relwf

Description: A relation is a well-founded set iff its domain and range are. (Contributed by Eric Schmidt, 29-Sep-2025)

		Ref	Expression
	Assertion	relwf	$⊢ Rel R \to (R \in ⋃ R_{1} [On] \leftrightarrow (dom R \in ⋃ R_{1} [On] \land ran R \in ⋃ R_{1} [On]))$

Step	Hyp	Ref	Expression
1		dmwf	$⊢ R \in ⋃ R_{1} [On] \to dom R \in ⋃ R_{1} [On]$
2		rnwf	$⊢ R \in ⋃ R_{1} [On] \to ran R \in ⋃ R_{1} [On]$
3	1 2	jca	$⊢ R \in ⋃ R_{1} [On] \to (dom R \in ⋃ R_{1} [On] \land ran R \in ⋃ R_{1} [On])$
4		xpwf	$⊢ (dom R \in ⋃ R_{1} [On] \land ran R \in ⋃ R_{1} [On]) \to dom R \times ran R \in ⋃ R_{1} [On]$
5		relssdmrn	$⊢ Rel R \to R \subseteq dom R \times ran R$
6		sswf	$⊢ (dom R \times ran R \in ⋃ R_{1} [On] \land R \subseteq dom R \times ran R) \to R \in ⋃ R_{1} [On]$
7	5 6	sylan2	$⊢ (dom R \times ran R \in ⋃ R_{1} [On] \land Rel R) \to R \in ⋃ R_{1} [On]$
8	7	expcom	$⊢ Rel R \to (dom R \times ran R \in ⋃ R_{1} [On] \to R \in ⋃ R_{1} [On])$
9	4 8	syl5	$⊢ Rel R \to ((dom R \in ⋃ R_{1} [On] \land ran R \in ⋃ R_{1} [On]) \to R \in ⋃ R_{1} [On])$
10	3 9	impbid2	$⊢ Rel R \to (R \in ⋃ R_{1} [On] \leftrightarrow (dom R \in ⋃ R_{1} [On] \land ran R \in ⋃ R_{1} [On]))$

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