On the Hurwitz product of formal power series and automata

## Abstract In this paper we study the Kummer extensions __K__ ′ of a power series field __K__ = __k__ ((__X__~1~, …, __X~r~__)), where __k__ is an algebraically closed field of arbitrary characteristic, with special emphasis in the case where __K__ ′ is generated by a Puiseux power series. (© 2008

Let R be an associative ring with unit element, let R t be the additive group of formal power series in one indeterminate with coefficients in R. ww xx In this paper, we determine all possible multiplications on R t , which are distributive and satisfy other reasonable conditions. ww xx To each mu

If K is a field, let the ring R consist of finite sums of homogeneous elements in Then, R contains M, the free semi-group on the countable set of variables {x 1 , x 2 , x 3 , . . .}. In this paper, we generalize the notion of admissible order from finitely generated sub-monoids of M to M itself; as