Proof of Nuprl Lemma : fpf-split

Step * of Lemma fpf-split

∀[A:Type]
  ∀eq:EqDecider(A)
    ∀[B:A ⟶ Type]
      ∀f:a:A fp-> B[a]
        ∀[P:A ⟶ ℙ]
          ((∀a:A. Dec(P[a]))
          ⇒ (∃fp,fnp:a:A fp-> B[a]
               ((f ⊆ fp ⊕ fnp ∧ fp ⊕ fnp ⊆ f)

               ∧ ((∀a:A. P[a] supposing ↑a ∈ dom(fp)) ∧ (∀a:A. ¬P[a] supposing ↑a ∈ dom(fnp)))

               ∧ fpf-domain(fp) ⊆ fpf-domain(f)
               ∧ fpf-domain(fnp) ⊆ fpf-domain(f))))
BY
{ (Auto THEN DVar `f' THEN RenameVar `dec' (-1)) }

1
1. [A] : Type
2. eq : EqDecider(A)@i
3. [B] : A ⟶ Type
4. d : A List@i
5. f1 : a:{a:A| (a ∈ d)}  ⟶ B[a]@i
6. [P] : A ⟶ ℙ
7. dec : ∀a:A. Dec(P[a])@i
⊢ ∃fp,fnp:a:A fp-> B[a]
   ((<d, f1> ⊆ fp ⊕ fnp ∧ fp ⊕ fnp ⊆ <d, f1>)
   ∧ ((∀a:A. P[a] supposing ↑a ∈ dom(fp)) ∧ (∀a:A. ¬P[a] supposing ↑a ∈ dom(fnp)))
   ∧ fpf-domain(fp) ⊆ fpf-domain(<d, f1>)
   ∧ fpf-domain(fnp) ⊆ fpf-domain(<d, f1>))

Latex:

Latex:
\mforall{}[A:Type] \mforall{}eq:EqDecider(A) \mforall{}[B:A {}\mrightarrow{} Type] \mforall{}f:a:A fp-> B[a] \mforall{}[P:A {}\mrightarrow{} \mBbbP{}] ((\mforall{}a:A. Dec(P[a])) {}\mRightarrow{} (\mexists{}fp,fnp:a:A fp-> B[a] ((f \msubseteq{} fp \moplus{} fnp \mwedge{} fp \moplus{} fnp \msubseteq{} f) \mwedge{} ((\mforall{}a:A. P[a] supposing \muparrow{}a \mmember{} dom(fp)) \mwedge{} (\mforall{}a:A. \mneg{}P[a] supposing \muparrow{}a \mmember{} dom(fnp))) \mwedge{} fpf-domain(fp) \msubseteq{} fpf-domain(f) \mwedge{} fpf-domain(fnp) \msubseteq{} fpf-domain(f)))) By Latex: (Auto THEN DVar `f' THEN RenameVar `dec' (-1)) Home Index