Computation Schemes for Splitting Fields of Polynomials

Splitting Fields for the Rational Polynomials X²−2, X²+X+1, X³−1, and X³−2

Schwarzweller, Christoph
Burgoa, Sara

January 2022

In [11] the existence (and uniqueness) of splitting fields has been formalized. In this article we a...

Gröbner basis of the alternating galoisian ideal

Valibouze, Annick

April 2011

AbstractThis article proposes an efficient and simple algebraic method of computation of a Gröbner b...

Basic Algorithms for Rational Function Fields

Müller-Quade, J.
Steinwandt, R.

February 1999

AbstractBy means of Gröbner basis techniques algorithms for solving various problems concerning subf...

Computation Schemes for Splitting Fields of Polynomials

Orange, Sébastien
Renault, Guénaël
Yokoyama, Kazuhiro

July 2009

International audienceIn this article, we present new results about the computation of a general sha...

Computation Schemes for Splitting Fields of Polynomials

Orange, Sébastien
Renault, Guénaël
Yokoyama, Kazuhiro

July 2009

International audienceIn this article, we present new results about the computation of a general sha...

Galois theory, splitting fields and computer algebra

Diaz-Toca, Gema M.

November 2006

AbstractWe provide some algorithms for dynamically obtaining both a possible representation of the s...

Dynamic Galois Theory and Gröbner Basis

Gema M. Dı́az-toca

February 2015

Given a separable polynomial f(T) of degree n over a field K, the purpose of this talk is to present...

Constructions using Galois Theory

Fieker, Claus
Sutherland, Nicole

October 2022

We describe algorithms to compute fixed fields, splitting fields and towers of radical extensions wi...

Multi-modular Algorithm for Computing the Splitting Field of a Polynomial

Renault, Guénaël
Yokoyama, Kazuhiro

July 2008

International audienceLet f be a univariate monic integral polynomial of degree n and let (α1, ..., ...

Using Galois Ideals for Computing Relative Resolvents

Aubry, Philippe
Valibouze, Annick

December 2000

AbstractIn this paper we show that some ideals which occur in Galois theory are generated by triangu...

Galois theory, splitting fields and computer algebra

Diaz-Toca, Gema M.

November 2006

AbstractWe provide some algorithms for dynamically obtaining both a possible representation of the s...

Computing a Gröbner basis of a polynomial ideal over a Euclidean domain

Kandri-Rody, Äbdelilah
Kapur, Deepak

August 1988

AbstractAn algorithm for computing a Gröbner basis of a polynomial ideal over a Euclidean domain is ...

Computing Galois groups over the rationals

Soicher, Leonard
McKay, John

June 1985

AbstractPractical computational techniques are described to determine the Galois group of a polynomi...

Dynamic Galois Theory

Diaz-Toca, G.M.
Lombardi, H.

December 2010

AbstractGiven a separable polynomial over a field, every maximal idempotent of its splitting algebra...

Polynomials for primitive nonsolvable permutation groups of degree d ⩽ 15

Malle, Gunter

August 1987

The determination of polynomials over ℚ(t) with a given primitive nonsolvable permutation group of d...

Splitting Fields for the Rational Polynomials X²−2, X²+X+1, X³−1, and X³−2

Schwarzweller, Christoph
Burgoa, Sara

January 2022

In [11] the existence (and uniqueness) of splitting fields has been formalized. In this article we a...

Gröbner basis of the alternating galoisian ideal

Valibouze, Annick

April 2011

AbstractThis article proposes an efficient and simple algebraic method of computation of a Gröbner b...

Basic Algorithms for Rational Function Fields

Müller-Quade, J.
Steinwandt, R.

February 1999

AbstractBy means of Gröbner basis techniques algorithms for solving various problems concerning subf...

Computation Schemes for Splitting Fields of Polynomials

Orange, Sébastien
Renault, Guénaël
Yokoyama, Kazuhiro

July 2009

International audienceIn this article, we present new results about the computation of a general sha...

Computation Schemes for Splitting Fields of Polynomials

Orange, Sébastien
Renault, Guénaël
Yokoyama, Kazuhiro

July 2009

International audienceIn this article, we present new results about the computation of a general sha...

Galois theory, splitting fields and computer algebra

Diaz-Toca, Gema M.

November 2006

AbstractWe provide some algorithms for dynamically obtaining both a possible representation of the s...

Dynamic Galois Theory and Gröbner Basis

Gema M. Dı́az-toca

February 2015

Given a separable polynomial f(T) of degree n over a field K, the purpose of this talk is to present...

Constructions using Galois Theory

Fieker, Claus
Sutherland, Nicole

October 2022

We describe algorithms to compute fixed fields, splitting fields and towers of radical extensions wi...

Multi-modular Algorithm for Computing the Splitting Field of a Polynomial

Renault, Guénaël
Yokoyama, Kazuhiro

July 2008

International audienceLet f be a univariate monic integral polynomial of degree n and let (α1, ..., ...

Using Galois Ideals for Computing Relative Resolvents

Aubry, Philippe
Valibouze, Annick

December 2000

AbstractIn this paper we show that some ideals which occur in Galois theory are generated by triangu...

Galois theory, splitting fields and computer algebra

Diaz-Toca, Gema M.

November 2006

AbstractWe provide some algorithms for dynamically obtaining both a possible representation of the s...

Computing a Gröbner basis of a polynomial ideal over a Euclidean domain

Kandri-Rody, Äbdelilah
Kapur, Deepak

August 1988

AbstractAn algorithm for computing a Gröbner basis of a polynomial ideal over a Euclidean domain is ...

Computing Galois groups over the rationals

Soicher, Leonard
McKay, John

June 1985

AbstractPractical computational techniques are described to determine the Galois group of a polynomi...

Dynamic Galois Theory

Diaz-Toca, G.M.
Lombardi, H.

December 2010

AbstractGiven a separable polynomial over a field, every maximal idempotent of its splitting algebra...

Polynomials for primitive nonsolvable permutation groups of degree d ⩽ 15

Malle, Gunter

August 1987

The determination of polynomials over ℚ(t) with a given primitive nonsolvable permutation group of d...

Splitting Fields for the Rational Polynomials X²−2, X²+X+1, X³−1, and X³−2

Schwarzweller, Christoph
Burgoa, Sara

January 2022

In [11] the existence (and uniqueness) of splitting fields has been formalized. In this article we a...

Gröbner basis of the alternating galoisian ideal

Valibouze, Annick

April 2011

AbstractThis article proposes an efficient and simple algebraic method of computation of a Gröbner b...

Basic Algorithms for Rational Function Fields

Müller-Quade, J.
Steinwandt, R.

February 1999

AbstractBy means of Gröbner basis techniques algorithms for solving various problems concerning subf...

Computation Schemes for Splitting Fields of Polynomials

Abstract

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Computation Schemes for Splitting Fields of Polynomials

Abstract

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