Cantor-Bernstein-Schröder Theorem/Lemma/Proof 1

Proof
Recursively define a sequence $\langle C_n \rangle$ in the power set of $S$ as follows:


 * $C_0 = S \setminus T$, the difference between $S$ and $T$.
 * $C_{n + 1} = f \sqbrk {C_n}$, the image of $C_n$ under $f$.

Let $\ds C := \bigcup_{n \mathop \in \N} C_n$.

Define a mapping $h: S \to T$ as follows:


 * $\map h x = \begin {cases} \map f x & : x \in C \\ x & : x \notin C \end {cases}$

$h$ is a mapping from $S$ to $T$
By Law of Excluded Middle, for each $x \in S$:


 * $x \in C$

or:
 * $x \notin C$

Thus the construction produces a mapping on S.

It remains to be shown that:
 * $\forall x \in S: \map h x \in T$

Let $x \in C$.

Then:
 * $\map h x = \map f x \in T$

Let $x \notin C$.

Then by Set is Subset of Union:
 * $x \notin C_0$

As $x \in S$:
 * $x \in S \setminus C_0$

by the definition of set difference.

By Relative Complement of Relative Complement:


 * $S \setminus C_0 = T$

Thus $x \in T$ by the definition of subset.

As $\map h x = x$ in this case:


 * $\map h x \in T$

$h$ is injective
Let $x, y \in S$.

Suppose that $\map h x = \map h y$.

By Law of Excluded Middle for Two Variables:


 * $\paren {x \in C} \land \paren {y \in C}$

or:
 * $\paren {x \notin C} \land \paren {y \notin C}$

or:
 * $\paren {x \in C} \land \paren {y \notin C}$

or:
 * $\paren {x \notin C} \paren {y \in C}$

Let $x, y \in C$.

Then $x = y$ because $f$ is injective.

Let $x, y \notin C$.

Then $x = y$ by Identity Mapping is Injection.

Let $x \in C$ and $y \notin C$.

Then $x \in C_n$ for some $n$ by the definition of union.

By Set is Subset of Union:
 * $\map h x = \map f x \in C_{n + 1} \subseteq C$

Thus $\map h x \in C$.


 * $\map h y = y$ by the definition of $h$.

Since $y \notin C$, this contradicts the assumption that $\map h x = \map h y$.

The argument for the case of $x \notin C$ and $y \in C$ is identical to the preceding.

Thus $\map h x = \map h y \implies x = y$ for all $x, y \in S$, so $h$ is injective.

$h$ is surjective
Let $y \in T$.

By Law of Excluded Middle:
 * $y \in C$

or:
 * $y \notin C$

Let $y \notin C$.

Then:
 * $\map h y = y$

Let $y \in C$.

Then as $y \notin C_0 = S \setminus T$:


 * $\exists n \in \N_{>0}: y \in C_{n + 1}$

Thus:
 * $\exists x \in C_n: y = \map f x$

By the definition of union:
 * $x \in C$

Thus:
 * $\map h x = \map f x = y$

Thus:
 * $\forall y \in T: \exists x \in S: \map h x = y$

Thus by definition, $h$ is surjective.