Productive elements in group cohomology

Abstract

Let G be a finite group and k be a field of characteristic p>0. A cohomology class ζ ∈ Hn(G,k) is called productive if it annihilates *kG(Lζ,Lζ). We consider the chain complex of projective kG-modules which has the homology of an (n-1)-sphere and whose k-invariant is ζ under a certain polarization. We show that ζ is productive if and only if there is a chain map : such that ( ε) and (ε ) . Using the Postnikov decomposition of , we prove that there is a unique obstruction for constructing a chain map satisfying these properties. Studying this obstruction more closely, we obtain theorems of Carlson and Langer on productive elements.