dath

Description: Desargues's theorem of projective geometry (proved for a Hilbert lattice). Assume each triple of atoms (points) P Q R and S T U forms a triangle (i.e. determines a plane). Assume that lines P S , Q T , and R U meet at a "center of perspectivity" C . (We also assume that C is not on any of the 6 lines forming the two triangles.) Then the atoms D = ( P .\/ Q ) ./\ ( S .\/ T ) , E = ( Q .\/ R ) ./\ ( T .\/ U ) , F = ( R .\/ P ) ./\ ( U .\/ S ) are colinear, forming an "axis of perspectivity".

Our proof roughly follows Theorem 2.7.1, p. 78 in Beutelspacher and Rosenbaum,Projective Geometry: From Foundations to Applications, Cambridge University Press (1988). Unlike them, we do not assume that C is an atom to make this theorem slightly more general for easier future use. However, we prove that C must be an atom in dalemcea .

See Theorems dalaw for Desargues's law, which eliminates all of the preconditions on the atoms except for central perspectivity. This is Metamath 100 proof #87. (Contributed by NM, 20-Aug-2012)

	Ref	Expression
Hypotheses	dath.b	$⊢ B = {Base}_{K}$
	dath.l	$⊢ \underset{˙}{\leq} = \leq_{K}$
	dath.j	$⊢ \underset{˙}{\lor} = join (K)$
	dath.a	$⊢ A = Atoms (K)$
	dath.m	$⊢ \underset{˙}{\land} = meet (K)$
	dath.o	$⊢ O = LPlanes (K)$
	dath.d	$⊢ D = (P \underset{˙}{\lor} Q) \underset{˙}{\land} (S \underset{˙}{\lor} T)$
	dath.e	$⊢ E = (Q \underset{˙}{\lor} R) \underset{˙}{\land} (T \underset{˙}{\lor} U)$
	dath.f	$⊢ F = (R \underset{˙}{\lor} P) \underset{˙}{\land} (U \underset{˙}{\lor} S)$
Assertion	dath	$⊢ (((K \in HL \land C \in B) \land (P \in A \land Q \in A \land R \in A) \land (S \in A \land T \in A \land U \in A)) \land ((P \underset{˙}{\lor} Q) \underset{˙}{\lor} R \in O \land (S \underset{˙}{\lor} T) \underset{˙}{\lor} U \in O) \land ((\neg C \underset{˙}{\leq} (P \underset{˙}{\lor} Q) \land \neg C \underset{˙}{\leq} (Q \underset{˙}{\lor} R) \land \neg C \underset{˙}{\leq} (R \underset{˙}{\lor} P)) \land (\neg C \underset{˙}{\leq} (S \underset{˙}{\lor} T) \land \neg C \underset{˙}{\leq} (T \underset{˙}{\lor} U) \land \neg C \underset{˙}{\leq} (U \underset{˙}{\lor} S)) \land (C \underset{˙}{\leq} (P \underset{˙}{\lor} S) \land C \underset{˙}{\leq} (Q \underset{˙}{\lor} T) \land C \underset{˙}{\leq} (R \underset{˙}{\lor} U)))) \to F \underset{˙}{\leq} (D \underset{˙}{\lor} E)$

