Metamath Proof Explorer

Theorem eqfunressuc

Description: Law for equality of restriction to successors. This is primarily useful when X is an ordinal, but it does not require that. (Contributed by Scott Fenton, 6-Dec-2021)

		Ref	Expression
	Assertion	eqfunressuc	$⊢ ((Fun F \land Fun G) \land {F ↾}_{X} = {G ↾}_{X} \land (X \in dom F \land X \in dom G \land F (X) = G (X))) \to {F ↾}_{suc X} = {G ↾}_{suc X}$

Proof

Step	Hyp	Ref	Expression
1		eqfunresadj	$⊢ ((Fun F \land Fun G) \land {F ↾}_{X} = {G ↾}_{X} \land (X \in dom F \land X \in dom G \land F (X) = G (X))) \to {F ↾}_{(X \cup \{X\})} = {G ↾}_{(X \cup \{X\})}$
2		df-suc	$⊢ suc X = X \cup \{X\}$
3	2	reseq2i	$⊢ {F ↾}_{suc X} = {F ↾}_{(X \cup \{X\})}$
4	2	reseq2i	$⊢ {G ↾}_{suc X} = {G ↾}_{(X \cup \{X\})}$
5	1 3 4	3eqtr4g	$⊢ ((Fun F \land Fun G) \land {F ↾}_{X} = {G ↾}_{X} \land (X \in dom F \land X \in dom G \land F (X) = G (X))) \to {F ↾}_{suc X} = {G ↾}_{suc X}$