Metamath Proof Explorer

Theorem tr0elw

Description: Every nonempty transitive set contains the empty set (/) as an element, a consequence of Regularity. If we assume Transitive Containment, then we can omit the A e. V hypothesis, see tr0el . (Contributed by Matthew House, 6-Apr-2026)

		Ref	Expression
	Assertion	tr0elw	$⊢ (A \in V \land A \neq \emptyset \land Tr A) \to \emptyset \in A$

Proof

Step	Hyp	Ref	Expression
1		zfreg	$⊢ (A \in V \land A \neq \emptyset) \to \exists x \in A x \cap A = \emptyset$
2		trss	$⊢ Tr A \to (x \in A \to x \subseteq A)$
3	2	imp	$⊢ (Tr A \land x \in A) \to x \subseteq A$
4		dfss	$⊢ x \subseteq A \leftrightarrow x = x \cap A$
5		eqeq2	$⊢ x \cap A = \emptyset \to (x = x \cap A \leftrightarrow x = \emptyset)$
6	4 5	bitrid	$⊢ x \cap A = \emptyset \to (x \subseteq A \leftrightarrow x = \emptyset)$
7	3 6	syl5ibcom	$⊢ (Tr A \land x \in A) \to (x \cap A = \emptyset \to x = \emptyset)$
8		eleq1	$⊢ x = \emptyset \to (x \in A \leftrightarrow \emptyset \in A)$
9	8	biimpcd	$⊢ x \in A \to (x = \emptyset \to \emptyset \in A)$
10	9	adantl	$⊢ (Tr A \land x \in A) \to (x = \emptyset \to \emptyset \in A)$
11	7 10	syld	$⊢ (Tr A \land x \in A) \to (x \cap A = \emptyset \to \emptyset \in A)$
12	11	rexlimdva	$⊢ Tr A \to (\exists x \in A x \cap A = \emptyset \to \emptyset \in A)$
13	1 12	syl5com	$⊢ (A \in V \land A \neq \emptyset) \to (Tr A \to \emptyset \in A)$
14	13	3impia	$⊢ (A \in V \land A \neq \emptyset \land Tr A) \to \emptyset \in A$