Metamath Proof Explorer

Theorem difelros

Description: A ring of sets is closed under set complement. (Contributed by Thierry Arnoux, 18-Jul-2020)

		Ref	Expression
	Hypothesis	isros.1	$⊢ Q = \{s \in 𝒫 𝒫 O \| (\emptyset \in s \land \forall x \in s \forall y \in s (x \cup y \in s \land x ∖ y \in s))\}$
	Assertion	difelros	$⊢ (S \in Q \land A \in S \land B \in S) \to A ∖ B \in S$

Proof

Step	Hyp	Ref	Expression
1		isros.1	$⊢ Q = \{s \in 𝒫 𝒫 O \| (\emptyset \in s \land \forall x \in s \forall y \in s (x \cup y \in s \land x ∖ y \in s))\}$
2		simp2	$⊢ (S \in Q \land A \in S \land B \in S) \to A \in S$
3		simp3	$⊢ (S \in Q \land A \in S \land B \in S) \to B \in S$
4	1	isros	$⊢ S \in Q \leftrightarrow (S \in 𝒫 𝒫 O \land \emptyset \in S \land \forall u \in S \forall v \in S (u \cup v \in S \land u ∖ v \in S))$
5	4	simp3bi	$⊢ S \in Q \to \forall u \in S \forall v \in S (u \cup v \in S \land u ∖ v \in S)$
6	5	3ad2ant1	$⊢ (S \in Q \land A \in S \land B \in S) \to \forall u \in S \forall v \in S (u \cup v \in S \land u ∖ v \in S)$
7		uneq1	$⊢ u = A \to u \cup v = A \cup v$
8	7	eleq1d	$⊢ u = A \to (u \cup v \in S \leftrightarrow A \cup v \in S)$
9		difeq1	$⊢ u = A \to u ∖ v = A ∖ v$
10	9	eleq1d	$⊢ u = A \to (u ∖ v \in S \leftrightarrow A ∖ v \in S)$
11	8 10	anbi12d	$⊢ u = A \to ((u \cup v \in S \land u ∖ v \in S) \leftrightarrow (A \cup v \in S \land A ∖ v \in S))$
12		uneq2	$⊢ v = B \to A \cup v = A \cup B$
13	12	eleq1d	$⊢ v = B \to (A \cup v \in S \leftrightarrow A \cup B \in S)$
14		difeq2	$⊢ v = B \to A ∖ v = A ∖ B$
15	14	eleq1d	$⊢ v = B \to (A ∖ v \in S \leftrightarrow A ∖ B \in S)$
16	13 15	anbi12d	$⊢ v = B \to ((A \cup v \in S \land A ∖ v \in S) \leftrightarrow (A \cup B \in S \land A ∖ B \in S))$
17	11 16	rspc2va	$⊢ ((A \in S \land B \in S) \land \forall u \in S \forall v \in S (u \cup v \in S \land u ∖ v \in S)) \to (A \cup B \in S \land A ∖ B \in S)$
18	2 3 6 17	syl21anc	$⊢ (S \in Q \land A \in S \land B \in S) \to (A \cup B \in S \land A ∖ B \in S)$
19	18	simprd	$⊢ (S \in Q \land A \in S \land B \in S) \to A ∖ B \in S$