Short exact sequence of groups: Difference between revisions

Latest revision as of 04:17, 3 May 2013

Definition

A short exact sequence of groups is an exact sequence of groups with five terms, where the first and last term are the trivial group. Explicitly, it has the form:

$1 \to N \to G \to Q \to 1$

The exactness of the sequence is equivalent to three condition:

The homomorphism from $N$ to $G$ is injective, so that $N$ is isomorphic to its image, which is a subgroup of $G$ . We often abuse notation by conflating $N$ with its image in $G$ .
The homomorphism from $G$ to $Q$ is surjective, so that $Q$ is isomorphic to a quotient group of $G$ .
The image of the homomorphism from $N$ to $G$ equals the kernel of the homomorphism from $G$ to $Q$ .

Relationship with group extensions

We can think of short exact sequences as being informationally equivalent to group extensions. Explicitly, given a short exact sequence of the form:

$1 \to N \to G \to Q \to 1$

we can think of $G$ as a group extension with "normal subgroup" $N$ and "quotient group" $Q$ .

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 ==Definition==
-A '''short exact sequence of groups''' is an [[exact sequence of groups]] with five terms, where the first and last term are the trivial group. Explicitly, it has the form:
+A '''short exact sequence of groups''' is an [[defining ingredient::exact sequence of groups]] with five terms, where the first and last term are the trivial group. Explicitly, it has the form:
 <math>1 \to N \to G \to Q \to 1</math>
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 The exactness of the sequence is equivalent to three condition:
-* The homomorphism from <math>N</math> to <math>G<math> is injective, so that <math>N</math> is isomorphic to its image, which is a subgroup of <math>G</math>. We often abuse notation by conflating <math>N</math> with its image in <math>G</math>.
+* The homomorphism from <math>N</math> to <math>G</math> is injective, so that <math>N</math> is isomorphic to its image, which is a subgroup of <math>G</math>. We often abuse notation by conflating <math>N</math> with its image in <math>G</math>.
 * The homomorphism from <math>G</math> to <math>Q</math> is surjective, so that <math>Q</math> is isomorphic to a [[quotient group]] of <math>G</math>.
 * The image of the homomorphism from <math>N</math> to <math>G</matH> equals the kernel of the homomorphism from <math>G</math> to <math>Q</math>.