cvmlift2lem6

	Ref	Expression
Hypotheses	cvmlift2.b	$⊢ B = ⋃ C$
	cvmlift2.f	$⊢ φ \to F \in (C CovMap J)$
	cvmlift2.g	$⊢ φ \to G \in ((II \times_{t} II) Cn J)$
	cvmlift2.p	$⊢ φ \to P \in B$
	cvmlift2.i	$⊢ φ \to F (P) = 0 G 0$
	cvmlift2.h	$⊢ H = (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ z G 0) \land f (0) = P))$
	cvmlift2.k	$⊢ K = (x \in [0, 1], y \in [0, 1] ⟼ (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ x G z) \land f (0) = H (x))) (y))$
Assertion	cvmlift2lem6	$⊢ (φ \land X \in [0, 1]) \to {K ↾}_{(\{X\} \times [0, 1])} \in (((II \times_{t} II) ↾_{𝑡} (\{X\} \times [0, 1])) Cn C)$

Proof

Step	Hyp	Ref	Expression
1		cvmlift2.b	$⊢ B = ⋃ C$
2		cvmlift2.f	$⊢ φ \to F \in (C CovMap J)$
3		cvmlift2.g	$⊢ φ \to G \in ((II \times_{t} II) Cn J)$
4		cvmlift2.p	$⊢ φ \to P \in B$
5		cvmlift2.i	$⊢ φ \to F (P) = 0 G 0$
6		cvmlift2.h	$⊢ H = (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ z G 0) \land f (0) = P))$
7		cvmlift2.k	$⊢ K = (x \in [0, 1], y \in [0, 1] ⟼ (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ x G z) \land f (0) = H (x))) (y))$
8	1 2 3 4 5 6 7	cvmlift2lem5	$⊢ φ \to K : [0, 1] \times [0, 1] ⟶ B$
9	8	adantr	$⊢ (φ \land X \in [0, 1]) \to K : [0, 1] \times [0, 1] ⟶ B$
10	9	ffnd	$⊢ (φ \land X \in [0, 1]) \to K Fn ([0, 1] \times [0, 1])$
11		fnov	$⊢ K Fn ([0, 1] \times [0, 1]) \leftrightarrow K = (u \in [0, 1], v \in [0, 1] ⟼ u K v)$
12	10 11	sylib	$⊢ (φ \land X \in [0, 1]) \to K = (u \in [0, 1], v \in [0, 1] ⟼ u K v)$
13	12	reseq1d	$⊢ (φ \land X \in [0, 1]) \to {K ↾}_{(\{X\} \times [0, 1])} = {(u \in [0, 1], v \in [0, 1] ⟼ u K v) ↾}_{(\{X\} \times [0, 1])}$
14		simpr	$⊢ (φ \land X \in [0, 1]) \to X \in [0, 1]$
15	14	snssd	$⊢ (φ \land X \in [0, 1]) \to \{X\} \subseteq [0, 1]$
16		ssid	$⊢ [0, 1] \subseteq [0, 1]$
17		resmpo	$⊢ (\{X\} \subseteq [0, 1] \land [0, 1] \subseteq [0, 1]) \to {(u \in [0, 1], v \in [0, 1] ⟼ u K v) ↾}_{(\{X\} \times [0, 1])} = (u \in \{X\}, v \in [0, 1] ⟼ u K v)$
18	15 16 17	sylancl	$⊢ (φ \land X \in [0, 1]) \to {(u \in [0, 1], v \in [0, 1] ⟼ u K v) ↾}_{(\{X\} \times [0, 1])} = (u \in \{X\}, v \in [0, 1] ⟼ u K v)$
19		elsni	$⊢ u \in \{X\} \to u = X$
20	19	3ad2ant2	$⊢ ((φ \land X \in [0, 1]) \land u \in \{X\} \land v \in [0, 1]) \to u = X$
21	20	oveq1d	$⊢ ((φ \land X \in [0, 1]) \land u \in \{X\} \land v \in [0, 1]) \to u K v = X K v$
22		simp1r	$⊢ ((φ \land X \in [0, 1]) \land u \in \{X\} \land v \in [0, 1]) \to X \in [0, 1]$
23		simp3	$⊢ ((φ \land X \in [0, 1]) \land u \in \{X\} \land v \in [0, 1]) \to v \in [0, 1]$
24	1 2 3 4 5 6 7	cvmlift2lem4	$⊢ (X \in [0, 1] \land v \in [0, 1]) \to X K v = (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) (v)$
25	22 23 24	syl2anc	$⊢ ((φ \land X \in [0, 1]) \land u \in \{X\} \land v \in [0, 1]) \to X K v = (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) (v)$
