Superrosy fields and valuations

Abstract

We prove that every non-trivial valuation on an infinite superrosy field of positive characteristic has divisible value group and algebraically closed residue field. In fact, we prove the following more general result. Let K be a field such that for every finite extension L of K and for every natural number n>0 the index [L*:(L*)n] is finite and, if char(K)=p>0 and f: L L is given by f(x)=xp-x, the index [L+:f[L]] is also finite. Then either there is a non-trivial definable valuation on K, or every non-trivial valuation on K has divisible value group and, if char(K)>0, it has algebraically closed residue field. In the zero characteristic case, we get some partial results of this kind. We also notice that minimal fields have the property that every non-trivial valuation has divisible value group and algebraically closed residue field.