Metamath Proof Explorer


Theorem bnj1500

Description: Well-founded recursion, part 2 of 3. The proof has been taken from Chapter 4 of Don Monk's notes on Set Theory. See http://euclid.colorado.edu/~monkd/setth.pdf . (Contributed by Jonathan Ben-Naim, 3-Jun-2011) (New usage is discouraged.)

Ref Expression
Hypotheses bnj1500.1 B = d | d A x d pred x A R d
bnj1500.2 Y = x f pred x A R
bnj1500.3 C = f | d B f Fn d x d f x = G Y
bnj1500.4 F = C
Assertion bnj1500 R FrSe A x A F x = G x F pred x A R

Proof

Step Hyp Ref Expression
1 bnj1500.1 B = d | d A x d pred x A R d
2 bnj1500.2 Y = x f pred x A R
3 bnj1500.3 C = f | d B f Fn d x d f x = G Y
4 bnj1500.4 F = C
5 biid R FrSe A x A R FrSe A x A
6 biid R FrSe A x A f C x dom f R FrSe A x A f C x dom f
7 biid R FrSe A x A f C x dom f d B dom f = d R FrSe A x A f C x dom f d B dom f = d
8 1 2 3 4 5 6 7 bnj1501 R FrSe A x A F x = G x F pred x A R