Normal subgroup Guide, Meaning , Facts, Information and Description
In mathematics, a normal subgroup N of a group G is a subgroup invariant under conjugation; that is, for each element n in N and each g in G, the element g-1ng is still in N. The statement N is a normal subgroup of G is written:
- .
- N g = g g−1 N g = g N for all g in G.
Normal subgroups are of relevance because if N is normal, then the factor group G/N may be formed. Normal subgroups of G are precisely the kernelss of group homomorphisms f : G → H.
{e} and G are always normal subgroups of G. If these are the only ones, then G is said to be simple.
All subgroups N of an abelian group G are normal, because g−1Ng = g−1gN = N.
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