]>
2020-07-10T16:52:37+00:00
Center not is fully invariant in class two p-group
0
en
Characteristic direct factor not implies fully invariant
0
en
Characteristic equals fully invariant in odd-order abelian group
0
en
Characteristic not implies fully invariant
0
en
Characteristic not implies fully invariant in class three maximal class p-group
0
en
Characteristic not implies fully invariant in finite abelian group
0
en
Characteristic not implies fully invariant in finitely generated abelian group
0
en
Characteristic not implies fully invariant in odd-order class two p-group
0
en
Characteristic not implies potentially fully invariant
0
en
Equivalence of definitions of fully invariant direct factor
0
en
Every nontrivial characteristic subgroup is potentially characteristic-and-not-fully invariant
0
en
Every nontrivial normal subgroup is potentially characteristic-and-not-fully invariant
0
en
Finitary symmetric group is not fully invariant in symmetric group
0
en
Finite direct power-closed characteristic not implies fully invariant
0
en
Finite group implies cyclic iff every subgroup is characteristic
0
en
Full invariance does not satisfy image condition
0
en
Full invariance does not satisfy intermediate subgroup condition
0
en
Full invariance is finite direct power-closed
0
en
Full invariance is not direct power-closed
0
en
Full invariance is quotient-transitive
0
en
Full invariance is strongly join-closed
0
en
Full invariance is transitive
0
en
Fully invariant implies characteristic
0
en
Fully invariant implies finite direct power-closed characteristic
0
en
Fully invariant implies verbal in reduced free group
0
en
Fully invariant not implies abelian-potentially verbal in abelian group
0
en
Fully invariant not implies verbal in finite abelian group
0
en
Fully invariant of strictly characteristic implies strictly characteristic
0
en
Fully invariant subgroup of abelian group not implies divisibility-closed
0
en
Fully invariant subgroup of additive group of Lie ring is derivation-invariant and fully invariant
0
en
Fully invariant upper-hook EEP implies fully invariant
0
en
Homocyclic normal implies potentially fully invariant in finite
0
en
Image-closed characteristic not implies fully invariant
0
en
No subgroup property between normal Sylow and subnormal or between Sylow retract and retract is conditionally lattice-determined
0
en
Odd-order abelian group not is fully invariant in holomorph
0
en
Odd-order cyclic group is fully invariant in holomorph
0
en
Odd-order elementary abelian group is fully invariant in holomorph
0
en
Self-centralizing and minimal normal implies fully invariant in co-Hopfian group
0
en
Socle not is fully invariant in class two p-group
0
en
Special linear group is fully characteristic in general linear group
0
en
Strictly characteristic not implies fully invariant
0
en
Verbal implies fully invariant
0
en