order (of a group)
The order of a group G is the number of elements of G, denoted |G|; if |G| is finite, then G is said to be a finite group
.
The order of an element g∈G is the smallest positive integer n such that gn=e, where e is the identity element; if there is no such n, then g is said to be of infinite order. By Lagrange’s theorem, the order of any element in a finite group divides the order of the group.
| Title | order (of a group) |
| Canonical name | OrderofAGroup |
| Date of creation | 2013-03-22 12:36:47 |
| Last modified on | 2013-03-22 12:36:47 |
| Owner | mathcam (2727) |
| Last modified by | mathcam (2727) |
| Numerical id | 9 |
| Author | mathcam (2727) |
| Entry type | Definition |
| Classification | msc 20A05 |
| Synonym | order |
| Related topic | Group |
| Related topic | Cardinality |
| Related topic | OrdersOfElementsInIntegralDomain |
| Related topic | OrderRing |
| Related topic | IdealOfElementsWithFiniteOrder |
| Defines | finite group |
| Defines | infinite order |
| Defines | order (of a group element) |