oecan

Description: Left cancellation law for ordinal exponentiation. (Contributed by NM, 6-Jan-2005) (Revised by Mario Carneiro, 24-May-2015)

		Ref	Expression
	Assertion	oecan	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to (A ↑_{𝑜} B = A ↑_{𝑜} C \leftrightarrow B = C)$

Proof

Step	Hyp	Ref	Expression
1		oeordi	$⊢ (C \in On \land A \in (On ∖ 2_{𝑜})) \to (B \in C \to A ↑_{𝑜} B \in (A ↑_{𝑜} C))$
2	1	ancoms	$⊢ (A \in (On ∖ 2_{𝑜}) \land C \in On) \to (B \in C \to A ↑_{𝑜} B \in (A ↑_{𝑜} C))$
3	2	3adant2	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to (B \in C \to A ↑_{𝑜} B \in (A ↑_{𝑜} C))$
4		oeordi	$⊢ (B \in On \land A \in (On ∖ 2_{𝑜})) \to (C \in B \to A ↑_{𝑜} C \in (A ↑_{𝑜} B))$
5	4	ancoms	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On) \to (C \in B \to A ↑_{𝑜} C \in (A ↑_{𝑜} B))$
6	5	3adant3	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to (C \in B \to A ↑_{𝑜} C \in (A ↑_{𝑜} B))$
7	3 6	orim12d	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to ((B \in C \lor C \in B) \to (A ↑_{𝑜} B \in (A ↑_{𝑜} C) \lor A ↑_{𝑜} C \in (A ↑_{𝑜} B)))$
8	7	con3d	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to (\neg (A ↑_{𝑜} B \in (A ↑_{𝑜} C) \lor A ↑_{𝑜} C \in (A ↑_{𝑜} B)) \to \neg (B \in C \lor C \in B))$
9		eldifi	$⊢ A \in (On ∖ 2_{𝑜}) \to A \in On$
10	9	3ad2ant1	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to A \in On$
11		simp2	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to B \in On$
12		oecl	$⊢ (A \in On \land B \in On) \to A ↑_{𝑜} B \in On$
13	10 11 12	syl2anc	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to A ↑_{𝑜} B \in On$
14		simp3	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to C \in On$
15		oecl	$⊢ (A \in On \land C \in On) \to A ↑_{𝑜} C \in On$
16	10 14 15	syl2anc	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to A ↑_{𝑜} C \in On$
17		eloni	$⊢ A ↑_{𝑜} B \in On \to Ord (A ↑_{𝑜} B)$
18		eloni	$⊢ A ↑_{𝑜} C \in On \to Ord (A ↑_{𝑜} C)$
19		ordtri3	$⊢ (Ord (A ↑_{𝑜} B) \land Ord (A ↑_{𝑜} C)) \to (A ↑_{𝑜} B = A ↑_{𝑜} C \leftrightarrow \neg (A ↑_{𝑜} B \in (A ↑_{𝑜} C) \lor A ↑_{𝑜} C \in (A ↑_{𝑜} B)))$
20	17 18 19	syl2an	$⊢ (A ↑_{𝑜} B \in On \land A ↑_{𝑜} C \in On) \to (A ↑_{𝑜} B = A ↑_{𝑜} C \leftrightarrow \neg (A ↑_{𝑜} B \in (A ↑_{𝑜} C) \lor A ↑_{𝑜} C \in (A ↑_{𝑜} B)))$
21	13 16 20	syl2anc	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to (A ↑_{𝑜} B = A ↑_{𝑜} C \leftrightarrow \neg (A ↑_{𝑜} B \in (A ↑_{𝑜} C) \lor A ↑_{𝑜} C \in (A ↑_{𝑜} B)))$
22		eloni	$⊢ B \in On \to Ord B$
23		eloni	$⊢ C \in On \to Ord C$
24		ordtri3	$⊢ (Ord B \land Ord C) \to (B = C \leftrightarrow \neg (B \in C \lor C \in B))$
25	22 23 24	syl2an	$⊢ (B \in On \land C \in On) \to (B = C \leftrightarrow \neg (B \in C \lor C \in B))$
26	25	3adant1	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to (B = C \leftrightarrow \neg (B \in C \lor C \in B))$
27	8 21 26	3imtr4d	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to (A ↑_{𝑜} B = A ↑_{𝑜} C \to B = C)$
28		oveq2	$⊢ B = C \to A ↑_{𝑜} B = A ↑_{𝑜} C$
29	27 28	impbid1	$⊢ (A \in (On ∖ 2_{𝑜}) \land B \in On \land C \in On) \to (A ↑_{𝑜} B = A ↑_{𝑜} C \leftrightarrow B = C)$

Metamath Proof Explorer

Theorem oecan

Proof