Add to ORKGAbstract. We construct algebraically closed fields containing an algebraic closure of the field of power series in several variables over a characteristic zero field. Each of these fields depends on the choice of an Abhyankar valuation and are constructed via the Newton-Puiseux method. But the main goal of this paper is to study the Galois group of a polynomial with power series coefficients. In particular by examining more carefully the case of monomial valuations we are able to give several results concerning the Galois group of a polynomial whose discriminant is a weighted homogeneous polynomial. In particula
Wir betrachten ein über einem algebraischen Zahlkörper K irreduzibles Polynom h mit Galois-Gruppe G...
Let K be a finite field, K(x) be the field of rational functions in x over K and K be the field of f...
International audienceWe address the question of computing one selected term of analgebraic power se...
Abstract. We begin this paper by constructing different alge-braically closed fields containing an a...
We investigate valued fields which admit a valuation basis. Given a countable ordered abelian group ...
Let $K$ be a field of characteristic zero. We deal with the algebraic closure of the field of fracti...
AbstractWe investigate valued fields which admit a valuation basis. Given a countable ordered abelia...
Computing the Galois group of the splitting field of a given polynomial with integer coefficients ov...
The Poincaré series, Py(f) of a polynomial f was first introduced by Borevich and Shafarevich in [BS...
In 1932, Mahler introduced a classification of transcendental numbers that pertained to both complex...
AbstractWe construct a sequence of univariate polynomials over an arbitrary Hilbertian field which a...
The inverse Galois problem asks whether every finite group G occurs as a Galois group over the field...
AbstractWe extend some results of Christol and Furstenberg to the case of several variables: (1) A p...
Introduction [Abbreviated]: The primary purpose of this thesis is to demonstrate a method for the de...
Algebraische Potenzreihen sind formale Potenzreihen f(x), für die ein nicht triviales Polynom P(x, ...
Wir betrachten ein über einem algebraischen Zahlkörper K irreduzibles Polynom h mit Galois-Gruppe G...
Let K be a finite field, K(x) be the field of rational functions in x over K and K be the field of f...
International audienceWe address the question of computing one selected term of analgebraic power se...
Abstract. We begin this paper by constructing different alge-braically closed fields containing an a...
We investigate valued fields which admit a valuation basis. Given a countable ordered abelian group ...
Let $K$ be a field of characteristic zero. We deal with the algebraic closure of the field of fracti...
AbstractWe investigate valued fields which admit a valuation basis. Given a countable ordered abelia...
Computing the Galois group of the splitting field of a given polynomial with integer coefficients ov...
The Poincaré series, Py(f) of a polynomial f was first introduced by Borevich and Shafarevich in [BS...
In 1932, Mahler introduced a classification of transcendental numbers that pertained to both complex...
AbstractWe construct a sequence of univariate polynomials over an arbitrary Hilbertian field which a...
The inverse Galois problem asks whether every finite group G occurs as a Galois group over the field...
AbstractWe extend some results of Christol and Furstenberg to the case of several variables: (1) A p...
Introduction [Abbreviated]: The primary purpose of this thesis is to demonstrate a method for the de...
Algebraische Potenzreihen sind formale Potenzreihen f(x), für die ein nicht triviales Polynom P(x, ...
Wir betrachten ein über einem algebraischen Zahlkörper K irreduzibles Polynom h mit Galois-Gruppe G...
Let K be a finite field, K(x) be the field of rational functions in x over K and K be the field of f...
International audienceWe address the question of computing one selected term of analgebraic power se...