regular group action
Let G be a group action
on a set X.
The action is called if for any pair α,β∈X there
exists exactly one g∈G such that g⋅α=β. (For a
right
group action it is defined correspondingly.)
A key example of a regular action is the regular representation
of a group, with action given by group multiplication
.
| Title | regular group action |
|---|---|
| Canonical name | RegularGroupAction |
| Date of creation | 2013-03-22 13:21:35 |
| Last modified on | 2013-03-22 13:21:35 |
| Owner | mathcam (2727) |
| Last modified by | mathcam (2727) |
| Numerical id | 7 |
| Author | mathcam (2727) |
| Entry type | Definition |
| Classification | msc 20A05 |
| Related topic | GroupAction |