Example6.1

Let $H$ be the subgroup of ${\mathbb Z}_6$ consisting of the elements 0 and 3. The cosets are

We will always write the cosets of subgroups of ${\mathbb Z}$ and ${\mathbb Z}_n$ with the additive notation we have used for cosets here. In a commutative group, left and right cosets are always identical.

Example6.2

Let $H$ be the subgroup of $S_3$ defined by the permutations $\{(1), (123), (132) \}\text{.}$ The left cosets of $H$ are

The right cosets of $H$ are exactly the same as the left cosets:

It is not always the case that a left coset is the same as a right coset. Let $K$ be the subgroup of $S_3$ defined by the permutations $\{(1), (1 2)\}\text{.}$ Then the left cosets of $K$ are

however, the right cosets of $K$ are

Lemma6.3

Let $H$ be a subgroup of a group $G$ and suppose that $g_1, g_2 \in G\text{.}$ The following conditions are equivalent.

1. $g_1 H = g_2 H\text{;}$

2. $H g_1^{-1} = H g_2^{-1}\text{;}$

3. $g_1 H \subset g_2 H\text{;}$

4. $g_2 \in g_1 H\text{;}$

5. $g_1^{-1} g_2 \in H\text{.}$

Theorem6.4

Let $H$ be a subgroup of a group $G\text{.}$ Then the left cosets of $H$ in $G$ partition $G\text{.}$ That is, the group $G$ is the disjoint union of the left cosets of $H$ in $G\text{.}$

Proof

Let $g_1 H$ and $g_2 H$ be two cosets of $H$ in $G\text{.}$ We must show that either $g_1 H \cap g_2 H = \emptyset$ or $g_1 H = g_2 H\text{.}$ Suppose that $g_1 H \cap g_2 H \neq \emptyset$ and $a \in g_1 H \cap g_2 H\text{.}$ Then by the definition of a left coset, $a = g_1 h_1 = g_2 h_2$ for some elements $h_1$ and $h_2$ in $H\text{.}$ Hence, $g_1 = g_2 h_2 h_1^{-1}$ or $g_1 \in g_2 H\text{.}$ By Lemma 6.3, $g_1 H = g_2 H\text{.}$

Remark6.5

There is nothing special in this theorem about left cosets. Right cosets also partition $G\text{;}$ the proof of this fact is exactly the same as the proof for left cosets except that all group multiplications are done on the opposite side of $H\text{.}$

Example6.6

Let $G= {\mathbb Z}_6$ and $H = \{ 0, 3 \}\text{.}$ Then $[G:H] = 3\text{.}$

Example6.7

Suppose that $G= S_3\text{,}$ $H = \{ (1),(123), (132) \}\text{,}$ and $K= \{ (1), (12) \}\text{.}$ Then $[G:H] = 2$ and $[G:K] = 3\text{.}$

Theorem6.8

Let $H$ be a subgroup of a group $G\text{.}$ The number of left cosets of $H$ in $G$ is the same as the number of right cosets of $H$ in $G\text{.}$

Proof

Let ${\mathcal L}_H$ and ${\mathcal R}_H$ denote the set of left and right cosets of $H$ in $G\text{,}$ respectively. If we can define a bijective map $\phi : {\mathcal L}_H \rightarrow {\mathcal R}_H\text{,}$ then the theorem will be proved. If $gH \in {\mathcal L}_H\text{,}$ let $\phi( gH ) = Hg^{-1}\text{.}$ By Lemma 6.3, the map $\phi$ is well-defined; that is, if $g_1 H = g_2 H\text{,}$ then $H g_1^{-1} = H g_2^{-1}\text{.}$ To show that $\phi$ is one-to-one, suppose that

Again by Lemma 6.3, $g_1 H = g_2 H\text{.}$ The map $\phi$ is onto since $\phi(g^{-1} H ) = H g\text{.}$