Definition:Galois Group of Field Extension

Definition
Let $L / K$ be a field extension.

The Galois group of $L / K$ is the subgroup of the automorphism group of $L$ consisting of field automorphisms that fix $K$ point-wise:
 * $\Gal {L / K} = \set {\sigma \in \Aut L: \forall k \in K: \map \sigma k = k}$

As a topological group
The notation $\Gal {L / K}$ is also a shorthand for the topological group:
 * $\struct {\Gal {L / K}, \tau}$

where $\tau$ is the Krull topology.

Alternative Definition
More generally, we can abandon the condition that $L / K$ be Galois if we choose an algebraic closure $\overline K$ such that $L \subseteq \overline K$ and define:


 * $\Gal {L / K} = \leftset {\sigma: L \to \overline K: \sigma}$ is an embedding of $L$ such that $\sigma$ fixes $K$ point-wise$\rightset {}$

This set will form a group $L / K$ is normal.

Also denoted as
The Galois group of $L / K$ can also be denoted $\map G {L / K}$.

Also known as
The Galois group of $L / K$ is also known as its automorphism group and denoted $\Aut {L / K}$.

Some authors refer to $\Aut {L / K}$ as a Galois group only when $L / K$ is a Galois extension.

Some sources use the notation $\map G {L \mid K}$.

Also see

 * Galois Group is Group
 * Definition:Absolute Galois Group