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Diagonal subgroup of a wreath product

From Groupprops

Revision as of 20:20, 16 April 2013 by Vipul (talk | contribs)

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Definition

A subgroup $G$ of a group $L$ is termed a diagonal subgroup of a wreath product if we can express $L$ as an internal wreath product (the internal version of external wreath product) with $G$ as the diagonal subgroup corresponding to the base direct power.

Relation with other properties

Related properties

Base of a wreath product: Note that for any wreath product, the base and diagonal are isomorphic as abstract groups. However, they need not be automorphic subgroups. In fact, while the base is always a 2-subnormal subgroup, the diagonal need not be subnormal at all, and in fact it is subnormal if and only if (as an abstract group) it is a nilpotent group (note that the whole group still need not be nilpotent).

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