is1stc2

Description: An equivalent way of saying "is a first-countable topology." (Contributed by Jeff Hankins, 22-Aug-2009) (Revised by Mario Carneiro, 21-Mar-2015)

		Ref	Expression
	Hypothesis	is1stc.1	$⊢ X = ⋃ J$
	Assertion	is1stc2	$⊢ J \in 1^{st} 𝜔 \leftrightarrow (J \in Top \land \forall x \in X \exists y \in 𝒫 J (y ≼ ω \land \forall z \in J (x \in z \to \exists w \in y (x \in w \land w \subseteq z))))$

Proof

Step	Hyp	Ref	Expression
1		is1stc.1	$⊢ X = ⋃ J$
2	1	is1stc	$⊢ J \in 1^{st} 𝜔 \leftrightarrow (J \in Top \land \forall x \in X \exists y \in 𝒫 J (y ≼ ω \land \forall z \in J (x \in z \to x \in ⋃ (y \cap 𝒫 z))))$
3		elin	$⊢ w \in (y \cap 𝒫 z) \leftrightarrow (w \in y \land w \in 𝒫 z)$
4		velpw	$⊢ w \in 𝒫 z \leftrightarrow w \subseteq z$
5	4	anbi2i	$⊢ (w \in y \land w \in 𝒫 z) \leftrightarrow (w \in y \land w \subseteq z)$
6	3 5	bitri	$⊢ w \in (y \cap 𝒫 z) \leftrightarrow (w \in y \land w \subseteq z)$
7	6	anbi2i	$⊢ (x \in w \land w \in (y \cap 𝒫 z)) \leftrightarrow (x \in w \land (w \in y \land w \subseteq z))$
8		an12	$⊢ (x \in w \land (w \in y \land w \subseteq z)) \leftrightarrow (w \in y \land (x \in w \land w \subseteq z))$
9	7 8	bitri	$⊢ (x \in w \land w \in (y \cap 𝒫 z)) \leftrightarrow (w \in y \land (x \in w \land w \subseteq z))$
10	9	exbii	$⊢ \exists w (x \in w \land w \in (y \cap 𝒫 z)) \leftrightarrow \exists w (w \in y \land (x \in w \land w \subseteq z))$
11		eluni	$⊢ x \in ⋃ (y \cap 𝒫 z) \leftrightarrow \exists w (x \in w \land w \in (y \cap 𝒫 z))$
12		df-rex	$⊢ \exists w \in y (x \in w \land w \subseteq z) \leftrightarrow \exists w (w \in y \land (x \in w \land w \subseteq z))$
13	10 11 12	3bitr4i	$⊢ x \in ⋃ (y \cap 𝒫 z) \leftrightarrow \exists w \in y (x \in w \land w \subseteq z)$
14	13	imbi2i	$⊢ (x \in z \to x \in ⋃ (y \cap 𝒫 z)) \leftrightarrow (x \in z \to \exists w \in y (x \in w \land w \subseteq z))$
15	14	ralbii	$⊢ \forall z \in J (x \in z \to x \in ⋃ (y \cap 𝒫 z)) \leftrightarrow \forall z \in J (x \in z \to \exists w \in y (x \in w \land w \subseteq z))$
16	15	anbi2i	$⊢ (y ≼ ω \land \forall z \in J (x \in z \to x \in ⋃ (y \cap 𝒫 z))) \leftrightarrow (y ≼ ω \land \forall z \in J (x \in z \to \exists w \in y (x \in w \land w \subseteq z)))$
17	16	rexbii	$⊢ \exists y \in 𝒫 J (y ≼ ω \land \forall z \in J (x \in z \to x \in ⋃ (y \cap 𝒫 z))) \leftrightarrow \exists y \in 𝒫 J (y ≼ ω \land \forall z \in J (x \in z \to \exists w \in y (x \in w \land w \subseteq z)))$
18	17	ralbii	$⊢ \forall x \in X \exists y \in 𝒫 J (y ≼ ω \land \forall z \in J (x \in z \to x \in ⋃ (y \cap 𝒫 z))) \leftrightarrow \forall x \in X \exists y \in 𝒫 J (y ≼ ω \land \forall z \in J (x \in z \to \exists w \in y (x \in w \land w \subseteq z)))$
19	18	anbi2i	$⊢ (J \in Top \land \forall x \in X \exists y \in 𝒫 J (y ≼ ω \land \forall z \in J (x \in z \to x \in ⋃ (y \cap 𝒫 z)))) \leftrightarrow (J \in Top \land \forall x \in X \exists y \in 𝒫 J (y ≼ ω \land \forall z \in J (x \in z \to \exists w \in y (x \in w \land w \subseteq z))))$
20	2 19	bitri	$⊢ J \in 1^{st} 𝜔 \leftrightarrow (J \in Top \land \forall x \in X \exists y \in 𝒫 J (y ≼ ω \land \forall z \in J (x \in z \to \exists w \in y (x \in w \land w \subseteq z))))$

Metamath Proof Explorer

Theorem is1stc2

Proof