C17
C17
is Abelian and simple
.
Statistics
Order of group
17
GAP identifier
17,1
Presentation
{ k | k
17
>
Orders of elements
1 of 1, 16*1 of 17
Centre
C17
Derived subgroup
1
Automorphism group
C16
Inner automorphism group
1
"Out"
(quotient of above)
C16
Schur multiplier
1
Permutation Diagrams
Sharply 1-transitive
on 17 points, even.
Cayley Graphs
Index to regular maps
Orientable
sphere
|
torus
|
2
|
3
|
4
|
5
|
6
Non-orientable
projective plane
|
4
|
5
|
6
|
7