Proof

Step	Hyp	Ref	Expression
1		dath.b	$⊢ B = {Base}_{K}$
2		dath.l	$⊢ \underset{˙}{\leq} = \leq_{K}$
3		dath.j	$⊢ \underset{˙}{\lor} = join (K)$
4		dath.a	$⊢ A = Atoms (K)$
5		dath.m	$⊢ \underset{˙}{\land} = meet (K)$
6		dath.o	$⊢ O = LPlanes (K)$
7		dath.d	$⊢ D = (P \underset{˙}{\lor} Q) \underset{˙}{\land} (S \underset{˙}{\lor} T)$
8		dath.e	$⊢ E = (Q \underset{˙}{\lor} R) \underset{˙}{\land} (T \underset{˙}{\lor} U)$
9		dath.f	$⊢ F = (R \underset{˙}{\lor} P) \underset{˙}{\land} (U \underset{˙}{\lor} S)$
10	1	eleq2i	$⊢ C \in B \leftrightarrow C \in {Base}_{K}$
11	10	anbi2i	$⊢ (K \in HL \land C \in B) \leftrightarrow (K \in HL \land C \in {Base}_{K})$
12	11	3anbi1i	$⊢ ((K \in HL \land C \in B) \land (P \in A \land Q \in A \land R \in A) \land (S \in A \land T \in A \land U \in A)) \leftrightarrow ((K \in HL \land C \in {Base}_{K}) \land (P \in A \land Q \in A \land R \in A) \land (S \in A \land T \in A \land U \in A))$
13	12	3anbi1i	$⊢ (((K \in HL \land C \in B) \land (P \in A \land Q \in A \land R \in A) \land (S \in A \land T \in A \land U \in A)) \land ((P \underset{˙}{\lor} Q) \underset{˙}{\lor} R \in O \land (S \underset{˙}{\lor} T) \underset{˙}{\lor} U \in O) \land ((\neg C \underset{˙}{\leq} (P \underset{˙}{\lor} Q) \land \neg C \underset{˙}{\leq} (Q \underset{˙}{\lor} R) \land \neg C \underset{˙}{\leq} (R \underset{˙}{\lor} P)) \land (\neg C \underset{˙}{\leq} (S \underset{˙}{\lor} T) \land \neg C \underset{˙}{\leq} (T \underset{˙}{\lor} U) \land \neg C \underset{˙}{\leq} (U \underset{˙}{\lor} S)) \land (C \underset{˙}{\leq} (P \underset{˙}{\lor} S) \land C \underset{˙}{\leq} (Q \underset{˙}{\lor} T) \land C \underset{˙}{\leq} (R \underset{˙}{\lor} U)))) \leftrightarrow (((K \in HL \land C \in {Base}_{K}) \land (P \in A \land Q \in A \land R \in A) \land (S \in A \land T \in A \land U \in A)) \land ((P \underset{˙}{\lor} Q) \underset{˙}{\lor} R \in O \land (S \underset{˙}{\lor} T) \underset{˙}{\lor} U \in O) \land ((\neg C \underset{˙}{\leq} (P \underset{˙}{\lor} Q) \land \neg C \underset{˙}{\leq} (Q \underset{˙}{\lor} R) \land \neg C \underset{˙}{\leq} (R \underset{˙}{\lor} P)) \land (\neg C \underset{˙}{\leq} (S \underset{˙}{\lor} T) \land \neg C \underset{˙}{\leq} (T \underset{˙}{\lor} U) \land \neg C \underset{˙}{\leq} (U \underset{˙}{\lor} S)) \land (C \underset{˙}{\leq} (P \underset{˙}{\lor} S) \land C \underset{˙}{\leq} (Q \underset{˙}{\lor} T) \land C \underset{˙}{\leq} (R \underset{˙}{\lor} U))))$
14		eqid	$⊢ (P \underset{˙}{\lor} Q) \underset{˙}{\lor} R = (P \underset{˙}{\lor} Q) \underset{˙}{\lor} R$
15		eqid	$⊢ (S \underset{˙}{\lor} T) \underset{˙}{\lor} U = (S \underset{˙}{\lor} T) \underset{˙}{\lor} U$
16	13 2 3 4 5 6 14 15 7 8 9	dalem63	$⊢ (((K \in HL \land C \in B) \land (P \in A \land Q \in A \land R \in A) \land (S \in A \land T \in A \land U \in A)) \land ((P \underset{˙}{\lor} Q) \underset{˙}{\lor} R \in O \land (S \underset{˙}{\lor} T) \underset{˙}{\lor} U \in O) \land ((\neg C \underset{˙}{\leq} (P \underset{˙}{\lor} Q) \land \neg C \underset{˙}{\leq} (Q \underset{˙}{\lor} R) \land \neg C \underset{˙}{\leq} (R \underset{˙}{\lor} P)) \land (\neg C \underset{˙}{\leq} (S \underset{˙}{\lor} T) \land \neg C \underset{˙}{\leq} (T \underset{˙}{\lor} U) \land \neg C \underset{˙}{\leq} (U \underset{˙}{\lor} S)) \land (C \underset{˙}{\leq} (P \underset{˙}{\lor} S) \land C \underset{˙}{\leq} (Q \underset{˙}{\lor} T) \land C \underset{˙}{\leq} (R \underset{˙}{\lor} U)))) \to F \underset{˙}{\leq} (D \underset{˙}{\lor} E)$

Metamath Proof Explorer

Theorem dath

Proof