Socle

This article defines a subgroup-defining function, viz., a rule that takes a group and outputs a unique subgroup
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Definition

The socle of a group is defined as the subgroup generated by all minimal normal subgroups.

Group properties satisfied

The socle of a group is a direct product of simple groups. Further, any group that is the direct product of simple groups is its own socle.

In terms of the join-all operator

This property is obtained by applying the join-all operator to the property: minimal normal subgroup
View other properties obtained by applying the join-all operator

Facts

• Socle equals Omega-1 of center in nilpotent p-group: If ${\displaystyle G}$ is a group of prime power order, or more generally in a (possibly infinite) nilpotent p-group, the socle equals ${\displaystyle \Omega _{1}(Z(G))}$, i.e., the set of elements of prime order in the center of ${\displaystyle G}$ (along with the identity element). This follows from the fact that minimal normal implies central in nilpotent.
• If ${\displaystyle G}$ is a finite solvable group, then the socle is a product of elementary abelian ${\displaystyle p}$-groups for a collection of primes dividing the order of ${\displaystyle G}$ (though this may not include all primes dividing the order of ${\displaystyle G}$). This follows from the fact that minimal normal implies elementary abelian in finite solvable. (When ${\displaystyle G}$ is nilpotent, all primes dividing its order are included).

Examples

Groups of prime power order

Here, the socle is Omega-1 of the center:

Finite solvable groups that are not nilpotent

Here, the socle is a product of elementary abelian groups for some of the primes dividing the order of the group:

Computation

GAP command

The command for computing this subgroup-defining function in Groups, Algorithms and Programming (GAP) is:Socle
View other GAP-computable subgroup-defining functions