Explicit formulas for the cohomology of the elementary abelian p-groups

Abstract

Let G be an elementary abelian p-group, G Fpr and let s1,…,sr be a basis of G over Fp. Let V be the dual of G, V= Hom(G, Fp)=H1(G, Fp). Let x1,…,xr be the basis of V over Fp which is dual to the basis s1,…,sr of G. For 1≤ i≤ r we denote by yi=β (xi)∈ H2(G, Fp), where β :H1(G, Fp) H2(G, Fp) is the connecting Bockstein map. The ring (H*(G, Fp),+, ) satisfies H*(G, Fp)cases Fp[x1,…,xr]&p=2\\ (x1,…,xr) Fp[y1,…,yr]&p>2cases. When p=2 the isomorphism τ : Fp[x1,…,xr] H*(G, Fp) is given by xi1·s xin xi1·s xin∈ Hn(G, Fp). When p>3 the isomorphism τ : (x1,…,xr) Fp[y1,…,yr] H*(G, Fp) is given by xi1·s xil yj1·s yjk xi1·s xil yj1·s yjk∈ H2k+l(G, Fp). In this paper we give explicit formulas for the inverse isomorphism τ-1. The elements of H*(G, Fp) are written in terms of normalized cochains. During the proof we use an alternative way to describe the normalized cochains. Namely, for every G-module M we have Cn(G,M) Hom(Tn( I),M), where I is the augmented ideal of G, I= : Z[G] Z.