ordtuni

Description: Value of the order topology. (Contributed by Mario Carneiro, 3-Sep-2015)

	Ref	Expression
Hypotheses	ordtval.1	$⊢ X = dom R$
	ordtval.2	$⊢ A = ran (x \in X ⟼ \{y \in X \| \neg y R x\})$
	ordtval.3	$⊢ B = ran (x \in X ⟼ \{y \in X \| \neg x R y\})$
Assertion	ordtuni	$⊢ R \in V \to X = ⋃ (\{X\} \cup (A \cup B))$

Proof

Step	Hyp	Ref	Expression
1		ordtval.1	$⊢ X = dom R$
2		ordtval.2	$⊢ A = ran (x \in X ⟼ \{y \in X \| \neg y R x\})$
3		ordtval.3	$⊢ B = ran (x \in X ⟼ \{y \in X \| \neg x R y\})$
4		dmexg	$⊢ R \in V \to dom R \in V$
5	1 4	eqeltrid	$⊢ R \in V \to X \in V$
6		unisng	$⊢ X \in V \to ⋃ \{X\} = X$
7	5 6	syl	$⊢ R \in V \to ⋃ \{X\} = X$
8	7	uneq1d	$⊢ R \in V \to ⋃ \{X\} \cup ⋃ (A \cup B) = X \cup ⋃ (A \cup B)$
9		ssrab2	$⊢ \{y \in X \| \neg y R x\} \subseteq X$
10	5	adantr	$⊢ (R \in V \land x \in X) \to X \in V$
11		elpw2g	$⊢ X \in V \to (\{y \in X \| \neg y R x\} \in 𝒫 X \leftrightarrow \{y \in X \| \neg y R x\} \subseteq X)$
12	10 11	syl	$⊢ (R \in V \land x \in X) \to (\{y \in X \| \neg y R x\} \in 𝒫 X \leftrightarrow \{y \in X \| \neg y R x\} \subseteq X)$
13	9 12	mpbiri	$⊢ (R \in V \land x \in X) \to \{y \in X \| \neg y R x\} \in 𝒫 X$
14	13	fmpttd	$⊢ R \in V \to (x \in X ⟼ \{y \in X \| \neg y R x\}) : X ⟶ 𝒫 X$
15	14	frnd	$⊢ R \in V \to ran (x \in X ⟼ \{y \in X \| \neg y R x\}) \subseteq 𝒫 X$
16	2 15	eqsstrid	$⊢ R \in V \to A \subseteq 𝒫 X$
17		ssrab2	$⊢ \{y \in X \| \neg x R y\} \subseteq X$
18		elpw2g	$⊢ X \in V \to (\{y \in X \| \neg x R y\} \in 𝒫 X \leftrightarrow \{y \in X \| \neg x R y\} \subseteq X)$
19	10 18	syl	$⊢ (R \in V \land x \in X) \to (\{y \in X \| \neg x R y\} \in 𝒫 X \leftrightarrow \{y \in X \| \neg x R y\} \subseteq X)$
20	17 19	mpbiri	$⊢ (R \in V \land x \in X) \to \{y \in X \| \neg x R y\} \in 𝒫 X$
21	20	fmpttd	$⊢ R \in V \to (x \in X ⟼ \{y \in X \| \neg x R y\}) : X ⟶ 𝒫 X$
22	21	frnd	$⊢ R \in V \to ran (x \in X ⟼ \{y \in X \| \neg x R y\}) \subseteq 𝒫 X$
23	3 22	eqsstrid	$⊢ R \in V \to B \subseteq 𝒫 X$
24	16 23	unssd	$⊢ R \in V \to A \cup B \subseteq 𝒫 X$
25		sspwuni	$⊢ A \cup B \subseteq 𝒫 X \leftrightarrow ⋃ (A \cup B) \subseteq X$
26	24 25	sylib	$⊢ R \in V \to ⋃ (A \cup B) \subseteq X$
27		ssequn2	$⊢ ⋃ (A \cup B) \subseteq X \leftrightarrow X \cup ⋃ (A \cup B) = X$
28	26 27	sylib	$⊢ R \in V \to X \cup ⋃ (A \cup B) = X$
29	8 28	eqtr2d	$⊢ R \in V \to X = ⋃ \{X\} \cup ⋃ (A \cup B)$
30		uniun	$⊢ ⋃ (\{X\} \cup (A \cup B)) = ⋃ \{X\} \cup ⋃ (A \cup B)$
31	29 30	eqtr4di	$⊢ R \in V \to X = ⋃ (\{X\} \cup (A \cup B))$

Metamath Proof Explorer

Theorem ordtuni

Proof