Vanishing theorems and Brauer-Hasse-Noether exact sequences for the cohomology of higher-dimensional fields

Abstract

Let k be a finite field, a p-adic field or a number field. Let K be a finite extension of the Laurent series field in m variables k((x1,...,xm)) or, more generally, a finite extension of the field of rational functions k((x1,...,xm))(y1,...,yn). When r is an integer, we consider the Galois module Q/Z(r) over K and we prove several vanishing theorems for its cohomology. In the particular case when K is a finite extension of the Laurent series field in two variables k((x1,x2)), we also prove exact sequences that play the role of the Brauer-Hasse-Noether exact sequence for the field K and that involve some of the cohomology groups of Q/Z(r) which do not vanish.