basdif0

Description: A basis is not affected by the addition or removal of the empty set. (Contributed by Mario Carneiro, 28-Aug-2015)

		Ref	Expression
	Assertion	basdif0	$⊢ B ∖ \{\emptyset\} \in TopBases \leftrightarrow B \in TopBases$

Proof

Step	Hyp	Ref	Expression
1		ssun1	$⊢ B \subseteq B \cup \{\emptyset\}$
2		undif1	$⊢ (B ∖ \{\emptyset\}) \cup \{\emptyset\} = B \cup \{\emptyset\}$
3	1 2	sseqtrri	$⊢ B \subseteq (B ∖ \{\emptyset\}) \cup \{\emptyset\}$
4		snex	$⊢ \{\emptyset\} \in V$
5		unexg	$⊢ (B ∖ \{\emptyset\} \in TopBases \land \{\emptyset\} \in V) \to (B ∖ \{\emptyset\}) \cup \{\emptyset\} \in V$
6	4 5	mpan2	$⊢ B ∖ \{\emptyset\} \in TopBases \to (B ∖ \{\emptyset\}) \cup \{\emptyset\} \in V$
7		ssexg	$⊢ (B \subseteq (B ∖ \{\emptyset\}) \cup \{\emptyset\} \land (B ∖ \{\emptyset\}) \cup \{\emptyset\} \in V) \to B \in V$
8	3 6 7	sylancr	$⊢ B ∖ \{\emptyset\} \in TopBases \to B \in V$
9		elex	$⊢ B \in TopBases \to B \in V$
10		indif1	$⊢ (B ∖ \{\emptyset\}) \cap 𝒫 (x \cap y) = (B \cap 𝒫 (x \cap y)) ∖ \{\emptyset\}$
11	10	unieqi	$⊢ ⋃ ((B ∖ \{\emptyset\}) \cap 𝒫 (x \cap y)) = ⋃ ((B \cap 𝒫 (x \cap y)) ∖ \{\emptyset\})$
12		unidif0	$⊢ ⋃ ((B \cap 𝒫 (x \cap y)) ∖ \{\emptyset\}) = ⋃ (B \cap 𝒫 (x \cap y))$
13	11 12	eqtri	$⊢ ⋃ ((B ∖ \{\emptyset\}) \cap 𝒫 (x \cap y)) = ⋃ (B \cap 𝒫 (x \cap y))$
14	13	sseq2i	$⊢ x \cap y \subseteq ⋃ ((B ∖ \{\emptyset\}) \cap 𝒫 (x \cap y)) \leftrightarrow x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
15	14	ralbii	$⊢ \forall y \in (B ∖ \{\emptyset\}) x \cap y \subseteq ⋃ ((B ∖ \{\emptyset\}) \cap 𝒫 (x \cap y)) \leftrightarrow \forall y \in (B ∖ \{\emptyset\}) x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
16		inss2	$⊢ x \cap y \subseteq y$
17		elinel2	$⊢ y \in (B \cap \{\emptyset\}) \to y \in \{\emptyset\}$
18		elsni	$⊢ y \in \{\emptyset\} \to y = \emptyset$
19	17 18	syl	$⊢ y \in (B \cap \{\emptyset\}) \to y = \emptyset$
20		0ss	$⊢ \emptyset \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
21	19 20	eqsstrdi	$⊢ y \in (B \cap \{\emptyset\}) \to y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
22	16 21	sstrid	$⊢ y \in (B \cap \{\emptyset\}) \to x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
23	22	rgen	$⊢ \forall y \in (B \cap \{\emptyset\}) x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
24		ralunb	$⊢ \forall y \in ((B \cap \{\emptyset\}) \cup (B ∖ \{\emptyset\})) x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)) \leftrightarrow (\forall y \in (B \cap \{\emptyset\}) x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)) \land \forall y \in (B ∖ \{\emptyset\}) x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)))$
25	23 24	mpbiran	$⊢ \forall y \in ((B \cap \{\emptyset\}) \cup (B ∖ \{\emptyset\})) x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)) \leftrightarrow \forall y \in (B ∖ \{\emptyset\}) x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
26		inundif	$⊢ (B \cap \{\emptyset\}) \cup (B ∖ \{\emptyset\}) = B$
27	26	raleqi	$⊢ \forall y \in ((B \cap \{\emptyset\}) \cup (B ∖ \{\emptyset\})) x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)) \leftrightarrow \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
