A counter-example to Singer's conjecture for the algebraic transfer

Abstract

Write Pk:= F2[x1,x2,… ,xk] for the polynomial algebra over the prime field F2 with two elements, in k generators x1, x2, … , xk, each of degree 1. The polynomial algebra Pk is considered as a module over the mod-2 Steenrod algebra, A. Let GLk be the general linear group over the field F2. This group acts naturally on Pk by matrix substitution. Since the two actions of A and GLk upon Pk commute with each other, there is an inherit action of GLk on F2 APk. Denote by ( F2 APk)nGLk the subspace of F2 APk consisting of all the GLk-invariant classes of degree n. In 1989, Singer [24] defined the homological algebraic transfer k :Tor Ak,k+n( F2, F2) ( F2 APk)nGLk, where TorAk, k+n(F2, F2) is the dual of ExtAk,k+n( F2, F2), the E2 term of the Adams spectral sequence of spheres. 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 a technique of the Peterson hit problem we prove that Singer's conjecture is not true for k=5 and the internal degree n = 108. This result also refutes a one of Ph\'uc in [19].