On Kummer extensions of the power series field

Let p be an odd prime and n a positive integer and let k be a field of Ž . r p and let r denote the largest integer between 0 and n such that K l k s p Ž . r r r k , where denotes a primitive p th root of unity. The extension Krk is p p separable, but not necessarily normal and, by Greither and Pa

The structure of GALols groups of local fields has been studied by many mathematicians. The description of maximal p-extensions was obtained by 1. R . SAFAREVIC [S] and S . P. DEMUSHKIN [D]. Important results about the GALOIS group of an algebraic closure of local fields were proved by K. IWASAWA [

Let k ; K be a finitely generated field extension of transcendence degree 1. Ž . Ž . ## Consider the corresponding extension D D k ; D D K of skew fields of the first 1 1 Ž . Ž . Weyl algebra. We show that the D D k -valuations of D D K are in one-to-one 1 1 Ž . correspondence with the k-valuati

For a skew field extension L/K, a number of intermediate fields can be defined on the basis of the centralizer of K in L. In this paper such intermediate fields are studied in detail. Among the results are a standard decomposition of any skew field extension of finite degree and four types of skew f