Analogues of the pnth Hilbert symbol in characteristic p (updated)

Abstract

The pth degree Hilbert symbol (·,· )p:K×/K× p× K×/K× pp Br(K) from characteristic ≠ p has two analogues in characteristic p, [·,· )p:K/ (K)× K×/K× pp Br(K), where is the Artin-Schreier map x xp-x, and ((·,· ))p:K/Kp× K/Kpp Br(K). The symbol [·,· )p generalizes to an analogue of (·,· )pn via the Witt vectors, [·,· )pn:Wn(K)/ (Wn(K))× K×/K× pnpn Br(K). Here Wn(K) is the truncation of length n of the ring of p-typical Witt wectors, i.e. W\1,p,…,pn-1\(K). In this paper we construct similar generalizations for ((·,· ))p. Our construction involves Witt vectors and Weyl algebras. In the process we obtain a new kind of Weyl algebras in characteristic p, with many interesting properties. The symbols we introduce, ((·,· ))pn and, more generally, ((·,· ))pm,pn, which here are defined in terms of central simple algebras, coincide with the homonymous symbols we introduced in [arXiv:1711.00980] in terms of the symbols [·,· )pn. This will be proved in a future paper. In the present paper we only introduce the symbols and we prove that they have the same properties with the symbols from [arXiv:1711.00980]. These properies are enough to obtain the representation theorem for pn Br(K) from [arXiv:1711.00980], Theorem 4.10.