Algebraic series and valuation rings over nonclosed fields

Abstract

Suppose that k is an arbitrary field. Consider the field k((x1,...,xn)), which is the quotient field of the ring k[[x1,...,xn]] of formal power series in the variables x1,...,xn, with coefficients in k. Suppose that σ is a formal power series in x1,...,xn with coefficints in the algebraic closure of k. We give a very simple necessary and sufficient condition for σ to be algebraic over k((x1,...,xn)). As an application of our methods, we give a characterization of valuation rings V which dominate an excellent, Noetherian local domain R of dimension two, and such that the rank increases after passing to the completion of a birational extension of R.