Proof of Nuprl Lemma : fpf-normalize-ap

Step * 1 1 1 1 1 of Lemma fpf-normalize-ap

1. A : Type
2. eq : EqDecider(A)
3. B : A ─→ Type
4. x : A
5. G : Top@i
6. u : A
7. v : A List
8. snd(reduce(λx,f. <[x / filter(λa.(¬_b((eqof(eq) x a) ∨_bff));fst(f))]
, λa.if (eqof(eq) x a) ∨_bff then G x else (snd(f)) a fi

                    >;<[], λx.⋅>;v)) ~ reduce(λx,f,a. if (eqof(eq) x a) ∨_bff then G x else f a fi ;λx.⋅;v)

9. a : Base

⊢ reduce(λx,f,a. if (eqof(eq) x a) ∨_bff then G x else f a fi ;λx.⋅;v) a ~ reduce(λx,f,a. if (eqof(eq) x a) ∨_bff

                                                                                  then G x

                                                                                  else f a

                                                                                  fi ;λx.⋅;v)

BY
{ Trivial }

Latex:

1. A : Type 2. eq : EqDecider(A) 3. B : A {}\mrightarrow{} Type 4. x : A 5. G : Top@i 6. u : A 7. v : A List 8. snd(reduce(\mlambda{}x,f. <[x / filter(\mlambda{}a.(\mneg{}\msubb{}((eqof(eq) x a) \mvee{}\msubb{}ff));fst(f))] , \mlambda{}a.if (eqof(eq) x a) \mvee{}\msubb{}ff then G x else (snd(f)) a fi ><[], \mlambda{}x.\mcdot{}>v)) \msim{} reduce(\mlambda{}x,f,a. if (eqof(eq) x a) \mvee{}\msubb{}ff then G x else f a fi ;\mlambda{}\000Cx.\mcdot{};v) 9. a : Base \mvdash{} reduce(\mlambda{}x,f,a. if (eqof(eq) x a) \mvee{}\msubb{}ff then G x else f a fi ;\mlambda{}x.\mcdot{};v) a \msim{} reduce(\mlambda{}x,f,a. if (eqof(eq\000C) x a) \mvee{}\msubb{}ff then G x else f a fi ;\mlambda{}x.\mcdot{};v) a By Trivial Home Index