Generalized Hilbert Sequence Space is Metric Space/Lemma 1

Theorem
Let $\alpha$ be an infinite cardinal number.

Let $I$ be an indexed set of cardinality $\alpha$.

Let $H^\alpha$ be the generalized Hilbert sequence space of weight $\alpha$ $\struct{A, d_2}$ where:
 * $A$ is the set of all real-valued functions $x : I \to \R$ such that:
 * $(1)\quad \set{i \in I: x_i \ne 0}$ is countable
 * $(2)\quad$ the generalized sum $\ds \sum_{i \mathop \in I} x_i^2$ is a convergent net.
 * $d_2: A \times A: \to \R$ is the real-valued function defined as:
 * $\ds \forall x = \family {x_i}, y = \family {y_i} \in A: \map {d_2} {x, y} := \paren {\sum_{i \mathop \in I} \paren {x_i- y_i}^2}^{\frac 1 2}$

Let $H = \struct{\ell^2, d_{\ell^2}}$ denote the Hilbert sequence space, where:
 * $\ell^2$ denotes the real $2$-sequence space, that is, the set of all real sequences $\sequence {x_n}$ such that the series $\ds \sum_{n \mathop = 0}^\infty x_n^2$ is convergent
 * $d_{\ell^2}$ denotes the real $2$-sequence metric, that is, the real-valued function $d_{\ell^2}: \ell^2 \times \ell^2: \to \R$ defined as:
 * $\ds \forall x = \sequence {x_n}, y = \sequence {y_n} \in \ell^2: \map {d_{\ell^2}} {x, y} := \paren {\sum_{n \mathop \ge 0} \paren {x_n - y_n}^2}^{\frac 1 2}$

Let $x_1, x_2, \ldots, x_m \in A$.

Then there exists $y_1, y_2, \ldots, y_m \in \ell^2$:
 * $\forall a,b \in \closedint 1 m : y_a \ne y_b \iff x_a \ne x_b$
 * $\forall a,b \in \closedint 1 m : \map {d_{\ell^2} } {y_a, y_b} = \map {d_2} {x_a, x_b}$

Proof
For each $k \in \closedint 1 m$, let:
 * $\ds \sum_{i \mathop \in I} \paren{x_k}_i^2$ converge to $r_k \in \R$.

From Characterization of Generalized Hilbert Sequence Space, there exists enumeration $J = \set{j_0, j_1, j_2, \ldots}$ of a countable set of $I$:


 * $\forall k \in \closedint 1 m : \set{i \in I : \paren{x_k}_i \ne 0} \subseteq J$


 * $\forall k \in \closedint 1 m : \sequence{\paren{x_k}_{j_n}} \in \ell^2$


 * $\forall k \in \closedint 1 m : \ds \sum_{n \mathop = 0}^\infty \paren{x_k}_{j_n}^2 = r_k$

From P-Sequence Space with Pointwise Addition and Pointwise Scalar Multiplication on Ring of Sequences forms Vector Space:
 * $\forall a, b \in \closedint 1 m : \sequence{\paren{x_a}_{j_n} - \paren{x_b}_{j_n}} \in {\ell^2}$

Let $a, b \in \closedint 1 m$

We have:
 * $\forall i \in I \setminus J : \paren{x_a}_i = \paren{x_b}_i = 0$

Hence:
 * $\forall i \in I \setminus J : \paren{x_a}_i - \paren{x_b}_i = 0$

It follows:
 * $\set{i : \paren{x_a}_i - \paren{x_b}_i \ne 0} \subseteq J$

Since $a, b$ were arbitrary:
 * $\forall a, b \in \closedint 1 m : \set{i : \paren{x_a}_i - \paren{x_b}_i \ne 0} \subseteq J$

We have:

For each $k \in \closedint 1 m$, let $y_k = \sequence{\paren{x_k}_{j_n}}$.

We have:
 * $\forall k \in \closedint 1 m : y_k \in \ell^2$.
 * $\forall a,b \in \closedint 1 m : \map {d_{\ell^2} } {y_a, y_b} = \map {d_2} {x_a, x_b}$

It remains to show that:
 * $\forall a,b \in \closedint 1 m : y_a \ne y_b \iff x_a \ne x_b$

Let $y_a \ne y_b$.

By definition of sequence:
 * $\exists n \in \N : \paren{y_a}_n \ne \paren{y_b}_n$

That is:
 * $\exists n \in \N : \paren{x_a}_{j_n} \ne \paren{x_b}_{j_n}$

Since $j_n \in I$, then:
 * $\exists i \in I : \paren{x_a}_i \ne \paren{x_b}_i$

By definition of indexed family:
 * $x_a \ne x_b$

Let $x_a \ne x_b$.

By definition of indexed family:
 * $\exists i \in I : \paren{x_a}_i \ne \paren{x_b}_i$

Hence:
 * either $\paren{x_a}_i \ne 0$ or $\paren{x_b}_i \ne 0$.

In either case:
 * $i \in \set{j_0, j_1, j_2, \ldots }$

Hence for some $n \in \N$:
 * $\paren{x_a}_{j_n} \ne \paren{x_b}_{j_n}$

That is:
 * $\paren{y_a}_n \ne \paren{y_b}_n$

By definition of sequence:
 * $y_a \ne y_b$

The result follows.