axcc4dom

Description: Relax the constraint on axcc4 to dominance instead of equinumerosity. (Contributed by Mario Carneiro, 18-Jan-2014)

	Ref	Expression
Hypotheses	axcc4dom.1	$⊢ A \in V$
	axcc4dom.2	$⊢ x = f (n) \to (φ \leftrightarrow ψ)$
Assertion	axcc4dom	$⊢ (N ≼ ω \land \forall n \in N \exists x \in A φ) \to \exists f (f : N ⟶ A \land \forall n \in N ψ)$

Proof

Step	Hyp	Ref	Expression
1		axcc4dom.1	$⊢ A \in V$
2		axcc4dom.2	$⊢ x = f (n) \to (φ \leftrightarrow ψ)$
3		brdom2	$⊢ N ≼ ω \leftrightarrow (N ≺ ω \lor N \approx ω)$
4		isfinite	$⊢ N \in Fin \leftrightarrow N ≺ ω$
5	2	ac6sfi	$⊢ (N \in Fin \land \forall n \in N \exists x \in A φ) \to \exists f (f : N ⟶ A \land \forall n \in N ψ)$
6	5	ex	$⊢ N \in Fin \to (\forall n \in N \exists x \in A φ \to \exists f (f : N ⟶ A \land \forall n \in N ψ))$
7	4 6	sylbir	$⊢ N ≺ ω \to (\forall n \in N \exists x \in A φ \to \exists f (f : N ⟶ A \land \forall n \in N ψ))$
8		raleq	$⊢ N = if (N \approx ω, N, ω) \to (\forall n \in N \exists x \in A φ \leftrightarrow \forall n \in if (N \approx ω, N, ω) \exists x \in A φ)$
9		feq2	$⊢ N = if (N \approx ω, N, ω) \to (f : N ⟶ A \leftrightarrow f : if (N \approx ω, N, ω) ⟶ A)$
10		raleq	$⊢ N = if (N \approx ω, N, ω) \to (\forall n \in N ψ \leftrightarrow \forall n \in if (N \approx ω, N, ω) ψ)$
11	9 10	anbi12d	$⊢ N = if (N \approx ω, N, ω) \to ((f : N ⟶ A \land \forall n \in N ψ) \leftrightarrow (f : if (N \approx ω, N, ω) ⟶ A \land \forall n \in if (N \approx ω, N, ω) ψ))$
12	11	exbidv	$⊢ N = if (N \approx ω, N, ω) \to (\exists f (f : N ⟶ A \land \forall n \in N ψ) \leftrightarrow \exists f (f : if (N \approx ω, N, ω) ⟶ A \land \forall n \in if (N \approx ω, N, ω) ψ))$
13	8 12	imbi12d	$⊢ N = if (N \approx ω, N, ω) \to ((\forall n \in N \exists x \in A φ \to \exists f (f : N ⟶ A \land \forall n \in N ψ)) \leftrightarrow (\forall n \in if (N \approx ω, N, ω) \exists x \in A φ \to \exists f (f : if (N \approx ω, N, ω) ⟶ A \land \forall n \in if (N \approx ω, N, ω) ψ)))$
14		breq1	$⊢ N = if (N \approx ω, N, ω) \to (N \approx ω \leftrightarrow if (N \approx ω, N, ω) \approx ω)$
15		breq1	$⊢ ω = if (N \approx ω, N, ω) \to (ω \approx ω \leftrightarrow if (N \approx ω, N, ω) \approx ω)$
16		omex	$⊢ ω \in V$
17	16	enref	$⊢ ω \approx ω$
18	14 15 17	elimhyp	$⊢ if (N \approx ω, N, ω) \approx ω$
19	1 18 2	axcc4	$⊢ \forall n \in if (N \approx ω, N, ω) \exists x \in A φ \to \exists f (f : if (N \approx ω, N, ω) ⟶ A \land \forall n \in if (N \approx ω, N, ω) ψ)$
20	13 19	dedth	$⊢ N \approx ω \to (\forall n \in N \exists x \in A φ \to \exists f (f : N ⟶ A \land \forall n \in N ψ))$
21	7 20	jaoi	$⊢ (N ≺ ω \lor N \approx ω) \to (\forall n \in N \exists x \in A φ \to \exists f (f : N ⟶ A \land \forall n \in N ψ))$
22	3 21	sylbi	$⊢ N ≼ ω \to (\forall n \in N \exists x \in A φ \to \exists f (f : N ⟶ A \land \forall n \in N ψ))$
23	22	imp	$⊢ (N ≼ ω \land \forall n \in N \exists x \in A φ) \to \exists f (f : N ⟶ A \land \forall n \in N ψ)$

Metamath Proof Explorer

Theorem axcc4dom

Proof