| Display title | Group-scheme action |
| Default sort key | Group-scheme action |
| Page length (in bytes) | 4,921 |
| Namespace ID | 0 |
| Page ID | 178511 |
| Page content language | en - English |
| Page content model | wikitext |
| Indexing by robots | Allowed |
| Number of redirects to this page | 0 |
| Counted as a content page | Yes |
| HandWiki item ID | None |
| Edit | Allow all users (infinite) |
| Move | Allow all users (infinite) |
| Page creator | imported>WikiG |
| Date of page creation | 06:44, 22 December 2020 |
| Latest editor | imported>WikiG |
| Date of latest edit | 06:44, 22 December 2020 |
| Total number of edits | 1 |
| Recent number of edits (within past 90 days) | 0 |
| Recent number of distinct authors | 0 |
Description | Content |
Article description: (description)
This attribute controls the content of the description and og:description elements. | In algebraic geometry, an action of a group scheme is a generalization of a group action to a group scheme. Precisely, given a group S-scheme G, a left action of G on an S-scheme X is an S-morphism
$ \sigma :G\times _{S}X\to X $
such that
(associativity) $ \sigma \circ (1_{G}\times \sigma )=\sigma... |
