locally
Let be a property of groups. A group is said to be locally if every nontrivial finitely generated subgroup of has property .
For example, the locally infinite groups are precisely the torsion-free groups. Other classes of groups defined this way include locally finite groups and locally cyclic groups.
| Title | locally |
|---|---|
| Canonical name | LocallycalP |
| Date of creation | 2013-03-22 14:18:57 |
| Last modified on | 2013-03-22 14:18:57 |
| Owner | yark (2760) |
| Last modified by | yark (2760) |
| Numerical id | 5 |
| Author | yark (2760) |
| Entry type | Definition |
| Classification | msc 20E25 |
| Related topic | GeneralizedCyclicGroup |
| Related topic | LocallyFiniteGroup |
| Related topic | LocallyNilpotentGroup |