Closed subgroup of finite index implies open

Statement

Given: A topological group $G$ , a closed subgroup $H$ of finite index in $G$ .

To prove: $H$ is an open subgroup of $G$

Proof:

Step no.	Assertion/construction	Facts used	Given data used	Previous steps used	Explanation
1	For all $g \in G$ , the map $G \to G$ given by $x \mapsto g x$ is a self-homeomorphism of $G$ .	Definition of topological group	$G$ is a topological group.		[SHOW MORE] From the definition of topological group, the multiplication map $G \times G \to G$ is continuous. The map $x \mapsto g x$ is a composite of the fiber inclusion $x \mapsto (g, x)$ and the multiplication map, hence it is a continuous map. Further, its inverse is the map $x \mapsto g^{- 1} x$ . Thus, $x \mapsto g x$ is a homeomorphism for any $g \in G$ .
2	Every left coset of $H$ in $G$ is a closed subset of $G$ .	Homeomorphisms take closed subsets to closed subsets		Step (1)	By Step (1), $x \mapsto g x$ is a self-homeomorphism of $G$ , so it takes the closed subset $H$ to the closed subset $g H$ . Thus, for any $g \in G$ , $g H$ is closed in $G$ .
3	The union of all the left cosets of $H$ other than $H$ itself is closed in $G$	Union of finitely many closed subsets is closed	$H$ has finite index in $G$	Step (2)	Step-fact combination direct.
4	$H$ is open in $G$	A subset is open iff its set-theoretic complement is closed.		Step (3)	The set-theoretic complement of $H$ in $G$ is precisely the union of all the left cosets other than $H$ itself, and by Step (3), this is closed. Hence, $H$ is open.