19/10/18 07:18:10.93 Zm+yHrIo.net
>>918
>・B_{5}'メタ巡回群 (位数 20)
追加参考
(後の”Metacyclic Group Wolfram MathWorld”の方が、綺麗に纏まっているが、書きぶりがちょっと違う)
URLリンク(en.wikipedia.org)
Metacyclic group
(抜粋)
In group theory, a metacyclic group is an extension of a cyclic group by a cyclic group. That is, it is a group G for which there is a short exact sequence
1 → K → G → H → 1
where H and K are cyclic. Equivalently, a metacyclic group is a group G having a cyclic normal subgroup N, such that the quotient G/N is also cyclic.
Properties
Metacyclic groups are both supersolvable and metabelian.
Examples
・Any cyclic group is metacyclic.
・The direct product or semidirect product of two cyclic groups is metacyclic. These include