dalem16

Description: Lemma for dath . The atoms D , E , and F form a line of perspectivity. This is Desargues's theorem for the special case where planes Y and Z are different. (Contributed by NM, 7-Aug-2012)

	Ref	Expression
Hypotheses	dalema.ph	$⊢ φ \leftrightarrow (((K \in HL \land C \in {Base}_{K}) \land (P \in A \land Q \in A \land R \in A) \land (S \in A \land T \in A \land U \in A)) \land (Y \in O \land Z \in O) \land ((\neg C \underset{˙}{\leq} (P \underset{˙}{\lor} Q) \land \neg C \underset{˙}{\leq} (Q \underset{˙}{\lor} R) \land \neg C \underset{˙}{\leq} (R \underset{˙}{\lor} P)) \land (\neg C \underset{˙}{\leq} (S \underset{˙}{\lor} T) \land \neg C \underset{˙}{\leq} (T \underset{˙}{\lor} U) \land \neg C \underset{˙}{\leq} (U \underset{˙}{\lor} S)) \land (C \underset{˙}{\leq} (P \underset{˙}{\lor} S) \land C \underset{˙}{\leq} (Q \underset{˙}{\lor} T) \land C \underset{˙}{\leq} (R \underset{˙}{\lor} U))))$
	dalemc.l	$⊢ \underset{˙}{\leq} = \leq_{K}$
	dalemc.j	$⊢ \underset{˙}{\lor} = join (K)$
	dalemc.a	$⊢ A = Atoms (K)$
	dalem16.m	$⊢ \underset{˙}{\land} = meet (K)$
	dalem16.o	$⊢ O = LPlanes (K)$
	dalem16.y	$⊢ Y = (P \underset{˙}{\lor} Q) \underset{˙}{\lor} R$
	dalem16.z	$⊢ Z = (S \underset{˙}{\lor} T) \underset{˙}{\lor} U$
	dalem16.d	$⊢ D = (P \underset{˙}{\lor} Q) \underset{˙}{\land} (S \underset{˙}{\lor} T)$
	dalem16.e	$⊢ E = (Q \underset{˙}{\lor} R) \underset{˙}{\land} (T \underset{˙}{\lor} U)$
	dalem16.f	$⊢ F = (R \underset{˙}{\lor} P) \underset{˙}{\land} (U \underset{˙}{\lor} S)$
Assertion	dalem16	$⊢ (φ \land Y \neq Z) \to F \underset{˙}{\leq} (D \underset{˙}{\lor} E)$

