Completion Theorem (Metric Space)

Theorem
Let $\left({X, d}\right)$ be a metric space.

Then there exists a completion $\left({\tilde X, \tilde d}\right)$ of $\left({X, d}\right)$.

Moreover, this completion is unique up to isometry.

That is, if $\left({\hat X, \hat d}\right)$ is another completion of $\left({X, d}\right)$, then there is a bijection $\tau : \tilde X \leftrightarrow \hat X$ such that
 * $\tau$ restricts to the identity on $x$:
 * $\forall x \in X : \tau \left({x}\right) = x$


 * $\tau$ preserves metrics:
 * $\forall x_1, x_2 \in X : \hat d \left({\tau \left({x_1}\right), \tau \left({x_2}\right)}\right) = \tilde d \left({x_1, x_2}\right)$

Proof
We construct the completion of a metric space as equivalence classes of the set of Cauchy sequences in the space under a suitable equivalence relation.

Let $\left({X, d}\right)$ be a metric space.

Let $\mathcal C \left[{X}\right]$ denote collection of all Cauchy sequences in $X$.

Define a relation $\sim$ on $\mathcal C \left[{X}\right]$ by:


 * $\displaystyle \left\langle x_n \right\rangle \sim \left\langle y_n \right\rangle \iff \lim_{n \to \infty} d \left({x_n, y_n}\right) = 0$

By Equivalence Relation on Cauchy Sequences, $\sim$ is an equivalence relation on $\mathcal C \left[{X}\right]$.

Denote the equivalence class of $\left\langle x_n \right\rangle \in \mathcal C \left[{X}\right]$ by $\left[{x_n}\right]$.

Denote the set of equivalence classes under $\sim$ by $\tilde X$.

By Relation Partitions Set iff Equivalence this is a partition of $\mathcal C \left[{X}\right]$.

That is, each $\left\langle x_n \right\rangle \in \mathcal C \left[{X}\right]$ lies in one and only one equivalence class under $\sim$.

Define $\tilde d : \tilde X \to [0,\infty) \subseteq \R$ by:


 * $\displaystyle \tilde d \left({ \left[{x_n}\right], \left[{y_n}\right]}\right) = \lim_{n \to \infty} d \left({x_n, y_n}\right)$

Lemma
$\tilde d$ is well-defined on $\tilde X$.

Proof of Lemma
Let $\left\langle x_n \right\rangle$, $\left\langle \hat x_n \right\rangle$, $\left\langle y_n \right\rangle$, $\left\langle \hat y_n \right\rangle \in \mathcal C[X]$ be such that:


 * $\left\langle x_n \right\rangle \sim \left\langle \hat x_n \right\rangle$


 * $\left\langle y_n \right\rangle \sim \left\langle \hat y_n \right\rangle$

We have

By an identical argument, we can also show that:


 * $d(\hat x_n, \hat y_n) - d(x_n,y_n) \leq d(x_n,\hat x_n) + d(\hat y_n, y_n)$

and therefore:


 * $\displaystyle 0\leq \left| d(x_n,y_n) - d(\hat x_n, \hat y_n) \right| \leq d(x_n,\hat x_n) + d(\hat y_n, y_n)$

Passing to the limit $n \to \infty$ and using the Combination Theorem for Sequences we have shown that:

$\displaystyle \lim_{n \to \infty} d(x_n,y_n) = \lim_{n \to \infty} d(\hat x_n, \hat y_n)$

But this precisely means that $\tilde d \left({ [x_n], [y_n] }\right) = \tilde d \left({ [\hat x_n], [\hat y_n] }\right)$.

We claim that $(\tilde X, \tilde d)$ is a completion of $(X, d)$.

Therefore we must show that:
 * $\tilde d$ is a metric on $\tilde X$
 * There exists an everywhere dense inclusion $(X, d) \to (\tilde X, \tilde d)$ preserving $d$.

In addition the theorem claims that $(\tilde X, \tilde d)$ is unique up to isometry.

$\tilde d$ is a metric
To prove $\tilde d$ is a metric, we verify that it satisfies the axioms M1',M2,M3 and M4'.

If $\tilde d\left( [x_n], [y_n] \right) = \infty$, then $\left\langle x_n \right\rangle$ and $\left\langle y_n \right\rangle$ cannot both be Cauchy, so $\tilde d\left( [x_n], [y_n] \right) < \infty$ for $[x_n],[y_n] \in \tilde X$.

By the definition of $\tilde d$, for any $[x_n],[y_n] \in \tilde X$, $\tilde d\left( [x_n], [y_n] \right)$ must be a limit point of $[0,\infty)$.

The closure of $[0,\infty)$ is $[0,\infty)$, so $\tilde d:\tilde X\times\tilde X \to [0,\infty)$.

This proves that $\tilde d$ satisfies M4'.

Now suppose that $\tilde d\left( [x_n], [y_n] \right) = 0$, which means that


 * $\displaystyle \lim_{n \to \infty} d\left( x_n, y_n \right) = 0$

So by definition, $\left\langle x_n \right\rangle \sim \left\langle y_n \right\rangle$ and $[x_n] = [y_n]$.

As $d$ is a metric, we also find immediately $\tilde d\left( [x_n], [x_n] \right)=0$.

This proves that $\tilde d$ satisfies M1'.

Furthermore, we have the following:

Hence, $\tilde d$ satisfies M3.

