Way Below Compact is Topological Compact

Theorem
Let $T = \left({S, \tau}\right)$ be a topological space.

Let $L = \left({\tau, \preceq}\right)$ be an ordered set where $\preceq \mathop = \subseteq\restriction_{\tau \times \tau}$

Let $x \in \tau$.

Then
 * $x$ is compact in $L$ (it means: $x \ll x$)


 * $T_x$ is compact (topologically)

where $T_x = \left({x, \tau_x}\right)$ denotes the topological subspace of $x$.

Sufficient Condition
Let
 * $x \ll x$

Let $F \subseteq \tau_x$ be a open cover of $x$.

By definition of cover:
 * $x \subseteq \bigcup F$

By definition of topological space:
 * $\forall y \in \tau: x \cap y \in \tau$

By definition of subset:
 * $\tau_x \subseteq \tau$

By Subset Relation is Transitive:
 * $F \subseteq \tau$

By Way Below in Ordered Set of Topology:
 * there exists a finite subset $G$ of $F$: $x \subseteq \bigcup G$

By definition:
 * $G$ is cover of $x$

Thus by definition:
 * $x$ has finite subcover.

Thus by definition:
 * $T_x$ is compact.

Necessary Condition
Let
 * $T_x$ is compact.

Let $F$ be a set of open subsets of $S$ such that
 * $x \subseteq \bigcup F$

Define $Y := \left\{ {x \cap y: y \in F}\right\}$

By definition of subset:
 * $Y \subseteq \tau_x$

By definition of union:
 * $x \subseteq \bigcup Y$

By definition
 * $Y$ is open cover of $x$.

By definition of compact:
 * $x$ has finite subcover $G$.

By Axiom of Choice:
 * $\exists g:G \to F: \forall y \in G: g\left({y}\right) \cap x = y$

By Cardinality of Image of Set not greater than Cardinality of Set:
 * $\left\vert{g^\to\left({G}\right)}\right\vert \le \left\vert{G}\right\vert$

where $\left\vert{G}\right\vert$ denotes the cardinality of $G$.

Thus
 * $g^\to\left({G}\right)$ is finite.

Thus by definitions of subset and image of set:
 * $g^\to\left({G}\right) \subseteq F$

By Intersection is Subset:
 * $\forall y \in G: y \subseteq g\left({y}\right)$

By Set Union Preserves Subsets/Families of Sets:
 * $\displaystyle \bigcup G = \bigcup_{y \mathop \in G}y \subseteq \bigcup_{y \mathop \in G} g \left({y}\right) = \bigcup g^\to \left({G}\right)$

By definition of cover:
 * $x \subseteq \bigcup G$

Thus by Subset Relation is Transitive:
 * $x \subseteq \bigcup g^\to\left({G}\right)$

Thus by Way Below in Ordered Set of Topology;
 * $x \ll x$