Proof

Step	Hyp	Ref	Expression
1		dalema.ph	$⊢ φ \leftrightarrow (((K \in HL \land C \in {Base}_{K}) \land (P \in A \land Q \in A \land R \in A) \land (S \in A \land T \in A \land U \in A)) \land (Y \in O \land Z \in O) \land ((\neg C \underset{˙}{\leq} (P \underset{˙}{\lor} Q) \land \neg C \underset{˙}{\leq} (Q \underset{˙}{\lor} R) \land \neg C \underset{˙}{\leq} (R \underset{˙}{\lor} P)) \land (\neg C \underset{˙}{\leq} (S \underset{˙}{\lor} T) \land \neg C \underset{˙}{\leq} (T \underset{˙}{\lor} U) \land \neg C \underset{˙}{\leq} (U \underset{˙}{\lor} S)) \land (C \underset{˙}{\leq} (P \underset{˙}{\lor} S) \land C \underset{˙}{\leq} (Q \underset{˙}{\lor} T) \land C \underset{˙}{\leq} (R \underset{˙}{\lor} U))))$
2		dalemc.l	$⊢ \underset{˙}{\leq} = \leq_{K}$
3		dalemc.j	$⊢ \underset{˙}{\lor} = join (K)$
4		dalemc.a	$⊢ A = Atoms (K)$
5		dalem16.m	$⊢ \underset{˙}{\land} = meet (K)$
6		dalem16.o	$⊢ O = LPlanes (K)$
7		dalem16.y	$⊢ Y = (P \underset{˙}{\lor} Q) \underset{˙}{\lor} R$
8		dalem16.z	$⊢ Z = (S \underset{˙}{\lor} T) \underset{˙}{\lor} U$
9		dalem16.d	$⊢ D = (P \underset{˙}{\lor} Q) \underset{˙}{\land} (S \underset{˙}{\lor} T)$
10		dalem16.e	$⊢ E = (Q \underset{˙}{\lor} R) \underset{˙}{\land} (T \underset{˙}{\lor} U)$
11		dalem16.f	$⊢ F = (R \underset{˙}{\lor} P) \underset{˙}{\land} (U \underset{˙}{\lor} S)$
12		eqid	$⊢ Y \underset{˙}{\land} Z = Y \underset{˙}{\land} Z$
13	1 2 3 4 5 6 7 8 12 11	dalem12	$⊢ φ \to F \underset{˙}{\leq} (Y \underset{˙}{\land} Z)$
14	13	adantr	$⊢ (φ \land Y \neq Z) \to F \underset{˙}{\leq} (Y \underset{˙}{\land} Z)$
15	1 2 3 4 5 6 7 8 12 9	dalem10	$⊢ φ \to D \underset{˙}{\leq} (Y \underset{˙}{\land} Z)$
16	1 2 3 4 5 6 7 8 12 10	dalem11	$⊢ φ \to E \underset{˙}{\leq} (Y \underset{˙}{\land} Z)$
17	1	dalemkelat	$⊢ φ \to K \in Lat$
18	1 2 3 4 5 6 7 8 9	dalemdea	$⊢ φ \to D \in A$
19		eqid	$⊢ {Base}_{K} = {Base}_{K}$
20	19 4	atbase	$⊢ D \in A \to D \in {Base}_{K}$
21	18 20	syl	$⊢ φ \to D \in {Base}_{K}$
22	1 2 3 4 5 6 7 8 10	dalemeea	$⊢ φ \to E \in A$
23	19 4	atbase	$⊢ E \in A \to E \in {Base}_{K}$
24	22 23	syl	$⊢ φ \to E \in {Base}_{K}$
25	1 6	dalemyeb	$⊢ φ \to Y \in {Base}_{K}$
26	1	dalemzeo	$⊢ φ \to Z \in O$
27	19 6	lplnbase	$⊢ Z \in O \to Z \in {Base}_{K}$
28	26 27	syl	$⊢ φ \to Z \in {Base}_{K}$
29	19 5	latmcl	$⊢ (K \in Lat \land Y \in {Base}_{K} \land Z \in {Base}_{K}) \to Y \underset{˙}{\land} Z \in {Base}_{K}$
30	17 25 28 29	syl3anc	$⊢ φ \to Y \underset{˙}{\land} Z \in {Base}_{K}$
31	19 2 3	latjle12	$⊢ (K \in Lat \land (D \in {Base}_{K} \land E \in {Base}_{K} \land Y \underset{˙}{\land} Z \in {Base}_{K})) \to ((D \underset{˙}{\leq} (Y \underset{˙}{\land} Z) \land E \underset{˙}{\leq} (Y \underset{˙}{\land} Z)) \leftrightarrow (D \underset{˙}{\lor} E) \underset{˙}{\leq} (Y \underset{˙}{\land} Z))$
32	17 21 24 30 31	syl13anc	$⊢ φ \to ((D \underset{˙}{\leq} (Y \underset{˙}{\land} Z) \land E \underset{˙}{\leq} (Y \underset{˙}{\land} Z)) \leftrightarrow (D \underset{˙}{\lor} E) \underset{˙}{\leq} (Y \underset{˙}{\land} Z))$
33	15 16 32	mpbi2and	$⊢ φ \to (D \underset{˙}{\lor} E) \underset{˙}{\leq} (Y \underset{˙}{\land} Z)$
34	33	adantr	$⊢ (φ \land Y \neq Z) \to (D \underset{˙}{\lor} E) \underset{˙}{\leq} (Y \underset{˙}{\land} Z)$
35	1	dalemkehl	$⊢ φ \to K \in HL$
36	35	adantr	$⊢ (φ \land Y \neq Z) \to K \in HL$
37	1 2 3 4 5 6 7 8 9 10	dalemdnee	$⊢ φ \to D \neq E$
38		eqid	$⊢ LLines (K) = LLines (K)$
39	3 4 38	llni2	$⊢ ((K \in HL \land D \in A \land E \in A) \land D \neq E) \to D \underset{˙}{\lor} E \in LLines (K)$
40	35 18 22 37 39	syl31anc	$⊢ φ \to D \underset{˙}{\lor} E \in LLines (K)$
41	40	adantr	$⊢ (φ \land Y \neq Z) \to D \underset{˙}{\lor} E \in LLines (K)$
42	1 2 3 4 5 38 6 7 8 12	dalem15	$⊢ (φ \land Y \neq Z) \to Y \underset{˙}{\land} Z \in LLines (K)$
43	2 38	llncmp	$⊢ (K \in HL \land D \underset{˙}{\lor} E \in LLines (K) \land Y \underset{˙}{\land} Z \in LLines (K)) \to ((D \underset{˙}{\lor} E) \underset{˙}{\leq} (Y \underset{˙}{\land} Z) \leftrightarrow D \underset{˙}{\lor} E = Y \underset{˙}{\land} Z)$
44	36 41 42 43	syl3anc	$⊢ (φ \land Y \neq Z) \to ((D \underset{˙}{\lor} E) \underset{˙}{\leq} (Y \underset{˙}{\land} Z) \leftrightarrow D \underset{˙}{\lor} E = Y \underset{˙}{\land} Z)$
45	34 44	mpbid	$⊢ (φ \land Y \neq Z) \to D \underset{˙}{\lor} E = Y \underset{˙}{\land} Z$
46	14 45	breqtrrd	$⊢ (φ \land Y \neq Z) \to F \underset{˙}{\leq} (D \underset{˙}{\lor} E)$

Metamath Proof Explorer

Theorem dalem16

Proof