26	21 25	eqtrd	$⊢ ((φ \land X \in [0, 1]) \land u \in \{X\} \land v \in [0, 1]) \to u K v = (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) (v)$
27	26	mpoeq3dva	$⊢ (φ \land X \in [0, 1]) \to (u \in \{X\}, v \in [0, 1] ⟼ u K v) = (u \in \{X\}, v \in [0, 1] ⟼ (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) (v))$
28	18 27	eqtrd	$⊢ (φ \land X \in [0, 1]) \to {(u \in [0, 1], v \in [0, 1] ⟼ u K v) ↾}_{(\{X\} \times [0, 1])} = (u \in \{X\}, v \in [0, 1] ⟼ (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) (v))$
29	13 28	eqtrd	$⊢ (φ \land X \in [0, 1]) \to {K ↾}_{(\{X\} \times [0, 1])} = (u \in \{X\}, v \in [0, 1] ⟼ (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) (v))$
30		eqid	$⊢ II ↾_{𝑡} \{X\} = II ↾_{𝑡} \{X\}$
31		iitopon	$⊢ II \in TopOn ([0, 1])$
32	31	a1i	$⊢ (φ \land X \in [0, 1]) \to II \in TopOn ([0, 1])$
33		eqid	$⊢ II ↾_{𝑡} [0, 1] = II ↾_{𝑡} [0, 1]$
34	16	a1i	$⊢ (φ \land X \in [0, 1]) \to [0, 1] \subseteq [0, 1]$
35	32 32	cnmpt2nd	$⊢ (φ \land X \in [0, 1]) \to (u \in [0, 1], v \in [0, 1] ⟼ v) \in ((II \times_{t} II) Cn II)$
36		eqid	$⊢ (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) = (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X)))$
37	1 2 3 4 5 6 36	cvmlift2lem3	$⊢ (φ \land X \in [0, 1]) \to ((ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) \in (II Cn C) \land F \circ (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) = (z \in [0, 1] ⟼ X G z) \land (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) (0) = H (X))$
38	37	simp1d	$⊢ (φ \land X \in [0, 1]) \to (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) \in (II Cn C)$
39	32 32 35 38	cnmpt21f	$⊢ (φ \land X \in [0, 1]) \to (u \in [0, 1], v \in [0, 1] ⟼ (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) (v)) \in ((II \times_{t} II) Cn C)$
40	30 32 15 33 32 34 39	cnmpt2res	$⊢ (φ \land X \in [0, 1]) \to (u \in \{X\}, v \in [0, 1] ⟼ (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) (v)) \in (((II ↾_{𝑡} \{X\}) \times_{t} (II ↾_{𝑡} [0, 1])) Cn C)$
41		iitop	$⊢ II \in Top$
42		snex	$⊢ \{X\} \in V$
43		ovex	$⊢ [0, 1] \in V$
44		txrest	$⊢ ((II \in Top \land II \in Top) \land (\{X\} \in V \land [0, 1] \in V)) \to (II \times_{t} II) ↾_{𝑡} (\{X\} \times [0, 1]) = (II ↾_{𝑡} \{X\}) \times_{t} (II ↾_{𝑡} [0, 1])$
45	41 41 42 43 44	mp4an	$⊢ (II \times_{t} II) ↾_{𝑡} (\{X\} \times [0, 1]) = (II ↾_{𝑡} \{X\}) \times_{t} (II ↾_{𝑡} [0, 1])$
46	45	oveq1i	$⊢ ((II \times_{t} II) ↾_{𝑡} (\{X\} \times [0, 1])) Cn C = ((II ↾_{𝑡} \{X\}) \times_{t} (II ↾_{𝑡} [0, 1])) Cn C$
47	40 46	eleqtrrdi	$⊢ (φ \land X \in [0, 1]) \to (u \in \{X\}, v \in [0, 1] ⟼ (ι f \in (II Cn C) \| (F \circ f = (z \in [0, 1] ⟼ X G z) \land f (0) = H (X))) (v)) \in (((II \times_{t} II) ↾_{𝑡} (\{X\} \times [0, 1])) Cn C)$
48	29 47	eqeltrd	$⊢ (φ \land X \in [0, 1]) \to {K ↾}_{(\{X\} \times [0, 1])} \in (((II \times_{t} II) ↾_{𝑡} (\{X\} \times [0, 1])) Cn C)$

Metamath Proof Explorer

Theorem cvmlift2lem6

Proof