A representation theorem for the pn torsion of the Brauer group in characteristic p

Abstract

If K is a field of characteristic p then the p-torsion of the Brauer group, p Br\,(K), is represented by a quotient of the group of 1-forms, 1(K). Namely, we have a group isomorphism αp:1(K)/ da,\, (ap-a) dlogb\, :\, a,b∈ K,\, b≠ 0p Br\,(K), given by a db [ab,b)p ∀ a,b∈ K, b≠ 0. Here [·,· )p:K/ (K)× K×/K× pp Br\,(K) denotes the Artin-Schreier symbol. In this paper we generalize this result. Namely, we prove that for every n≥ 1 we have a representation of pn Br\,(K) by a quotient of 1(Wn(K)), where Wn(K) is the truncation of length n of the ring of p-typical Witt vectors, i.e. W\1,p,…,pn-1\(K). Explicitly, we have a group isomorphism αpn:1(Wpn(K))/ Fa db-a dVb\, :\, a,b∈ Wn(K),\, ([ap]-[a]) dlog[b]\, :\, a,b∈ K,\, b≠ 0pn Br\,(K). Here F is the Frobenius isomorphism, V is the Verschiebung map and [a] is the Teichm\"uller representative of a∈ K, [a]=(a,0,0,… ).