Natural Numbers are Infinite

Theorem
The set $\N$ of natural numbers is infinite.

Proof
Let the mapping $s: \N \to \N$ be defined as:
 * $\forall n \in \N: \map s n = n + 1$

$s$ is clearly an injection.

$\N$ were finite.

By Equivalence of Mappings between Sets of Same Cardinality it follows that $s$ is a surjection.

But:
 * $\forall n \in \N: \map s n \ge 0 + 1 > 0$

So:
 * $0 \notin s \sqbrk \N$

and $s$ is not a surjection.

From this contradiction it is seen that $\N$ cannot be finite.

So, by definition, $\N$ is infinite.