Theorem gomaex3lem6 899

Description: Lemma for Godowski 6-var -> Mayet Example 3.

Hypotheses

Ref	Expression
gomaex3lem5.1	a ≤ b⊥
gomaex3lem5.2	b ≤ c⊥
gomaex3lem5.3	c ≤ d⊥
gomaex3lem5.5	e ≤ f⊥
gomaex3lem5.6	f ≤ a⊥
gomaex3lem5.8	(((i →2 g) ∩ (g →2 y)) ∩ (((y →2 w) ∩ (w →2 n)) ∩ ((n →2 k) ∩ (k →2 i)))) ≤ (g →2 i)
gomaex3lem5.9	p = ((a ∪ b) →1 (d ∪ e)⊥ )⊥
gomaex3lem5.10	q = ((e ∪ f) →1 (b ∪ c)⊥ )⊥
gomaex3lem5.11	r = ((p⊥ →1 q)⊥ ∩ (c ∪ d))
gomaex3lem5.12	g = a
gomaex3lem5.13	h = b
gomaex3lem5.14	i = c
gomaex3lem5.15	j = (c ∪ d)⊥
gomaex3lem5.16	k = r
gomaex3lem5.17	m = (p⊥ →1 q)
gomaex3lem5.18	n = (p⊥ →1 q)⊥
gomaex3lem5.19	u = (p⊥ ∩ q)
gomaex3lem5.20	w = q⊥
gomaex3lem5.21	x = q
gomaex3lem5.22	y = (e ∪ f)⊥
gomaex3lem5.23	z = f

Assertion

Ref	Expression
gomaex3lem6	(((a ∪ b) ∩ (c ∪ (c ∪ d)⊥ )) ∩ (((r ∪ (p⊥ →1 q)) ∩ ((p⊥ →1 q)⊥ ∪ (p⊥ ∩ q))) ∩ ((q⊥ ∪ q) ∩ ((e ∪ f)⊥ ∪ f)))) ≤ (b ∪ c)

Proof of Theorem gomaex3lem6

Step	Hyp	Ref	Expression
1		gomaex3lem5.1	. . 3 a ≤ b⊥
2		gomaex3lem5.2	. . 3 b ≤ c⊥
3		gomaex3lem5.3	. . 3 c ≤ d⊥
4		gomaex3lem5.5	. . 3 e ≤ f⊥
5		gomaex3lem5.6	. . 3 f ≤ a⊥
6		gomaex3lem5.8	. . 3 (((i →2 g) ∩ (g →2 y)) ∩ (((y →2 w) ∩ (w →2 n)) ∩ ((n →2 k) ∩ (k →2 i)))) ≤ (g →2 i)
7		gomaex3lem5.9	. . 3 p = ((a ∪ b) →1 (d ∪ e)⊥ )⊥
8		gomaex3lem5.10	. . 3 q = ((e ∪ f) →1 (b ∪ c)⊥ )⊥
9		gomaex3lem5.11	. . 3 r = ((p⊥ →1 q)⊥ ∩ (c ∪ d))
10		gomaex3lem5.12	. . 3 g = a
11		gomaex3lem5.13	. . 3 h = b
12		gomaex3lem5.14	. . 3 i = c
13		gomaex3lem5.15	. . 3 j = (c ∪ d)⊥
14		gomaex3lem5.16	. . 3 k = r
15		gomaex3lem5.17	. . 3 m = (p⊥ →1 q)
16		gomaex3lem5.18	. . 3 n = (p⊥ →1 q)⊥
17		gomaex3lem5.19	. . 3 u = (p⊥ ∩ q)
18		gomaex3lem5.20	. . 3 w = q⊥
19		gomaex3lem5.21	. . 3 x = q
20		gomaex3lem5.22	. . 3 y = (e ∪ f)⊥
21		gomaex3lem5.23	. . 3 z = f
22	1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19, 20, 21	gomaex3lem5 898	. 2 (((g ∪ h) ∩ (i ∪ j)) ∩ (((k ∪ m) ∩ (n ∪ u)) ∩ ((w ∪ x) ∩ (y ∪ z)))) ≤ (h ∪ i)
23	10, 11	2or 67	. . . 4 (g ∪ h) = (a ∪ b)
24	12, 13	2or 67	. . . 4 (i ∪ j) = (c ∪ (c ∪ d)⊥ )
25	23, 24	2an 72	. . 3 ((g ∪ h) ∩ (i ∪ j)) = ((a ∪ b) ∩ (c ∪ (c ∪ d)⊥ ))
26	14, 15	2or 67	. . . . 5 (k ∪ m) = (r ∪ (p⊥ →1 q))
27	16, 17	2or 67	. . . . 5 (n ∪ u) = ((p⊥ →1 q)⊥ ∪ (p⊥ ∩ q))
28	26, 27	2an 72	. . . 4 ((k ∪ m) ∩ (n ∪ u)) = ((r ∪ (p⊥ →1 q)) ∩ ((p⊥ →1 q)⊥ ∪ (p⊥ ∩ q)))
29	18, 19	2or 67	. . . . 5 (w ∪ x) = (q⊥ ∪ q)
30	20, 21	2or 67	. . . . 5 (y ∪ z) = ((e ∪ f)⊥ ∪ f)
31	29, 30	2an 72	. . . 4 ((w ∪ x) ∩ (y ∪ z)) = ((q⊥ ∪ q) ∩ ((e ∪ f)⊥ ∪ f))
32	28, 31	2an 72	. . 3 (((k ∪ m) ∩ (n ∪ u)) ∩ ((w ∪ x) ∩ (y ∪ z))) = (((r ∪ (p⊥ →1 q)) ∩ ((p⊥ →1 q)⊥ ∪ (p⊥ ∩ q))) ∩ ((q⊥ ∪ q) ∩ ((e ∪ f)⊥ ∪ f)))
33	25, 32	2an 72	. 2 (((g ∪ h) ∩ (i ∪ j)) ∩ (((k ∪ m) ∩ (n ∪ u)) ∩ ((w ∪ x) ∩ (y ∪ z)))) = (((a ∪ b) ∩ (c ∪ (c ∪ d)⊥ )) ∩ (((r ∪ (p⊥ →1 q)) ∩ ((p⊥ →1 q)⊥ ∪ (p⊥ ∩ q))) ∩ ((q⊥ ∪ q) ∩ ((e ∪ f)⊥ ∪ f))))
34	11, 12	2or 67	. 2 (h ∪ i) = (b ∪ c)
35	22, 33, 34	le3tr2 133	1 (((a ∪ b) ∩ (c ∪ (c ∪ d)⊥ )) ∩ (((r ∪ (p⊥ →1 q)) ∩ ((p⊥ →1 q)⊥ ∪ (p⊥ ∩ q))) ∩ ((q⊥ ∪ q) ∩ ((e ∪ f)⊥ ∪ f)))) ≤ (b ∪ c)

Syntax hints:   = wb 1   ≤ wle 2  ^⊥ wn 4   ∪ wo 6   ∩ wa 7   →₁ wi1 13   →₂ wi2 14

This theorem is referenced by:  gomaex3lem7 900

This theorem was proved from axioms:  ax-a1 29  ax-a2 30  ax-a3 31  ax-a4 32  ax-a5 33  ax-r1 34  ax-r2 35  ax-r4 36  ax-r5 37  ax-r3 421

This theorem depends on definitions:  df-b 38  df-a 39  df-t 40  df-f 41  df-i1 43  df-i2 44  df-le1 122  df-le2 123  df-c1 124  df-c2 125

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