Inner Automorphisms form Subgroup of Symmetric Group

Theorem
Let $G$ be a group.

Let $\struct {\map \Gamma G, \circ}$ be the symmetric group on $G$.

Let $\Inn G$ denote the group of inner automorphisms of $G$.

Then:
 * $\Inn G \le \struct {\map \Gamma G, \circ}$

where $\le$ denotes the relation of being a subgroup.

Proof
An inner automorphism is a permutation on $G$ by definition.

From Inner Automorphisms form Normal Subgroup of Automorphisms:
 * $\Inn G \le \Aut G$

where $\Aut G$ denotes the set of automorphisms of $G$.

From Group of Automorphisms is Subgroup of Symmetric Group:
 * $\Aut G \le \struct {\map \Gamma G, \circ}$

Thus $\Inn G \le \struct {\map \Gamma G, \circ}$ as required.