Lastly, we have:

showing $\tilde d$ also satisfies M2 and thus is a metric.

$\tilde X$ completes $X$
For $x \in X$, let $\hat x = \left( x, x, x, \ldots \right)$ be the constant sequence with value $x$.

Let $\phi : X\to \tilde X : x = \left[{ \hat x }\right]$.

We first show that $\phi$ is an injection of $X$ into $\tilde X$.

Henceforth we identify $X$ with its isomorphic copy in $\tilde X$ when it is convenient.

For any $x, y \in X$,

So $\tilde d\big|_{X} = d$.

Next we show that $X$ is dense in $\tilde X$.

Recall that the closure of $X$ is the union of $X$ and the limit points of $X$.

Let $[x_n] \in \tilde X$ and $\epsilon > 0$ be arbitrary.

If we can find $ x \in X $ such that $\tilde d( [\hat x], [x_n] ) < \epsilon$ then we have shown that $X$ is dense in $\tilde X$.

Since $\left\langle x_n \right\rangle$ is Cauchy, there exists $N \in \N$ such that for all $m,n \geq N$, $d(x_m, x_n) < \epsilon$.

Then we have:

and therefore $X$ is dense in $\tilde X$.

Finally we must show that $(\tilde X, \tilde d)$ is complete.

By the completeness criterion it is sufficient to show that every Cauchy sequence in $\phi(X)$ converges in $\tilde X$.

Let $\left\langle \hat w_n \right\rangle$ be a Cauchy sequence in $\phi(X)$, so each $\hat w_n$ has the form $\left\langle w_n,w_n,w_n,\ldots \right\rangle$.

Since $\phi$ is an isometry, $\tilde d \left({ \hat w_n, \hat w_m }\right) = d \left({ w_n, w_m }\right)$ for all $m,n\in \N$.

Therefore, $\left\langle w_1, w_2, w_3,\ldots \right\rangle$ is Cauchy in $X$.

Let $W = \left[{ \left\langle w_1, w_2, w_3, \ldots \right\rangle }\right] \in \tilde X$.

We claim that $\left\langle \hat w_n \right\rangle$ converges to $W$ in $\tilde X$.

Let $\epsilon > 0$ be arbitrary.

Since $\left\langle w_1, w_2, w_3,\ldots \right\rangle$ is Cauchy in $X$, there exists $N \in \N$ such that for all $m,n \geq N$, we have $d(w_n, w_m) < \epsilon$.

Thus for all $n > N$,


 * $\displaystyle \tilde d \left( w_n, W \right) = \lim_{n \to \infty} d\left({ w_n, W }\right) < \epsilon$

Therefore, $\left\langle \hat w_n \right\rangle \to W$ as $N \to \infty$, and $\tilde X$ is complete.

Uniqueness of $\tilde X$
Suppose that $\left( \tilde{X_1}, \tilde{d_1}, \phi_1 \right)$, $\left( \tilde{X_2}, \tilde{d_2}, \phi_2 \right)$ are two completions of $(X, d)$.

Then $\psi = \phi_1^{-1} \circ \phi_2$ gives an isometry from $\phi_1 ( X )$ to $\phi_2 ( X )$.

The sets $\phi_1 ( X )$ and $\phi_2 ( X ) $ are dense in $X_1$ and $X_2$ respectively, so we extend $\psi$ continuously to a map $\psi : X_1 \to X_2$.

That is, for $x \in X_1$, we can find a Cauchy sequence $\left\langle w_n \right\rangle$ in $X_1$ with limit $x$.

Then we define $\displaystyle \psi( x ) = \lim_{n \to \infty} \psi (w_n)$, which converges as $X_2$ is complete.

By Metric Space is Hausdorff, $X_1$ and $X_2$ are Hausdorff.

Therefore, by Convergent Sequence in Hausdorff Space has Unique Limit, $\psi$ is well defined.

Surjectivity of $\psi$ is easy: for $ y \in \tilde{X_2} $, let $\left\langle w_n' \right\rangle$ be a Cauchy sequence in $\phi_2 (X)$ with limit $y$ in $\tilde{X_2}$.

Let $z_n$ be the preimage of the $w_n'$ under $\psi$.

Then, as $X_2$ is Hausdorff, $\displaystyle \lim_{n \to \infty} \psi( z_n ) = y$ as required.

Injectivity of $\psi$ holds because $X_1$ is Hausdorff.

Suppose that $\displaystyle \lim_{n \to \infty} \psi(w_n) = \lim_{n \to \infty} \psi(w_n')$, $\displaystyle \lim_{n \to \infty} w_n = w$, and $\displaystyle \lim_{n \to \infty} w_n' = w'$.

For $\epsilon > 0$, pick $M \in \N$ such that $\psi(w_n)$, $\psi(w_n')$ lie in the open $\epsilon$-ball $B_{\epsilon / 2}\left(\psi(w)\right)$ for all $n \geq M$. Then we have:


 * $\displaystyle \tilde{d_1}( w_n, w_n' ) = \tilde{d_2} \left( \psi(w_n), \psi(w_n') \right) \leq \epsilon$

As $X_1$ is Hausdorff, we conclude $w=w'$, and we are done.

Finally, from Metric is Continuous Function, it follows that $\psi$ is an isometry on all of $X_1$, and the proof is complete.