2atjlej

Description: Two atoms are different if their join majorizes the join of two different atoms. (Contributed by NM, 4-Jun-2013)

	Ref	Expression
Hypotheses	ps1.l	$⊢ \underset{˙}{\leq} = \leq_{K}$
	ps1.j	$⊢ \underset{˙}{\lor} = join (K)$
	ps1.a	$⊢ A = Atoms (K)$
Assertion	2atjlej	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to R \neq S$

Proof

Step	Hyp	Ref	Expression
1		ps1.l	$⊢ \underset{˙}{\leq} = \leq_{K}$
2		ps1.j	$⊢ \underset{˙}{\lor} = join (K)$
3		ps1.a	$⊢ A = Atoms (K)$
4		simp33	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S)$
5		simp1	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to K \in HL$
6		simp21	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to P \in A$
7		simp22	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to Q \in A$
8		simp23	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to P \neq Q$
9		simp31	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to R \in A$
10		simp32	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to S \in A$
11	1 2 3	ps-1	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A)) \to ((P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S) \leftrightarrow P \underset{˙}{\lor} Q = R \underset{˙}{\lor} S)$
12	5 6 7 8 9 10 11	syl132anc	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to ((P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S) \leftrightarrow P \underset{˙}{\lor} Q = R \underset{˙}{\lor} S)$
13	4 12	mpbid	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to P \underset{˙}{\lor} Q = R \underset{˙}{\lor} S$
14	2 3	lnnat	$⊢ (K \in HL \land P \in A \land Q \in A) \to (P \neq Q \leftrightarrow \neg P \underset{˙}{\lor} Q \in A)$
15	5 6 7 14	syl3anc	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to (P \neq Q \leftrightarrow \neg P \underset{˙}{\lor} Q \in A)$
16	8 15	mpbid	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to \neg P \underset{˙}{\lor} Q \in A$
17	13 16	eqneltrrd	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to \neg R \underset{˙}{\lor} S \in A$
18	2 3	lnnat	$⊢ (K \in HL \land R \in A \land S \in A) \to (R \neq S \leftrightarrow \neg R \underset{˙}{\lor} S \in A)$
19	5 9 10 18	syl3anc	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to (R \neq S \leftrightarrow \neg R \underset{˙}{\lor} S \in A)$
20	17 19	mpbird	$⊢ (K \in HL \land (P \in A \land Q \in A \land P \neq Q) \land (R \in A \land S \in A \land (P \underset{˙}{\lor} Q) \underset{˙}{\leq} (R \underset{˙}{\lor} S))) \to R \neq S$

Metamath Proof Explorer

Theorem 2atjlej

Proof