TOPICS
Search

Cyclic Group C_3


C_3 is the unique group of group order 3. It is both Abelian and cyclic. Examples include the point groups C_3, C_(3v), and C_(3h) and the integers under addition modulo 3 (Z_3). No modulo multiplication groups are isomorphic to C_3.

CyclicGroupC3CycleGraph

The cycle graph of C_3 is shown above, and the cycle index is

Z(C_3)=1/3x_1^3+2/3x_3.

The elements A_i of the group satisfy A_i^3=1 where 1 is the identity element.

CyclicGroupC3Table

Its multiplication table is illustrated above and enumerated below (Cotton 1990, p. 10).

C_3 1 A B
1 1 A B
A A B 1
B B 1 A

Since C_3 is Abelian, the conjugacy classes are {1}, {A}, and {B}. The only subgroups of C_3 are the trivial group {1} and the entire group, which are both trivially normal. C_3 is therefore a simple group, as are all cyclic graphs of prime order.

The irreducible representation (character table) is therefore

Gamma 1 A B
Gamma_1 1 1 1
Gamma_2 1 1 -1
Gamma_3 1 -1 1

AltStyle によって変換されたページ (->オリジナル) /