About this representation
Group
| M11
|
Group generators
| Standard generators
|
Number of points
| 11
|
Primitivity information
| Primitive
|
Transitivity degree
| 4
|
Rank
| 2
|
Suborbit lengths
| 1, 10
|
Character
| 1 + 10a
|
Point stabiliser
| M10 = A6.23
|
Notes
| This representation acts 4-transitively and preserves an S(4, 5, 11) Steiner system. One of the 66 blocks is {1, 2, 3, 4, 5}, and the others can be found with the GAP commands:
G := Group(a, b); # Where a and b are the generators
B := [1, 2, 3, 4, 5];
O := Orbit(G, B, OnSets);
|
Contributed by
| Not recorded
|
Download
This representation is available in the following formats:
On conjugacy classes
Conjugacy class |
Fixed points |
Cycle type |
1A
| 11
|
|
2A
| 3
| 24
|
3A
| 2
| 33
|
4A
| 3
| 42
|
5A
| 1
| 52
|
6A
| 0
| 2, 3, 6
|
8A
| 1
| 2, 8
|
8B
| 1
| 2, 8
|
11A
| 0
| 11
|
11B
| 0
| 11
|
Checks applied
Check |
Description |
Date |
Checked by |
Result |
Presentation
| Check against the relations in a presentation. If this test passes, then the group is of the correct isomorphism type, and the generators are those stated. Note that the presentation itself is not checked here.
| Aug 2, 2006
| certify.pl version 0.05
| Pass
|
Semi-presentation
| Check against a semi-presentation. If this fails, then the representation is not on standard generators, and may generate the wrong group. Note that the semi-presentation itself is not checked here.
| Jul 4, 2006
| certify.pl version 0.05
| Pass
|
Order
| Check that the elements generate a group of the correct order.
| Jul 18, 2006
| permanalyse version 0.03
| Pass
|
Number of points
| Check whether the permutation representation is acting on the stated number of points.
| Jul 4, 2006
| certify.pl version 0.05
| Pass
|
Files exist
| Check whether files exist (where stated).
| Jul 4, 2006
| certify.pl version 0.05
| Pass
|