Metamath Proof Explorer

Theorem chjass

Description: Associative law for Hilbert lattice join. From definition of lattice in Kalmbach p. 14. (Contributed by NM, 10-Jun-2004) (New usage is discouraged.)

		Ref	Expression
	Assertion	chjass	$⊢ (A \in C_{ℋ} \land B \in C_{ℋ} \land C \in C_{ℋ}) \to (A \lor_{ℋ} B) \lor_{ℋ} C = A \lor_{ℋ} (B \lor_{ℋ} C)$

Proof

Step	Hyp	Ref	Expression
1		oveq1	$⊢ A = if (A \in C_{ℋ}, A, ℋ) \to A \lor_{ℋ} B = if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} B$
2	1	oveq1d	$⊢ A = if (A \in C_{ℋ}, A, ℋ) \to (A \lor_{ℋ} B) \lor_{ℋ} C = (if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} B) \lor_{ℋ} C$
3		oveq1	$⊢ A = if (A \in C_{ℋ}, A, ℋ) \to A \lor_{ℋ} (B \lor_{ℋ} C) = if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} (B \lor_{ℋ} C)$
4	2 3	eqeq12d	$⊢ A = if (A \in C_{ℋ}, A, ℋ) \to ((A \lor_{ℋ} B) \lor_{ℋ} C = A \lor_{ℋ} (B \lor_{ℋ} C) \leftrightarrow (if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} B) \lor_{ℋ} C = if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} (B \lor_{ℋ} C))$
5		oveq2	$⊢ B = if (B \in C_{ℋ}, B, ℋ) \to if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} B = if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} if (B \in C_{ℋ}, B, ℋ)$
6	5	oveq1d	$⊢ B = if (B \in C_{ℋ}, B, ℋ) \to (if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} B) \lor_{ℋ} C = (if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} if (B \in C_{ℋ}, B, ℋ)) \lor_{ℋ} C$
7		oveq1	$⊢ B = if (B \in C_{ℋ}, B, ℋ) \to B \lor_{ℋ} C = if (B \in C_{ℋ}, B, ℋ) \lor_{ℋ} C$
8	7	oveq2d	$⊢ B = if (B \in C_{ℋ}, B, ℋ) \to if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} (B \lor_{ℋ} C) = if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} (if (B \in C_{ℋ}, B, ℋ) \lor_{ℋ} C)$
9	6 8	eqeq12d	$⊢ B = if (B \in C_{ℋ}, B, ℋ) \to ((if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} B) \lor_{ℋ} C = if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} (B \lor_{ℋ} C) \leftrightarrow (if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} if (B \in C_{ℋ}, B, ℋ)) \lor_{ℋ} C = if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} (if (B \in C_{ℋ}, B, ℋ) \lor_{ℋ} C))$
10		oveq2	$⊢ C = if (C \in C_{ℋ}, C, ℋ) \to (if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} if (B \in C_{ℋ}, B, ℋ)) \lor_{ℋ} C = (if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} if (B \in C_{ℋ}, B, ℋ)) \lor_{ℋ} if (C \in C_{ℋ}, C, ℋ)$
11		oveq2	$⊢ C = if (C \in C_{ℋ}, C, ℋ) \to if (B \in C_{ℋ}, B, ℋ) \lor_{ℋ} C = if (B \in C_{ℋ}, B, ℋ) \lor_{ℋ} if (C \in C_{ℋ}, C, ℋ)$
12	11	oveq2d	$⊢ C = if (C \in C_{ℋ}, C, ℋ) \to if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} (if (B \in C_{ℋ}, B, ℋ) \lor_{ℋ} C) = if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} (if (B \in C_{ℋ}, B, ℋ) \lor_{ℋ} if (C \in C_{ℋ}, C, ℋ))$
13	10 12	eqeq12d	$⊢ C = if (C \in C_{ℋ}, C, ℋ) \to ((if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} if (B \in C_{ℋ}, B, ℋ)) \lor_{ℋ} C = if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} (if (B \in C_{ℋ}, B, ℋ) \lor_{ℋ} C) \leftrightarrow (if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} if (B \in C_{ℋ}, B, ℋ)) \lor_{ℋ} if (C \in C_{ℋ}, C, ℋ) = if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} (if (B \in C_{ℋ}, B, ℋ) \lor_{ℋ} if (C \in C_{ℋ}, C, ℋ)))$
14		ifchhv	$⊢ if (A \in C_{ℋ}, A, ℋ) \in C_{ℋ}$
15		ifchhv	$⊢ if (B \in C_{ℋ}, B, ℋ) \in C_{ℋ}$
16		ifchhv	$⊢ if (C \in C_{ℋ}, C, ℋ) \in C_{ℋ}$
17	14 15 16	chjassi	$⊢ (if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} if (B \in C_{ℋ}, B, ℋ)) \lor_{ℋ} if (C \in C_{ℋ}, C, ℋ) = if (A \in C_{ℋ}, A, ℋ) \lor_{ℋ} (if (B \in C_{ℋ}, B, ℋ) \lor_{ℋ} if (C \in C_{ℋ}, C, ℋ))$
18	4 9 13 17	dedth3h	$⊢ (A \in C_{ℋ} \land B \in C_{ℋ} \land C \in C_{ℋ}) \to (A \lor_{ℋ} B) \lor_{ℋ} C = A \lor_{ℋ} (B \lor_{ℋ} C)$