28	15 25 27	3bitr2i	$⊢ \forall y \in (B ∖ \{\emptyset\}) x \cap y \subseteq ⋃ ((B ∖ \{\emptyset\}) \cap 𝒫 (x \cap y)) \leftrightarrow \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
29	28	ralbii	$⊢ \forall x \in (B ∖ \{\emptyset\}) \forall y \in (B ∖ \{\emptyset\}) x \cap y \subseteq ⋃ ((B ∖ \{\emptyset\}) \cap 𝒫 (x \cap y)) \leftrightarrow \forall x \in (B ∖ \{\emptyset\}) \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
30		inss1	$⊢ x \cap y \subseteq x$
31		elinel2	$⊢ x \in (B \cap \{\emptyset\}) \to x \in \{\emptyset\}$
32		elsni	$⊢ x \in \{\emptyset\} \to x = \emptyset$
33	31 32	syl	$⊢ x \in (B \cap \{\emptyset\}) \to x = \emptyset$
34	33 20	eqsstrdi	$⊢ x \in (B \cap \{\emptyset\}) \to x \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
35	30 34	sstrid	$⊢ x \in (B \cap \{\emptyset\}) \to x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
36	35	ralrimivw	$⊢ x \in (B \cap \{\emptyset\}) \to \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
37	36	rgen	$⊢ \forall x \in (B \cap \{\emptyset\}) \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
38		ralunb	$⊢ \forall x \in ((B \cap \{\emptyset\}) \cup (B ∖ \{\emptyset\})) \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)) \leftrightarrow (\forall x \in (B \cap \{\emptyset\}) \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)) \land \forall x \in (B ∖ \{\emptyset\}) \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)))$
39	37 38	mpbiran	$⊢ \forall x \in ((B \cap \{\emptyset\}) \cup (B ∖ \{\emptyset\})) \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)) \leftrightarrow \forall x \in (B ∖ \{\emptyset\}) \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
40	26	raleqi	$⊢ \forall x \in ((B \cap \{\emptyset\}) \cup (B ∖ \{\emptyset\})) \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)) \leftrightarrow \forall x \in B \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
41	29 39 40	3bitr2i	$⊢ \forall x \in (B ∖ \{\emptyset\}) \forall y \in (B ∖ \{\emptyset\}) x \cap y \subseteq ⋃ ((B ∖ \{\emptyset\}) \cap 𝒫 (x \cap y)) \leftrightarrow \forall x \in B \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y))$
42	41	a1i	$⊢ B \in V \to (\forall x \in (B ∖ \{\emptyset\}) \forall y \in (B ∖ \{\emptyset\}) x \cap y \subseteq ⋃ ((B ∖ \{\emptyset\}) \cap 𝒫 (x \cap y)) \leftrightarrow \forall x \in B \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)))$
43		difexg	$⊢ B \in V \to B ∖ \{\emptyset\} \in V$
44		isbasisg	$⊢ B ∖ \{\emptyset\} \in V \to (B ∖ \{\emptyset\} \in TopBases \leftrightarrow \forall x \in (B ∖ \{\emptyset\}) \forall y \in (B ∖ \{\emptyset\}) x \cap y \subseteq ⋃ ((B ∖ \{\emptyset\}) \cap 𝒫 (x \cap y)))$
45	43 44	syl	$⊢ B \in V \to (B ∖ \{\emptyset\} \in TopBases \leftrightarrow \forall x \in (B ∖ \{\emptyset\}) \forall y \in (B ∖ \{\emptyset\}) x \cap y \subseteq ⋃ ((B ∖ \{\emptyset\}) \cap 𝒫 (x \cap y)))$
46		isbasisg	$⊢ B \in V \to (B \in TopBases \leftrightarrow \forall x \in B \forall y \in B x \cap y \subseteq ⋃ (B \cap 𝒫 (x \cap y)))$
47	42 45 46	3bitr4d	$⊢ B \in V \to (B ∖ \{\emptyset\} \in TopBases \leftrightarrow B \in TopBases)$
48	8 9 47	pm5.21nii	$⊢ B ∖ \{\emptyset\} \in TopBases \leftrightarrow B \in TopBases$

Metamath Proof Explorer

Theorem basdif0

Proof