Proof of Nuprl Lemma : fpf-normalize-ap

Step * of Lemma fpf-normalize-ap

∀[A:Type]. ∀[eq:EqDecider(A)]. ∀[B:A ⟶ Type]. ∀[g:x:A fp-> B[x]]. ∀[x:A].
  fpf-normalize(eq;g)(x) = g(x) ∈ B[x] supposing ↑x ∈ dom(g)
BY
{ ((UnivCD THENA Auto)
   THEN DVar `g'
   THEN RepUR ``fpf-normalize fpf-ap fpf-dom fpf-cap
                fpf-single fpf-join fpf-empty`` 0⋅) }

1
1. A : Type
2. eq : EqDecider(A)
3. B : A ⟶ Type
4. d : A List
5. g1 : x:{x:A| (x ∈ d)}  ⟶ B[x]
6. x : A
7. ↑x ∈ dom(<d, g1>)

⊢ ((snd(reduce(λx,f. <[x / filter(λa.(¬_b((eq x a) ∨_bff));fst(f))], λa.if (eq x a) ∨_bff then g1 x else (snd(f)) a fi >;<[\000C]

                                                                                                                 , λx.⋅

                                                                                                                 >;d)))

x)
= (g1 x)
∈ B[x]

Latex:

Latex:
\mforall{}[A:Type]. \mforall{}[eq:EqDecider(A)]. \mforall{}[B:A {}\mrightarrow{} Type]. \mforall{}[g:x:A fp-> B[x]]. \mforall{}[x:A]. fpf-normalize(eq;g)(x) = g(x) supposing \muparrow{}x \mmember{} dom(g) By Latex: ((UnivCD THENA Auto) THEN DVar `g' THEN RepUR ``fpf-normalize fpf-ap fpf-dom fpf-cap fpf-single fpf-join fpf-empty`` 0\mcdot{}) Home Index