Approximation and algebraicity in positive characteristic Hahn fields

Abstract

We study the relative algebraic closure K of Fp((t)) inside F((tQ)). We show that the supports of elements in K have order type strictly less than ωω. We also recover a theorem by Rayner giving a bound to the ramification away from p in the support of elements in K, and an analogue of Rayner's result for the residue field. This work has applications to the decidability of the first order theory of Fp((tQ)), and other tame fields, in the language of valued fields with a constant symbol for t.