In mathematics, Artin–Schreier theory is a branch of Galois theory, specifically a positive characteristic analogue of Kummer theory, for Galois extensions of degree equal to the characteristic p. Artin and Schreier introduced Artin–Schreier theory for extensions of prime degree p, and Witt generalized it to extensions of prime power degree pn. If K is a field of characteristic p, a prime number, any polynomial of the form
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| - Artin-Schreier-Theorie (de)
- Artin–Schreier theory (en)
- Théorie d'Artin-Schreier (fr)
- アルティン・シュライアー理論 (ja)
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| - Die Artin-Schreier-Theorie gehört in der Mathematik zur Körpertheorie. Für Körper positiver Charakteristik beschreibt sie abelsche Galois-Erweiterungen vom Exponenten und ergänzt damit die Kummer-Theorie. Sie ist benannt nach Emil Artin und Otto Schreier. (de)
- En mathématiques, la théorie d'Artin-Schreier donne une description des extensions galoisiennes de degré p d'un corps de caractéristique p. Elle traite un cas inaccessible à la théorie de Kummer. (fr)
- 数学において、アルティン・理論 (Artin–Schreier theory) は、標数 p の体の p 次ガロワ拡大の記述を与える。従ってそれはクンマー理論では記述できない場合を扱う。 (ja)
- In mathematics, Artin–Schreier theory is a branch of Galois theory, specifically a positive characteristic analogue of Kummer theory, for Galois extensions of degree equal to the characteristic p. Artin and Schreier introduced Artin–Schreier theory for extensions of prime degree p, and Witt generalized it to extensions of prime power degree pn. If K is a field of characteristic p, a prime number, any polynomial of the form (en)
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| - In mathematics, Artin–Schreier theory is a branch of Galois theory, specifically a positive characteristic analogue of Kummer theory, for Galois extensions of degree equal to the characteristic p. Artin and Schreier introduced Artin–Schreier theory for extensions of prime degree p, and Witt generalized it to extensions of prime power degree pn. If K is a field of characteristic p, a prime number, any polynomial of the form for in K, is called an Artin–Schreier polynomial. When for all , this polynomial is irreducible in K[X], and its splitting field over K is a cyclic extension of K of degree p. This follows since for any root β, the numbers β + i, for , form all the roots—by Fermat's little theorem—so the splitting field is . Conversely, any Galois extension of K of degree p equal to the characteristic of K is the splitting field of an Artin–Schreier polynomial. This can be proved using additive counterparts of the methods involved in Kummer theory, such as Hilbert's theorem 90 and additive Galois cohomology. These extensions are called Artin–Schreier extensions. Artin–Schreier extensions play a role in the theory of solvability by radicals, in characteristic p, representing one of the possible classes of extensions in a solvable chain. They also play a part in the theory of abelian varieties and their isogenies. In characteristic p, an isogeny of degree p of abelian varieties must, for their function fields, give either an Artin–Schreier extension or a purely inseparable extension. (en)
- Die Artin-Schreier-Theorie gehört in der Mathematik zur Körpertheorie. Für Körper positiver Charakteristik beschreibt sie abelsche Galois-Erweiterungen vom Exponenten und ergänzt damit die Kummer-Theorie. Sie ist benannt nach Emil Artin und Otto Schreier. (de)
- En mathématiques, la théorie d'Artin-Schreier donne une description des extensions galoisiennes de degré p d'un corps de caractéristique p. Elle traite un cas inaccessible à la théorie de Kummer. (fr)
- 数学において、アルティン・理論 (Artin–Schreier theory) は、標数 p の体の p 次ガロワ拡大の記述を与える。従ってそれはクンマー理論では記述できない場合を扱う。 (ja)
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