Product Space is Homeomorphic to Product Space with Factors Commuted

Theorem
Let $T_1$ and $T_2$ be topological spaces.

Let $T_1 \times T_2$ denote the product space of $T_1$ and $T_2$.

Let $t: T_1 \times T_2 \to T_2 \times T_1$ be the mapping defined as:
 * $\forall \tuple {x, y} \in T_1 \times T_2: \map t {x, y} = \tuple {y x}$

Then $t$ is a homeomorphism.

Proof
$t$ is trivially a bijection.

Let $U$ be open in $T_2 \times T_1$.

Then by definition of product space:
 * $U = U_2 \times U_1$

where:
 * $U_2$ is open in $T_2$
 * $U_1$ is open in $T_1$.

Hence by definition of product space:
 * $t^{-1} \sqbrk {U_2 \times U_1} = U_1 \times U_2$ is open in $T_1 \times T_2$.

Hence it has been shown that $t$ is continuous.

Similarly, let $V$ be open in $T_1 \times T_2$.

Then by definition of product space:
 * $V = V_1 \times V_2$

where:
 * $V_1$ is open in $T_1$
 * $V_2$ is open in $T_2$.

Hence by definition of product space:
 * $t \sqbrk {V_1 \times V_2} = V_2 \times V_1$ is open in $T_2 \times T_1$.

Hence it has been shown that $t^{-1}$ is continuous.

The result follows by definition of homeomorphism.