Abstract Algebra/Group Theory/Cyclic groups/Definition of a Cyclic Group

• A cyclic group generated by g is

• ${\displaystyle \langle g\rangle =\lbrace g^{n}\;|\;n\in \mathbb {Z} \rbrace }$

• where ${\displaystyle g^{n}={\begin{cases}\underbrace {g\ast g\cdots \ast g} _{n},&n\in \mathbb {Z} ,n\geq 0\\\underbrace {g^{-1}\ast g^{-1}\cdots \ast g^{-1}} _{-n},&n\in \mathbb {Z} ,n<0\end{cases}}}$

• Induction shows: ${\displaystyle g^{m+n}=g^{m}\ast g^{n}{\text{ and }}g^{mn}=[g^{m}]^{n}}$

Let C_m be a cyclic group of order m generated by g with ${\displaystyle \ast }$

Let ${\displaystyle (\mathbb {Z} /m,+)}$ be the group of integers modulo m with addition

C_m is isomorphic to ${\displaystyle (\mathbb {Z} /m,+)}$

Let n be the minimal positive integer such that gⁿ = e

${\displaystyle g^{i}=g^{j}\leftrightarrow i=j~{\text{mod}}~n}$

0. Define   ${\displaystyle {\begin{aligned}f\colon C_{m}&\to \mathbb {Z} /m\\g^{i}&\mapsto i~{\text{mod}}~m\end{aligned}}}$

Lemma shows f is well defined (only has one output for each input).

f is homomorphism:

${\displaystyle f(g^{i})+f(g^{j})=i+j~{\text{mod}}~m=f(g^{i+j})=f(g^{i}\ast g^{j})}$

f is injective by lemma

f is surjective as both ${\displaystyle \mathbb {Z} /m}$ and ${\displaystyle C_{m}}$ have m elements and f is injective