Metamath Proof Explorer

Theorem nfunsn

Description: If the restriction of a class to a singleton is not a function, then its value is the empty set. (An artifact of our function value definition.) (Contributed by NM, 8-Aug-2010) (Proof shortened by Andrew Salmon, 22-Oct-2011)

		Ref	Expression
	Assertion	nfunsn	$⊢ \neg Fun ({F ↾}_{\{A\}}) \to F (A) = \emptyset$

Proof

Step	Hyp	Ref	Expression
1		eumo	$⊢ \exists! y A F y \to \exists^{*} y A F y$
2		vex	$⊢ y \in V$
3	2	brresi	$⊢ x ({F ↾}_{\{A\}}) y \leftrightarrow (x \in \{A\} \land x F y)$
4		velsn	$⊢ x \in \{A\} \leftrightarrow x = A$
5		breq1	$⊢ x = A \to (x F y \leftrightarrow A F y)$
6	4 5	sylbi	$⊢ x \in \{A\} \to (x F y \leftrightarrow A F y)$
7	6	biimpa	$⊢ (x \in \{A\} \land x F y) \to A F y$
8	3 7	sylbi	$⊢ x ({F ↾}_{\{A\}}) y \to A F y$
9	8	moimi	$⊢ \exists^{} y A F y \to \exists^{} y x ({F ↾}_{\{A\}}) y$
10	1 9	syl	$⊢ \exists! y A F y \to \exists^{*} y x ({F ↾}_{\{A\}}) y$
11		tz6.12-2	$⊢ \neg \exists! y A F y \to F (A) = \emptyset$
12	10 11	nsyl4	$⊢ \neg F (A) = \emptyset \to \exists^{*} y x ({F ↾}_{\{A\}}) y$
13	12	alrimiv	$⊢ \neg F (A) = \emptyset \to \forall x \exists^{*} y x ({F ↾}_{\{A\}}) y$
14		relres	$⊢ Rel ({F ↾}_{\{A\}})$
15	13 14	jctil	$⊢ \neg F (A) = \emptyset \to (Rel ({F ↾}_{\{A\}}) \land \forall x \exists^{*} y x ({F ↾}_{\{A\}}) y)$
16		dffun6	$⊢ Fun ({F ↾}_{\{A\}}) \leftrightarrow (Rel ({F ↾}_{\{A\}}) \land \forall x \exists^{*} y x ({F ↾}_{\{A\}}) y)$
17	15 16	sylibr	$⊢ \neg F (A) = \emptyset \to Fun ({F ↾}_{\{A\}})$
18	17	con1i	$⊢ \neg Fun ({F ↾}_{\{A\}}) \to F (A) = \emptyset$