Dominance Relation is Ordering

Theorem
Let $S$ and $T$ be cardinals.

Let $S \preccurlyeq T$ denote that $S$ is dominated by $T$.

Let $\mathbb S$ be any set of cardinals.

Then the relational structure $\struct {\mathbb S, \preccurlyeq}$ is an ordered set.

That is, $\preccurlyeq$ is an ordering (at least partial) on $\mathbb S$.

Proof
From the definition, a cardinal is a set, so standard set theoretic results apply.

So, checking in turn each of the criteria for an ordering:

Reflexivity
For any cardinal $S$, the identity mapping $I_S: S \to S$ is an injection.

Thus:
 * $\forall S \in \mathbb S: S \preccurlyeq S$

So $\preccurlyeq$ is reflexive.

Transitivity
Let $S_1, S_2, S_3 \in \mathbb S$ such that $f: S_1 \to S_2$ and $g: S_2 \to S_3$ be injections.

From Composite of Injections is Injection, $g \circ f$ is an injection and so $S_1 \preccurlyeq S_3$.

So $\preccurlyeq$ is transitive.

Antisymmetry
Suppose $S \preccurlyeq T$ and $T \preccurlyeq S$.

Then from the Cantor-Bernstein-Schröder Theorem, $S \sim T$ and, as $S$ and $T$ are cardinals, $S = T$ by definition.

So $\preccurlyeq$ is antisymmetric on a set of cardinals.

Hence the result.