Infima Preserving Mapping on Filters Preserves Filtered Infima

Theorem
Let $\struct {S, \preceq}$, $\struct {T, \precsim}$ be ordered sets.

Let $f: S \to T$ be a mapping.

For every filter $F$ in $\struct {S, \preceq}$, let $f$ preserve the infimum on $F$.

Then $f$ preserves filtered infima.

Proof
Let $F$ be a filtered subset of $S$ such that:
 * $F$ admits an infimum in $\struct {S, \preceq}$.

By Filtered iff Upper Closure Filtered:
 * $F^\succeq$ is filtered

where $F^\succeq$ denotes the upper closure of $F$.

By Upper Closure is Upper Section:
 * $F^\succeq$ is upper.

Because filtered is non-empty, by definition:
 * $F^\succeq$ is filter in $\struct {S, \preceq}$.

By Infimum of Upper Closure of Set:
 * $F^\succeq$ admits an infimum in $\struct {S, \preceq}$

and
 * $\map \inf {F^\succeq} = \inf F$

By assumption and mapping preserves the infimum on subset:
 * $\map {f^\to} {F^\succeq}$ admits an infimum in $\struct {T, \precsim}$

and
 * $\map \inf {\map {f^\to} {F^\succeq} } = \map f {\map \inf {F^\succeq} }$

By Upper Closure is Closure Operator:
 * $F \subseteq F^\succeq$

By Image of Subset under Relation is Subset of Image/Corollary 2:
 * $\map {f^\to} F \subseteq \map {f^\to} {F^\succeq}$

By definition of infimum:
 * $\map f {\inf F}$ is lower bound for $\map {f^\to} {F^\succeq}$

By Lower Bound is Lower Bound for Subset:
 * $\map f {\inf F}$ is a lower bound for $\map {f^\to} F$

We will prove that:
 * for every element $x$ of $T$:
 * if $x$ is lower bound for $\map {f^\to} F$, then $x \precsim \map f {\inf F}$

Let $x \in T$ such that:
 * $x$ is a lower bound for $\map {f^\to} \F$

We will prove as a sublemma that:
 * $x$ is a lower bound for $\map {f^\to} {F^\succeq}$

Let $y \in \map {f^\to} {F^\succeq}$.

By definition of image of set under mapping:
 * $\exists a \in S: a \in F^\succeq \land y = \map f a$

By definition of upper closure of set:
 * $\exists b \in F: b \preceq a$

By Infima Preserving Mapping on Filters is Increasing:
 * $f$ is increasing.

By definition of increasing:
 * $\map f b \precsim \map f a$

By definition of image of set under mapping:
 * $\map f b \in \map {f^\to} F$

By definition of lower bound of set:
 * $x \precsim \map f b$

Thus by definition of transitivity:
 * $x \precsim y$

Thus by definition:
 * $x$ is a lower bound for $\map {f^\to} {F^\succeq}$

This ends the proof of the sublemma.

Thus by definition of infimum:
 * $x \precsim \map f {\inf F}$

Thus again by definition of infimum:
 * $\map {f^\to} F$ admits an infimum in $\struct {T, \precsim}$

and
 * $\map \inf {\map {f^\to} F} = \map f {\inf F}$

Thus result follows by definition of mapping preserves filtered infima.