Metamath Proof Explorer

Theorem noreson

Description: The restriction of a surreal to an ordinal is still a surreal. (Contributed by Scott Fenton, 4-Sep-2011)

		Ref	Expression
	Assertion	noreson	$⊢ (A \in No \land B \in On) \to {A ↾}_{B} \in No$

Proof

Step	Hyp	Ref	Expression
1		elno	$⊢ A \in No \leftrightarrow \exists x \in On A : x ⟶ \{1_{𝑜}, 2_{𝑜}\}$
2		onin	$⊢ (x \in On \land B \in On) \to x \cap B \in On$
3		fresin	$⊢ A : x ⟶ \{1_{𝑜}, 2_{𝑜}\} \to ({A ↾}_{B}) : x \cap B ⟶ \{1_{𝑜}, 2_{𝑜}\}$
4		feq2	$⊢ y = x \cap B \to (({A ↾}_{B}) : y ⟶ \{1_{𝑜}, 2_{𝑜}\} \leftrightarrow ({A ↾}_{B}) : x \cap B ⟶ \{1_{𝑜}, 2_{𝑜}\})$
5	4	rspcev	$⊢ (x \cap B \in On \land ({A ↾}_{B}) : x \cap B ⟶ \{1_{𝑜}, 2_{𝑜}\}) \to \exists y \in On ({A ↾}_{B}) : y ⟶ \{1_{𝑜}, 2_{𝑜}\}$
6	2 3 5	syl2an	$⊢ ((x \in On \land B \in On) \land A : x ⟶ \{1_{𝑜}, 2_{𝑜}\}) \to \exists y \in On ({A ↾}_{B}) : y ⟶ \{1_{𝑜}, 2_{𝑜}\}$
7	6	an32s	$⊢ ((x \in On \land A : x ⟶ \{1_{𝑜}, 2_{𝑜}\}) \land B \in On) \to \exists y \in On ({A ↾}_{B}) : y ⟶ \{1_{𝑜}, 2_{𝑜}\}$
8	7	ex	$⊢ (x \in On \land A : x ⟶ \{1_{𝑜}, 2_{𝑜}\}) \to (B \in On \to \exists y \in On ({A ↾}_{B}) : y ⟶ \{1_{𝑜}, 2_{𝑜}\})$
9	8	rexlimiva	$⊢ \exists x \in On A : x ⟶ \{1_{𝑜}, 2_{𝑜}\} \to (B \in On \to \exists y \in On ({A ↾}_{B}) : y ⟶ \{1_{𝑜}, 2_{𝑜}\})$
10	9	imp	$⊢ (\exists x \in On A : x ⟶ \{1_{𝑜}, 2_{𝑜}\} \land B \in On) \to \exists y \in On ({A ↾}_{B}) : y ⟶ \{1_{𝑜}, 2_{𝑜}\}$
11	1 10	sylanb	$⊢ (A \in No \land B \in On) \to \exists y \in On ({A ↾}_{B}) : y ⟶ \{1_{𝑜}, 2_{𝑜}\}$
12		elno	$⊢ {A ↾}_{B} \in No \leftrightarrow \exists y \in On ({A ↾}_{B}) : y ⟶ \{1_{𝑜}, 2_{𝑜}\}$
13	11 12	sylibr	$⊢ (A \in No \land B \in On) \to {A ↾}_{B} \in No$