ax-reg

Description: Axiom of Regularity. An axiom of Zermelo-Fraenkel set theory. Also called the Axiom of Foundation. A rather non-intuitive axiom that denies more than it asserts, it states (in the form of zfreg ) that every nonempty set contains a set disjoint from itself. One consequence is that it denies the existence of a set containing itself ( elirrv ). A stronger version that works for proper classes is proved as zfregs . (Contributed by NM, 14-Aug-1993)

		Ref	Expression
	Assertion	ax-reg	$⊢ \exists y y \in x \to \exists y (y \in x \land \forall z (z \in y \to \neg z \in x))$

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		vy	$setvar y$
1	0	cv	$setvar y$
2		vx	$setvar x$
3	2	cv	$setvar x$
4	1 3	wcel	$wff y \in x$
5	4 0	wex	$wff \exists y y \in x$
6		vz	$setvar z$
7	6	cv	$setvar z$
8	7 1	wcel	$wff z \in y$
9	7 3	wcel	$wff z \in x$
10	9	wn	$wff \neg z \in x$
11	8 10	wi	$wff (z \in y \to \neg z \in x)$
12	11 6	wal	$wff \forall z (z \in y \to \neg z \in x)$
13	4 12	wa	$wff (y \in x \land \forall z (z \in y \to \neg z \in x))$
14	13 0	wex	$wff \exists y (y \in x \land \forall z (z \in y \to \neg z \in x))$
15	5 14	wi	$wff (\exists y y \in x \to \exists y (y \in x \land \forall z (z \in y \to \neg z \in x)))$

Metamath Proof Explorer

Axiom ax-reg

Detailed syntax breakdown