Projective special linear group is simple: Difference between revisions

Revision as of 15:14, 2 January 2009

This article gives the statement, and possibly proof, of a particular group or type of group (namely, Projective special linear group (?)) satisfying a particular group property (namely, Simple group (?)).

Statement

Let $k$ be a field and $n$ be a natural number greater than $1$ . Then, the projective special linear group $PSL_{n}(k)$ is a simple group provided one of these conditions holds:

$n\geq 3$ .
$k$ has at least four elements.

Facts used

Special linear group is quasisimple

Proof

The proof follows directly from fact (1), and the fact that the projective special linear group is the inner automorphism group of the special linear group.

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 ==Statement==
-Let <math>k</math> be a [[field]] and <math>n</math> be a [[natural number]]. Then, the [[projective special linear group]] <math>PSL_n(k)</math> is a [[simple group]] provided one of these conditions holds:
+Let <math>k</math> be a [[field]] and <math>n</math> be a [[natural number]] greater than <math>1</math>. Then, the [[projective special linear group]] <math>PSL_n(k)</math> is a [[simple group]] provided one of these conditions holds:
 * <math>n \ge 3</math>.