C17

C17 is Abelian and simple.

Statistics

Order of group17
GAP identifier17,1
Presentation{ k | k17 >
Orders of elements1 of 1, 16*1 of 17
CentreC17
Derived subgroup1
Automorphism groupC16
Inner automorphism group1
"Out" (quotient of above)C16
Schur multiplier1
 

Permutation Diagrams


Sharply 1-transitive
on 17 points, even.

Cayley Graphs




Index to regular maps