An application of the hit problem to the algebraic transfer

Abstract

Let Pk be the polynomial algebra F2[x1,x2,… ,xk] over the field F2 with two elements, in k variables x1, x2, … , xk, each variable of degree 1. Denote by GLk the general linear group over F2 which regularly acts on Pk. The algebra Pk is a module over the mod-2 Steenrod algebra A. In 1989, Singer [22] defined the k-th homological algebraic transfer, which is a homomorphism k=(k)m : Tor Ak,k+m ( F2, F2) ( F2 APk)mGLk from the homological group of the mod-2 Steenrod algebra Tor Ak,k+m ( F2, F2) to the subspace ( F2 APk)mGLk of F2 APk consisting of all the GLk-invariant classes of degree m. In general, the transfer k is not a monomorphism and Singer made a conjecture that k is an epimorphism for any k ≥slant 0. The conjecture is studied by many authors. It is true for k ≤slant 3 but unknown for k ≥slant 4. In this paper, by using the results of the Peterson hit problem for the polynomial algebra in four variables, we prove that Singer's conjecture for the fourth algebraic transfer is true in the families of generic degrees ds,t = 2s+t+2s-3 and ns,t=2s+t+2s-2 with s,\, t positive integers. Our results also show that many of the results in Ph\'uc [16,17,18] are seriously false. The proofs of the results in Ph\'uc's works are only provided for a few special cases but they are false and incomplete.