highly non-trivial and, more precisely, that Trs is an isomorphism for s≤ 3. In addition, Singer proved that Tr4 is an isomorphism in some internal degrees. He was also investigated the image of the fifth transfer by using invariant theory. In this note, we use another method to study the image of Tr5. More precisely, by direct computations using a representation of Tr5 over the algebra , we show that Tr5 detects the non-zero elements h0d0∈ Ext A5, 5+14(F2, F2),\ h2e0∈ Ext A5, 5+20(F2, F2) and h1h4c0∈ Ext A5, 5+24(F2, F2). The same argument can be used for homological degrees s≥ 6 under certain conditions.