nllyi

Description: The property of an n-locally A topological space. (Contributed by Mario Carneiro, 2-Mar-2015)

		Ref	Expression
	Assertion	nllyi	$⊢ (J \in N-LocallyA\landU \in J\landP \in U\to\exists u \in nei (J) (\{P\}))$

Proof

Step	Hyp	Ref	Expression
1		isnlly	$⊢ J \in N-LocallyA\leftrightarrow(J \in Top \land \forall x \in J)$
2	1	simprbi	$⊢ J \in N-LocallyA\to\forall x \in J$
3		pweq	$⊢ x = U \to 𝒫 x = 𝒫 U$
4	3	ineq2d	$⊢ x = U \to nei (J) (\{y\}) \cap 𝒫 x = nei (J) (\{y\}) \cap 𝒫 U$
5	4	rexeqdv	$⊢ x = U \to (\exists u \in (nei (J) (\{y\}) \cap 𝒫 x) J ↾_{𝑡} u \in A \leftrightarrow \exists u \in (nei (J) (\{y\}) \cap 𝒫 U) J ↾_{𝑡} u \in A)$
6	5	raleqbi1dv	$⊢ x = U \to (\forall y \in x \exists u \in (nei (J) (\{y\}) \cap 𝒫 x) J ↾_{𝑡} u \in A \leftrightarrow \forall y \in U \exists u \in (nei (J) (\{y\}) \cap 𝒫 U) J ↾_{𝑡} u \in A)$
7	6	rspccva	$⊢ (\forall x \in J \forall y \in x \exists u \in (nei (J) (\{y\}) \cap 𝒫 x) J ↾_{𝑡} u \in A \land U \in J) \to \forall y \in U \exists u \in (nei (J) (\{y\}) \cap 𝒫 U) J ↾_{𝑡} u \in A$
8	2 7	sylan	$⊢ (J \in N-LocallyA\landU \in J\to\forall y \in U)$
9		elin	$⊢ u \in (nei (J) (\{y\}) \cap 𝒫 U) \leftrightarrow (u \in nei (J) (\{y\}) \land u \in 𝒫 U)$
10		sneq	$⊢ y = P \to \{y\} = \{P\}$
11	10	fveq2d	$⊢ y = P \to nei (J) (\{y\}) = nei (J) (\{P\})$
12	11	eleq2d	$⊢ y = P \to (u \in nei (J) (\{y\}) \leftrightarrow u \in nei (J) (\{P\}))$
13		velpw	$⊢ u \in 𝒫 U \leftrightarrow u \subseteq U$
14	13	a1i	$⊢ y = P \to (u \in 𝒫 U \leftrightarrow u \subseteq U)$
15	12 14	anbi12d	$⊢ y = P \to ((u \in nei (J) (\{y\}) \land u \in 𝒫 U) \leftrightarrow (u \in nei (J) (\{P\}) \land u \subseteq U))$
16	9 15	syl5bb	$⊢ y = P \to (u \in (nei (J) (\{y\}) \cap 𝒫 U) \leftrightarrow (u \in nei (J) (\{P\}) \land u \subseteq U))$
17	16	anbi1d	$⊢ y = P \to ((u \in (nei (J) (\{y\}) \cap 𝒫 U) \land J ↾_{𝑡} u \in A) \leftrightarrow ((u \in nei (J) (\{P\}) \land u \subseteq U) \land J ↾_{𝑡} u \in A))$
18		anass	$⊢ ((u \in nei (J) (\{P\}) \land u \subseteq U) \land J ↾_{𝑡} u \in A) \leftrightarrow (u \in nei (J) (\{P\}) \land (u \subseteq U \land J ↾_{𝑡} u \in A))$
19	17 18	bitrdi	$⊢ y = P \to ((u \in (nei (J) (\{y\}) \cap 𝒫 U) \land J ↾_{𝑡} u \in A) \leftrightarrow (u \in nei (J) (\{P\}) \land (u \subseteq U \land J ↾_{𝑡} u \in A)))$
20	19	rexbidv2	$⊢ y = P \to (\exists u \in (nei (J) (\{y\}) \cap 𝒫 U) J ↾_{𝑡} u \in A \leftrightarrow \exists u \in nei (J) (\{P\}) (u \subseteq U \land J ↾_{𝑡} u \in A))$
21	20	rspccva	$⊢ (\forall y \in U \exists u \in (nei (J) (\{y\}) \cap 𝒫 U) J ↾_{𝑡} u \in A \land P \in U) \to \exists u \in nei (J) (\{P\}) (u \subseteq U \land J ↾_{𝑡} u \in A)$
22	8 21	stoic3	$⊢ (J \in N-LocallyA\landU \in J\landP \in U\to\exists u \in nei (J) (\{P\}))$

Metamath Proof Explorer

Theorem nllyi

Proof