Hilbert Cube is Homeomorphic to Countable Infinite Product of Real Number Unit Intervals

Theorem
Let $M_1 = \struct {I^\omega, d_2}$ be the Hilbert cube:


 * $M_1 = \ds \prod_{k \mathop \in \N} \closedint 0 {\dfrac 1 k}$

under the same metric as that of the Hilbert sequence space:
 * $\ds \forall x = \sequence {x_i}, y = \sequence {y_i} \in I^\omega: \map {d_2} {x, y} := \paren {\sum_{k \mathop \ge 0} \paren {x_k - y_k}^2}^{\frac 1 2}$

Let $M_2$ be the metric space defined as:
 * $M_2 = \ds \prod_{k \mathop \in \N} \closedint 0 1$

under the Tychonoff topology.

Then $M_1$ and $M_2$ are homeomorphic.

Proof
Let $x = \sequence {x_i}$ be an arbitrary element of $M_1$.

Let $f: M_1 \to M_2$ be the mapping defined as:
 * $\forall x \in M_1: \map f x = \tuple {x_1, 2 x_2, 3 x_3, \ldots}$

Then $f$ is seen to be a bijection.

It remains to be shown that an open set in $M_1$ is mapped to an open set in $M_2$ by $f$.