Difference between revisions of "Galois group"
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| − | The automorphism group of a [[Galois extension|Galois extension]] | + | The automorphism group of a |
| + | [[Galois extension|Galois extension]] $L$ of a field $k$, i.e. the | ||
| + | group of all automorphisms of the field $L$ leaving the elements of | ||
| + | the subfield $k$ fixed. The group is denoted by $G(L/k)$ or by $\textrm{Gal}(L/k)$. The | ||
| + | field of invariants $L^G(L/k)$ coincides with the field $k$. If $L$ is the | ||
| + | splitting field of a polynomial $f$ over $k$, the Galois group $G(L/k)$ is | ||
| + | also called the Galois group of the polynomial $f$. These groups are | ||
| + | important in the Galois theory of algebraic equations. The computation | ||
| + | of the Galois groups for extensions of algebraic number fields is one | ||
| + | of the fundamental tasks of algebraic number theory. Finding Galois | ||
| + | extensions with an Abelian Galois group (Abelian extensions) is a part | ||
| + | of class field theory. Galois groups of algebraic function fields are | ||
| + | also a subject of algebraic geometry. | ||
| − | Let | + | Let $L$ be a field and let $G$ be a finite subgroup of the |
| + | automorphism group of $L$; $L$ will then be a Galois extension of the | ||
| + | field of invariants $k=L^G$, and the Galois group of this extension is | ||
| + | isomorphic to $G$; moreover, the degree of the extension, $[L:k]$, is | ||
| + | equal to the order of $G$. | ||
| − | The fundamental result on Galois groups is the following theorem, which is sometimes called the main theorem on Galois extensions or the theorem on Galois correspondence. If | + | The fundamental result on Galois groups is the following theorem, |
| + | which is sometimes called the main theorem on Galois extensions or the | ||
| + | theorem on Galois correspondence. If $L$ is a Galois extension of | ||
| + | finite degree of a field $k$, then there exists a one-to-one | ||
| + | correspondence between all subgroups $H$ of the Galois group $G(L/k)$ and | ||
| + | all subfields $F$ of $L$ that contain $k$, and the $H$ and $F$ | ||
| + | corresponding to each other are such that $F$ is the field of | ||
| + | invariants of $H$ and $H$ is the Galois group of $G(L/k)$ | ||
| + | (cf. | ||
| + | [[Galois correspondence|Galois correspondence]]). This theorem has | ||
| + | numerous analogues in many mathematical theories, and can be | ||
| + | generalized to extensions of infinite degree (cf. | ||
| + | [[Galois topological group|Galois topological group]]). There exists a | ||
| + | generalization of the concept of a Galois group to extensions of | ||
| + | arbitrary commutative rings, schemes (cf. | ||
| + | [[Fundamental group|Fundamental group]]), and also to the case of | ||
| + | extensions of skew-fields. | ||
====References==== | ====References==== | ||
| − | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> | + | <table><TR><TD valign="top">[1]</TD> |
| + | <TD valign="top"> N. Bourbaki, "Algebra" , ''Elements of mathematics'' , '''1''' , Springer (1989) pp. Chapt. 1–3 (Translated from French)</TD> | ||
| + | </TR><TR><TD valign="top">[2]</TD> | ||
| + | <TD valign="top"> S. Lang, "Algebra" , Addison-Wesley (1984)</TD> | ||
| + | </TR><TR><TD valign="top">[3]</TD> | ||
| + | <TD valign="top"> M.M. Postnikov, "Fundamentals of Galois theory" , Noordhoff (1962) (Translated from Russian)</TD> | ||
| + | </TR><TR><TD valign="top">[4]</TD> | ||
| + | <TD valign="top"> N. Jacobson, "The theory of rings" , Amer. Math. Soc. (1943)</TD> | ||
| + | </TR></table> | ||
====Comments==== | ====Comments==== | ||
| − | A Galois group can be endowed with the Krull topology, making it a topological group. This topology is discrete if and only if the group is finite. For the Galois correspondence in the case of infinite Galois groups see [[Galois topological group|Galois topological group]]. | + | A Galois group can be endowed with the Krull |
| + | topology, making it a topological group. This topology is discrete if | ||
| + | and only if the group is finite. For the Galois correspondence in the | ||
| + | case of infinite Galois groups see | ||
| + | [[Galois topological group|Galois topological group]]. | ||
Revision as of 14:11, 21 November 2011
The automorphism group of a Galois extension $L$ of a field $k$, i.e. the group of all automorphisms of the field $L$ leaving the elements of the subfield $k$ fixed. The group is denoted by $G(L/k)$ or by $\textrm{Gal}(L/k)$. The field of invariants $L^G(L/k)$ coincides with the field $k$. If $L$ is the splitting field of a polynomial $f$ over $k$, the Galois group $G(L/k)$ is also called the Galois group of the polynomial $f$. These groups are important in the Galois theory of algebraic equations. The computation of the Galois groups for extensions of algebraic number fields is one of the fundamental tasks of algebraic number theory. Finding Galois extensions with an Abelian Galois group (Abelian extensions) is a part of class field theory. Galois groups of algebraic function fields are also a subject of algebraic geometry.
Let $L$ be a field and let $G$ be a finite subgroup of the automorphism group of $L$; $L$ will then be a Galois extension of the field of invariants $k=L^G$, and the Galois group of this extension is isomorphic to $G$; moreover, the degree of the extension, $[L:k]$, is equal to the order of $G$.
The fundamental result on Galois groups is the following theorem, which is sometimes called the main theorem on Galois extensions or the theorem on Galois correspondence. If $L$ is a Galois extension of finite degree of a field $k$, then there exists a one-to-one correspondence between all subgroups $H$ of the Galois group $G(L/k)$ and all subfields $F$ of $L$ that contain $k$, and the $H$ and $F$ corresponding to each other are such that $F$ is the field of invariants of $H$ and $H$ is the Galois group of $G(L/k)$ (cf. Galois correspondence). This theorem has numerous analogues in many mathematical theories, and can be generalized to extensions of infinite degree (cf. Galois topological group). There exists a generalization of the concept of a Galois group to extensions of arbitrary commutative rings, schemes (cf. Fundamental group), and also to the case of extensions of skew-fields.
References
| [1] | N. Bourbaki, "Algebra" , Elements of mathematics , 1 , Springer (1989) pp. Chapt. 1–3 (Translated from French) |
| [2] | S. Lang, "Algebra" , Addison-Wesley (1984) |
| [3] | M.M. Postnikov, "Fundamentals of Galois theory" , Noordhoff (1962) (Translated from Russian) |
| [4] | N. Jacobson, "The theory of rings" , Amer. Math. Soc. (1943) |
Comments
A Galois group can be endowed with the Krull topology, making it a topological group. This topology is discrete if and only if the group is finite. For the Galois correspondence in the case of infinite Galois groups see Galois topological group.
How to Cite This Entry:
Galois group. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Galois_group&oldid=19663
Galois group. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Galois_group&oldid=19663
This article was adapted from an original article by I.V. Dolgachev (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article