Subgroup

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Revision as of 15:18, 6 November 2008 by imported>Richard Pinch (reformat list; add commutator, Frattini, centre)
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In group theory, a subgroup of a group is a subset which is itself a group with respect to the same operations.

Formally, a subset S of a group G is a subgroup if it satisfies the following conditions:

  • The identity element of G is an element of S;
  • S is closed under taking inverses, that is, ;
  • S is closed under the group operation, that is, .

These correspond to the conditions on a group, with the exception that the associative property is necessarily inherited.

It is possible to replace these by the single closure property that S is non-empty and .

The group itself and the set consisting of the identity element are always subgroups.

Particular classes of subgroups include:

  • Centre of a group [r]: The subgroup of a group consisting of all elements which commute with every element of the group. [e]
  • Characteristic subgroup [r]: A subgroup which is mapped to itself by any automorphism of the whole group. [e]
  • Commutator subgroup [r]: The subgroup of a group generated by all commutators. [e]
  • Essential subgroup [r]: A subgroup of a group which has non-trivial intersection with every other non-trivial subgroup. [e]
  • Frattini subgroup [r]: The intersection of all maximal subgroups of a group. [e]
  • Normal subgroup [r]: Subgroup N of a group G where every expression g-1ng is in N for every g in G and every n in N. [e]