gchaleph2

Description: If ( alephA ) and ( alephsuc A ) are GCH-sets, then the successor aleph ( alephsuc A ) is equinumerous to the powerset of ( alephA ) . (Contributed by Mario Carneiro, 31-May-2015)

		Ref	Expression
	Assertion	gchaleph2	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to ℵ (suc A) \approx 𝒫 ℵ (A)$

Proof

Step	Hyp	Ref	Expression
1		harcl	$⊢ har (ℵ (A)) \in On$
2		alephon	$⊢ ℵ (A) \in On$
3		onenon	$⊢ ℵ (A) \in On \to ℵ (A) \in dom card$
4		harsdom	$⊢ ℵ (A) \in dom card \to ℵ (A) ≺ har (ℵ (A))$
5	2 3 4	mp2b	$⊢ ℵ (A) ≺ har (ℵ (A))$
6		simp1	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to A \in On$
7		alephgeom	$⊢ A \in On \leftrightarrow ω \subseteq ℵ (A)$
8	6 7	sylib	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to ω \subseteq ℵ (A)$
9		ssdomg	$⊢ ℵ (A) \in On \to (ω \subseteq ℵ (A) \to ω ≼ ℵ (A))$
10	2 8 9	mpsyl	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to ω ≼ ℵ (A)$
11		simp2	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to ℵ (A) \in GCH$
12		alephsuc	$⊢ A \in On \to ℵ (suc A) = har (ℵ (A))$
13	6 12	syl	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to ℵ (suc A) = har (ℵ (A))$
14		simp3	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to ℵ (suc A) \in GCH$
15	13 14	eqeltrrd	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to har (ℵ (A)) \in GCH$
16		gchpwdom	$⊢ (ω ≼ ℵ (A) \land ℵ (A) \in GCH \land har (ℵ (A)) \in GCH) \to (ℵ (A) ≺ har (ℵ (A)) \leftrightarrow 𝒫 ℵ (A) ≼ har (ℵ (A)))$
17	10 11 15 16	syl3anc	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to (ℵ (A) ≺ har (ℵ (A)) \leftrightarrow 𝒫 ℵ (A) ≼ har (ℵ (A)))$
18	5 17	mpbii	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to 𝒫 ℵ (A) ≼ har (ℵ (A))$
19		ondomen	$⊢ (har (ℵ (A)) \in On \land 𝒫 ℵ (A) ≼ har (ℵ (A))) \to 𝒫 ℵ (A) \in dom card$
20	1 18 19	sylancr	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to 𝒫 ℵ (A) \in dom card$
21		gchaleph	$⊢ (A \in On \land ℵ (A) \in GCH \land 𝒫 ℵ (A) \in dom card) \to ℵ (suc A) \approx 𝒫 ℵ (A)$
22	20 21	syld3an3	$⊢ (A \in On \land ℵ (A) \in GCH \land ℵ (suc A) \in GCH) \to ℵ (suc A) \approx 𝒫 ℵ (A)$

Metamath Proof Explorer

Theorem gchaleph2

Proof