Actions

Semidirect product

From Online Dictionary of Crystallography

Revision as of 10:00, 29 May 2007 by MassimoNespolo (talk | contribs) (link)

Produit semi-direct (Fr). Semidirektes Produkt (Ge). Producto semidirecto (Sp). Полупрямое произведение (Ru). Prodotto semidiretto (It). 準直積 (Ja).


In group theory, a semidirect product describes a particular way in which a group can be put together from two subgroups, one of which is normal.

Let G be a group, N a normal subgroup of G (i.e., NG) and H a subgroup of G. G is a semidirect product of N and H if there exists a homomorphism GH which is the identity on H and whose kernel is N. This is equivalent to say that:

  • G = NH and NH = {1} (where "1" is identity element of G )
  • G = HN and NH = {1}
  • Every element of G can be written as a unique product of an element of N and an element of H
  • Every element of G can be written as a unique product of an element of H and an element of N

One also says that "G splits over N".