Fields of dimension one algebraic over a global or local field need not be of type C1

Abstract

Let (K, v) be a Henselian discrete valued field with a quasifinite residue field. This paper proves the existence of an algebraic extension E/K satisfying the following: (i) E has dimension dim(E) 1, i.e. the Brauer group Br(E ) is trivial, for every algebraic extension E /E; (ii) finite extensions of E are not C 1-fields. This, applied to the maximal algebraic extension K of the field Q of rational numbers in the field Q p of p-adic numbers, for a given prime p, proves the existence of an algebraic extension E p/Q, such that dim(E p) 1, E p is not a C 1-field, and E p has a Henselian valuation of residual characteristic p.