tz6.26

Description: All nonempty subclasses of a class having a well-ordered set-like relation have minimal elements for that relation. Proposition 6.26 of TakeutiZaring p. 31. (Contributed by Scott Fenton, 29-Jan-2011) (Revised by Mario Carneiro, 26-Jun-2015)

		Ref	Expression
	Assertion	tz6.26	$⊢ ((R We A \land R Se A) \land (B \subseteq A \land B \neq \emptyset)) \to \exists y \in B Pred (R, B, y) = \emptyset$

Proof

Step	Hyp	Ref	Expression
1		wereu2	$⊢ ((R We A \land R Se A) \land (B \subseteq A \land B \neq \emptyset)) \to \exists! y \in B \forall x \in B \neg x R y$
2		reurex	$⊢ \exists! y \in B \forall x \in B \neg x R y \to \exists y \in B \forall x \in B \neg x R y$
3	1 2	syl	$⊢ ((R We A \land R Se A) \land (B \subseteq A \land B \neq \emptyset)) \to \exists y \in B \forall x \in B \neg x R y$
4		rabeq0	$⊢ \{x \in B \| x R y\} = \emptyset \leftrightarrow \forall x \in B \neg x R y$
5		dfrab3	$⊢ \{x \in B \| x R y\} = B \cap \{x \| x R y\}$
6		vex	$⊢ y \in V$
7	6	dfpred2	$⊢ Pred (R, B, y) = B \cap \{x \| x R y\}$
8	5 7	eqtr4i	$⊢ \{x \in B \| x R y\} = Pred (R, B, y)$
9	8	eqeq1i	$⊢ \{x \in B \| x R y\} = \emptyset \leftrightarrow Pred (R, B, y) = \emptyset$
10	4 9	bitr3i	$⊢ \forall x \in B \neg x R y \leftrightarrow Pred (R, B, y) = \emptyset$
11	10	rexbii	$⊢ \exists y \in B \forall x \in B \neg x R y \leftrightarrow \exists y \in B Pred (R, B, y) = \emptyset$
12	3 11	sylib	$⊢ ((R We A \land R Se A) \land (B \subseteq A \land B \neq \emptyset)) \to \exists y \in B Pred (R, B, y) = \emptyset$

Metamath Proof Explorer

Theorem tz6.26

Proof