Wielandt subgroup is strictly characteristic

This article gives the statement, and possibly proof, of the fact that for any group, the subgroup obtained by applying a given subgroup-defining function (i.e., Wielandt subgroup) always satisfies a particular subgroup property (i.e., strictly characteristic subgroup)}
View subgroup property satisfactions for subgroup-defining functions ${\displaystyle |}$ View subgroup property dissatisfactions for subgroup-defining functions

Statement

The Wielandt subgroup of a group (defined as the intersection of the normalizers of all its subnormal subgroups) is a strictly characteristic subgroup: any surjective endomorphism of the whole group maps it to itself.

Related facts

• Center is strictly characteristic
• Baer norm is strictly characteristic