acneq

Description: Equality theorem for the choice set function. (Contributed by Mario Carneiro, 31-Aug-2015)

		Ref	Expression
	Assertion	acneq	$⊢ A = C \to \underline{AC} A = \underline{AC} C$

Step	Hyp	Ref	Expression
1		eleq1	$⊢ A = C \to (A \in V \leftrightarrow C \in V)$
2		oveq2	$⊢ A = C \to {(𝒫 x ∖ \{\emptyset\})}^{A} = {(𝒫 x ∖ \{\emptyset\})}^{C}$
3		raleq	$⊢ A = C \to (\forall y \in A g (y) \in f (y) \leftrightarrow \forall y \in C g (y) \in f (y))$
4	3	exbidv	$⊢ A = C \to (\exists g \forall y \in A g (y) \in f (y) \leftrightarrow \exists g \forall y \in C g (y) \in f (y))$
5	2 4	raleqbidv	$⊢ A = C \to (\forall f \in ({(𝒫 x ∖ \{\emptyset\})}^{A}) \exists g \forall y \in A g (y) \in f (y) \leftrightarrow \forall f \in ({(𝒫 x ∖ \{\emptyset\})}^{C}) \exists g \forall y \in C g (y) \in f (y))$
6	1 5	anbi12d	$⊢ A = C \to ((A \in V \land \forall f \in ({(𝒫 x ∖ \{\emptyset\})}^{A}) \exists g \forall y \in A g (y) \in f (y)) \leftrightarrow (C \in V \land \forall f \in ({(𝒫 x ∖ \{\emptyset\})}^{C}) \exists g \forall y \in C g (y) \in f (y)))$
7	6	abbidv	$⊢ A = C \to \{x \| (A \in V \land \forall f \in ({(𝒫 x ∖ \{\emptyset\})}^{A}) \exists g \forall y \in A g (y) \in f (y))\} = \{x \| (C \in V \land \forall f \in ({(𝒫 x ∖ \{\emptyset\})}^{C}) \exists g \forall y \in C g (y) \in f (y))\}$
8		df-acn	$⊢ \underline{AC} A = \{x \| (A \in V \land \forall f \in ({(𝒫 x ∖ \{\emptyset\})}^{A}) \exists g \forall y \in A g (y) \in f (y))\}$
9		df-acn	$⊢ \underline{AC} C = \{x \| (C \in V \land \forall f \in ({(𝒫 x ∖ \{\emptyset\})}^{C}) \exists g \forall y \in C g (y) \in f (y))\}$
10	7 8 9	3eqtr4g	$⊢ A = C \to \underline{AC} A = \underline{AC} C$

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