Metamath Proof Explorer

Theorem grupr

Description: A Grothendieck universe contains pairs derived from its elements. (Contributed by Mario Carneiro, 9-Jun-2013)

		Ref	Expression
	Assertion	grupr	$⊢ (U \in Univ \land A \in U \land B \in U) \to \{A, B\} \in U$

Proof

Step	Hyp	Ref	Expression
1		elgrug	$⊢ U \in Univ \to (U \in Univ \leftrightarrow (Tr U \land \forall x \in U (𝒫 x \in U \land \forall y \in U \{x, y\} \in U \land \forall y \in (U^{x}) ⋃ ran y \in U)))$
2	1	ibi	$⊢ U \in Univ \to (Tr U \land \forall x \in U (𝒫 x \in U \land \forall y \in U \{x, y\} \in U \land \forall y \in (U^{x}) ⋃ ran y \in U))$
3	2	simprd	$⊢ U \in Univ \to \forall x \in U (𝒫 x \in U \land \forall y \in U \{x, y\} \in U \land \forall y \in (U^{x}) ⋃ ran y \in U)$
4		preq2	$⊢ y = B \to \{x, y\} = \{x, B\}$
5	4	eleq1d	$⊢ y = B \to (\{x, y\} \in U \leftrightarrow \{x, B\} \in U)$
6	5	rspccv	$⊢ \forall y \in U \{x, y\} \in U \to (B \in U \to \{x, B\} \in U)$
7	6	3ad2ant2	$⊢ (𝒫 x \in U \land \forall y \in U \{x, y\} \in U \land \forall y \in (U^{x}) ⋃ ran y \in U) \to (B \in U \to \{x, B\} \in U)$
8	7	com12	$⊢ B \in U \to ((𝒫 x \in U \land \forall y \in U \{x, y\} \in U \land \forall y \in (U^{x}) ⋃ ran y \in U) \to \{x, B\} \in U)$
9	8	ralimdv	$⊢ B \in U \to (\forall x \in U (𝒫 x \in U \land \forall y \in U \{x, y\} \in U \land \forall y \in (U^{x}) ⋃ ran y \in U) \to \forall x \in U \{x, B\} \in U)$
10	3 9	syl5com	$⊢ U \in Univ \to (B \in U \to \forall x \in U \{x, B\} \in U)$
11		preq1	$⊢ x = A \to \{x, B\} = \{A, B\}$
12	11	eleq1d	$⊢ x = A \to (\{x, B\} \in U \leftrightarrow \{A, B\} \in U)$
13	12	rspccv	$⊢ \forall x \in U \{x, B\} \in U \to (A \in U \to \{A, B\} \in U)$
14	10 13	syl6	$⊢ U \in Univ \to (B \in U \to (A \in U \to \{A, B\} \in U))$
15	14	com23	$⊢ U \in Univ \to (A \in U \to (B \in U \to \{A, B\} \in U))$
16	15	3imp	$⊢ (U \in Univ \land A \in U \land B \in U) \to \{A, B\} \in U$