pjoml4i

Description: Variation of orthomodular law. (Contributed by NM, 6-Dec-2000) (New usage is discouraged.)

	Ref	Expression
Hypotheses	pjoml2.1	$⊢ A \in C_{ℋ}$
	pjoml2.2	$⊢ B \in C_{ℋ}$
Assertion	pjoml4i	$⊢ A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B))) = A \lor_{ℋ} B$

Proof

Step	Hyp	Ref	Expression
1		pjoml2.1	$⊢ A \in C_{ℋ}$
2		pjoml2.2	$⊢ B \in C_{ℋ}$
3		inss1	$⊢ B \cap (⊥ (A) \lor_{ℋ} ⊥ (B)) \subseteq B$
4	1	choccli	$⊢ ⊥ (A) \in C_{ℋ}$
5	2	choccli	$⊢ ⊥ (B) \in C_{ℋ}$
6	4 5	chjcli	$⊢ ⊥ (A) \lor_{ℋ} ⊥ (B) \in C_{ℋ}$
7	2 6	chincli	$⊢ B \cap (⊥ (A) \lor_{ℋ} ⊥ (B)) \in C_{ℋ}$
8	7 2 1	chlej2i	$⊢ B \cap (⊥ (A) \lor_{ℋ} ⊥ (B)) \subseteq B \to A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B))) \subseteq A \lor_{ℋ} B$
9	3 8	ax-mp	$⊢ A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B))) \subseteq A \lor_{ℋ} B$
10	1 7	chub1i	$⊢ A \subseteq A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B)))$
11	1 2	chdmm1i	$⊢ ⊥ (A \cap B) = ⊥ (A) \lor_{ℋ} ⊥ (B)$
12	11	ineq1i	$⊢ ⊥ (A \cap B) \cap B = (⊥ (A) \lor_{ℋ} ⊥ (B)) \cap B$
13		incom	$⊢ (⊥ (A) \lor_{ℋ} ⊥ (B)) \cap B = B \cap (⊥ (A) \lor_{ℋ} ⊥ (B))$
14	12 13	eqtri	$⊢ ⊥ (A \cap B) \cap B = B \cap (⊥ (A) \lor_{ℋ} ⊥ (B))$
15	14	oveq2i	$⊢ (A \cap B) \lor_{ℋ} (⊥ (A \cap B) \cap B) = (A \cap B) \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B)))$
16		inss2	$⊢ A \cap B \subseteq B$
17	1 2	chincli	$⊢ A \cap B \in C_{ℋ}$
18	17 2	pjoml2i	$⊢ A \cap B \subseteq B \to (A \cap B) \lor_{ℋ} (⊥ (A \cap B) \cap B) = B$
19	16 18	ax-mp	$⊢ (A \cap B) \lor_{ℋ} (⊥ (A \cap B) \cap B) = B$
20	15 19	eqtr3i	$⊢ (A \cap B) \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B))) = B$
21		inss1	$⊢ A \cap B \subseteq A$
22	17 1 7	chlej1i	$⊢ A \cap B \subseteq A \to (A \cap B) \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B))) \subseteq A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B)))$
23	21 22	ax-mp	$⊢ (A \cap B) \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B))) \subseteq A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B)))$
24	20 23	eqsstrri	$⊢ B \subseteq A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B)))$
25	1 7	chjcli	$⊢ A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B))) \in C_{ℋ}$
26	1 2 25	chlubii	$⊢ (A \subseteq A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B))) \land B \subseteq A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B)))) \to A \lor_{ℋ} B \subseteq A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B)))$
27	10 24 26	mp2an	$⊢ A \lor_{ℋ} B \subseteq A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B)))$
28	9 27	eqssi	$⊢ A \lor_{ℋ} (B \cap (⊥ (A) \lor_{ℋ} ⊥ (B))) = A \lor_{ℋ} B$

Metamath Proof Explorer

Theorem pjoml4i

Proof