Fully invariant direct factor: Difference between revisions
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# It is both a [[fully invariant subgroup]] and a [[direct factor]]. | # It is both a [[fully invariant subgroup]] and a [[direct factor]]. | ||
# It is both a [[defining ingredient::homomorph-containing subgroup]] and a [[direct factor]]. | # It is both a [[defining ingredient::homomorph-containing subgroup]] and a [[direct factor]]. | ||
# It is both an [[defining ingredient::isomorph-onctaining subgroup]] and a [[direct factor]]. | |||
===Equivalence of definitions=== | |||
{{further|[[Equivalence of definitions of fully invariant direct factor]]}} | |||
==Relation with other properties== | ==Relation with other properties== | ||
Revision as of 20:01, 11 August 2009
This page describes a subgroup property obtained as a conjunction (AND) of two (or more) more fundamental subgroup properties: fully invariant subgroup and direct factor
View other subgroup property conjunctions | view all subgroup properties
Definition
A subgroup of a group is termed a fully invariant direct factor if it satisfies the following equivalent conditions:
- It is both a fully invariant subgroup and a direct factor.
- It is both a homomorph-containing subgroup and a direct factor.
- It is both an isomorph-onctaining subgroup and a direct factor.
Equivalence of definitions
Further information: Equivalence of definitions of fully invariant direct factor