Extension of Infima Preserving Mapping to Complete Lattice Preserves Infima

Theorem
Let $L_1 = \struct {S_1, \preceq_1}$, $L_2 = \struct {S_2, \preceq_2}$ be ordered sets.

Let $L_3 = \struct {S_3, \preceq_3}$ be a complete lattice.

Suppose that.
 * $L_2$ is an infima inheriting ordered subset of $L_3$.

Let $f: S_1 \to S_2$ be a mapping such that:
 * $f$ preserves infima.

Then $f: S_1 \to S_3$ preserves infima.

Proof
By definition of ordered subset:
 * $S_2 \subseteq S_3$

Then define $g = f:S_1 \to S_3$

Let $X$ be a subset of $S_1$ such that
 * $X$ admits a infimum in $L_1$.

Thus by definition of complete lattice:
 * $g \sqbrk X$ admits a infimum in $L_3$.

By definition of mapping preserves infima:
 * $f \sqbrk X$ admits a infimum in $L_2$ and $\map {\inf_{L_2} } {f \sqbrk X} = \map f {\map {\inf_{L_1} } X}$

Thus by definition of infima inheriting:
 * $\map {\inf_{L_3} } {g \sqbrk X} = \map g {\inf_{L_1} } X$