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In group theory, a branch of mathematics, an opposite group is a way to construct a group from another group that allows one to define right action as a special case of left action.

This is a natural transformation of binary operation from a group to its opposite. g1, g2 denotes the ordered pair of the two group elements. *' can be viewed as the naturally induced addition of +.

Monoids, groups, rings, and algebras can be viewed as categories with a single object. The construction of the opposite category generalizes the opposite group, opposite ring, etc.

Definition

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Let   be a group under the operation  . The opposite group of  , denoted  , has the same underlying set as  , and its group operation   is defined by  .

If   is abelian, then it is equal to its opposite group. Also, every group   (not necessarily abelian) is naturally isomorphic to its opposite group: An isomorphism   is given by  . More generally, any antiautomorphism   gives rise to a corresponding isomorphism   via  , since

 

Group action

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Let   be an object in some category, and   be a right action. Then   is a left action defined by  , or  .

See also

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