basis2

		Ref	Expression
	Assertion	basis2	$⊢ ((B \in TopBases \land C \in B) \land (D \in B \land A \in (C \cap D))) \to \exists x \in B (A \in x \land x \subseteq C \cap D)$

Proof

Step	Hyp	Ref	Expression
1		isbasis2g	$⊢ B \in TopBases \to (B \in TopBases \leftrightarrow \forall y \in B \forall z \in B \forall w \in (y \cap z) \exists x \in B (w \in x \land x \subseteq y \cap z))$
2	1	ibi	$⊢ B \in TopBases \to \forall y \in B \forall z \in B \forall w \in (y \cap z) \exists x \in B (w \in x \land x \subseteq y \cap z)$
3		ineq1	$⊢ y = C \to y \cap z = C \cap z$
4		sseq2	$⊢ y \cap z = C \cap z \to (x \subseteq y \cap z \leftrightarrow x \subseteq C \cap z)$
5	4	anbi2d	$⊢ y \cap z = C \cap z \to ((w \in x \land x \subseteq y \cap z) \leftrightarrow (w \in x \land x \subseteq C \cap z))$
6	5	rexbidv	$⊢ y \cap z = C \cap z \to (\exists x \in B (w \in x \land x \subseteq y \cap z) \leftrightarrow \exists x \in B (w \in x \land x \subseteq C \cap z))$
7	6	raleqbi1dv	$⊢ y \cap z = C \cap z \to (\forall w \in (y \cap z) \exists x \in B (w \in x \land x \subseteq y \cap z) \leftrightarrow \forall w \in (C \cap z) \exists x \in B (w \in x \land x \subseteq C \cap z))$
8	3 7	syl	$⊢ y = C \to (\forall w \in (y \cap z) \exists x \in B (w \in x \land x \subseteq y \cap z) \leftrightarrow \forall w \in (C \cap z) \exists x \in B (w \in x \land x \subseteq C \cap z))$
9		ineq2	$⊢ z = D \to C \cap z = C \cap D$
10		sseq2	$⊢ C \cap z = C \cap D \to (x \subseteq C \cap z \leftrightarrow x \subseteq C \cap D)$
11	10	anbi2d	$⊢ C \cap z = C \cap D \to ((w \in x \land x \subseteq C \cap z) \leftrightarrow (w \in x \land x \subseteq C \cap D))$
12	11	rexbidv	$⊢ C \cap z = C \cap D \to (\exists x \in B (w \in x \land x \subseteq C \cap z) \leftrightarrow \exists x \in B (w \in x \land x \subseteq C \cap D))$
13	12	raleqbi1dv	$⊢ C \cap z = C \cap D \to (\forall w \in (C \cap z) \exists x \in B (w \in x \land x \subseteq C \cap z) \leftrightarrow \forall w \in (C \cap D) \exists x \in B (w \in x \land x \subseteq C \cap D))$
14	9 13	syl	$⊢ z = D \to (\forall w \in (C \cap z) \exists x \in B (w \in x \land x \subseteq C \cap z) \leftrightarrow \forall w \in (C \cap D) \exists x \in B (w \in x \land x \subseteq C \cap D))$
15	8 14	rspc2v	$⊢ (C \in B \land D \in B) \to (\forall y \in B \forall z \in B \forall w \in (y \cap z) \exists x \in B (w \in x \land x \subseteq y \cap z) \to \forall w \in (C \cap D) \exists x \in B (w \in x \land x \subseteq C \cap D))$
16		eleq1	$⊢ w = A \to (w \in x \leftrightarrow A \in x)$
17	16	anbi1d	$⊢ w = A \to ((w \in x \land x \subseteq C \cap D) \leftrightarrow (A \in x \land x \subseteq C \cap D))$
18	17	rexbidv	$⊢ w = A \to (\exists x \in B (w \in x \land x \subseteq C \cap D) \leftrightarrow \exists x \in B (A \in x \land x \subseteq C \cap D))$
19	18	rspccv	$⊢ \forall w \in (C \cap D) \exists x \in B (w \in x \land x \subseteq C \cap D) \to (A \in (C \cap D) \to \exists x \in B (A \in x \land x \subseteq C \cap D))$
20	15 19	syl6com	$⊢ \forall y \in B \forall z \in B \forall w \in (y \cap z) \exists x \in B (w \in x \land x \subseteq y \cap z) \to ((C \in B \land D \in B) \to (A \in (C \cap D) \to \exists x \in B (A \in x \land x \subseteq C \cap D)))$
21	2 20	syl	$⊢ B \in TopBases \to ((C \in B \land D \in B) \to (A \in (C \cap D) \to \exists x \in B (A \in x \land x \subseteq C \cap D)))$
22	21	expd	$⊢ B \in TopBases \to (C \in B \to (D \in B \to (A \in (C \cap D) \to \exists x \in B (A \in x \land x \subseteq C \cap D))))$
23	22	imp43	$⊢ ((B \in TopBases \land C \in B) \land (D \in B \land A \in (C \cap D))) \to \exists x \in B (A \in x \land x \subseteq C \cap D)$

Metamath Proof Explorer

Theorem basis2

Proof