Proof of Nuprl Lemma : Veldman-Coquand

Step * 3 2 of Lemma Veldman-Coquand

1. X : Type
2. n : ℤ
3. [%1] : 0 < n
4. ∀p,q:wfd-tree(X).
     ∀[A,B:n:ℕ ⟶ (ℕn ⟶ X) ⟶ ℙ]. ∀[R,S:n - 1-aryRel(X)].
       (tree-secures(X;λm,s. ((A m s) ∨ ([[R]] m s));p)
       ⇒ tree-secures(X;λm,s. ((B m s) ∨ ([[S]] m s));q)
       ⇒

 tree-secures(X;λm,s. (((A m s) ∨ (B m s)) ∨ (([[R]] m s) ∧ ([[S]] m s)));tree-tensor(n - 1;p;q)))

⊢ ∀f:X ⟶ wfd-tree(X)
    ((∀b:X
        ∀[A,B:n:ℕ ⟶ (ℕn ⟶ X) ⟶ ℙ]. ∀[R,S:n-aryRel(X)].
          (tree-secures(X;λm,s. ((A m s) ∨ ([[R]] m s));Wsup(tt;⋅))
          ⇒ tree-secures(X;λm,s. ((B m s) ∨ ([[S]] m s));f b)
          ⇒

 tree-secures(X;λm,s. (((A m s) ∨ (B m s)) ∨ (([[R]] m s) ∧ ([[S]] m s)));tree-tensor(n;Wsup(tt;⋅);f b))))

    ⇒ (∀[A,B:n:ℕ ⟶ (ℕn ⟶ X) ⟶ ℙ]. ∀[R,S:n-aryRel(X)].
          (tree-secures(X;λm,s. ((A m s) ∨ ([[R]] m s));Wsup(tt;⋅))
          ⇒ tree-secures(X;λm,s. ((B m s) ∨ ([[S]] m s));Wsup(ff;f))
          ⇒ tree-secures(X;λm,s. (((A m s) ∨ (B m s))

                                 ∨ (([[R]] m s) ∧ ([[S]] m s)));tree-tensor(n;Wsup(tt;⋅);Wsup(ff;f))))))

{ TACTIC:RepeatFor 2 ((D 0 THENA (Auto THEN Unfold `wfd-tree` 0 THEN MemCD THEN Reduce 0 THEN Auto))) }

1
1. X : Type
2. n : ℤ
3. [%1] : 0 < n
4. ∀p,q:wfd-tree(X).
     ∀[A,B:n:ℕ ⟶ (ℕn ⟶ X) ⟶ ℙ]. ∀[R,S:n - 1-aryRel(X)].
       (tree-secures(X;λm,s. ((A m s) ∨ ([[R]] m s));p)
       ⇒ tree-secures(X;λm,s. ((B m s) ∨ ([[S]] m s));q)
       ⇒

 tree-secures(X;λm,s. (((A m s) ∨ (B m s)) ∨ (([[R]] m s) ∧ ([[S]] m s)));tree-tensor(n - 1;p;q)))

5. f : X ⟶ wfd-tree(X)
6. ∀b:X
     ∀[A,B:n:ℕ ⟶ (ℕn ⟶ X) ⟶ ℙ]. ∀[R,S:n-aryRel(X)].
       (tree-secures(X;λm,s. ((A m s) ∨ ([[R]] m s));Wsup(tt;⋅))
       ⇒ tree-secures(X;λm,s. ((B m s) ∨ ([[S]] m s));f b)
       ⇒

 tree-secures(X;λm,s. (((A m s) ∨ (B m s)) ∨ (([[R]] m s) ∧ ([[S]] m s)));tree-tensor(n;Wsup(tt;⋅);f b)))

⊢ ∀[A,B:n:ℕ ⟶ (ℕn ⟶ X) ⟶ ℙ]. ∀[R,S:n-aryRel(X)].
    (tree-secures(X;λm,s. ((A m s) ∨ ([[R]] m s));Wsup(tt;⋅))
    ⇒ tree-secures(X;λm,s. ((B m s) ∨ ([[S]] m s));Wsup(ff;f))
    ⇒

 tree-secures(X;λm,s. (((A m s) ∨ (B m s)) ∨ (([[R]] m s) ∧ ([[S]] m s)));tree-tensor(n;Wsup(tt;⋅);Wsup(ff;f))))

Latex:

Latex:
1. X : Type 2. n : \mBbbZ{} 3. [\%1] : 0 < n 4. \mforall{}p,q:wfd-tree(X). \mforall{}[A,B:n:\mBbbN{} {}\mrightarrow{} (\mBbbN{}n {}\mrightarrow{} X) {}\mrightarrow{} \mBbbP{}]. \mforall{}[R,S:n - 1-aryRel(X)]. (tree-secures(X;\mlambda{}m,s. ((A m s) \mvee{} ([[R]] m s));p) {}\mRightarrow{} tree-secures(X;\mlambda{}m,s. ((B m s) \mvee{} ([[S]] m s));q) {}\mRightarrow{} tree-secures(X;\mlambda{}m,s. (((A m s) \mvee{} (B m s)) \mvee{} (([[R]] m s) \mwedge{} ([[S]] m s)));tree-tensor(n - 1;p;q))) \mvdash{} \mforall{}f:X {}\mrightarrow{} wfd-tree(X) ((\mforall{}b:X \mforall{}[A,B:n:\mBbbN{} {}\mrightarrow{} (\mBbbN{}n {}\mrightarrow{} X) {}\mrightarrow{} \mBbbP{}]. \mforall{}[R,S:n-aryRel(X)]. (tree-secures(X;\mlambda{}m,s. ((A m s) \mvee{} ([[R]] m s));Wsup(tt;\mcdot{})) {}\mRightarrow{} tree-secures(X;\mlambda{}m,s. ((B m s) \mvee{} ([[S]] m s));f b) {}\mRightarrow{} tree-secures(X;\mlambda{}m,s. (((A m s) \mvee{} (B m s)) \mvee{} (([[R]] m s) \mwedge{} ([[S]] m s)));tree-tensor(n;Wsup(tt;\mcdot{});f b)))) {}\mRightarrow{} (\mforall{}[A,B:n:\mBbbN{} {}\mrightarrow{} (\mBbbN{}n {}\mrightarrow{} X) {}\mrightarrow{} \mBbbP{}]. \mforall{}[R,S:n-aryRel(X)]. (tree-secures(X;\mlambda{}m,s. ((A m s) \mvee{} ([[R]] m s));Wsup(tt;\mcdot{})) {}\mRightarrow{} tree-secures(X;\mlambda{}m,s. ((B m s) \mvee{} ([[S]] m s));Wsup(ff;f)) {}\mRightarrow{} tree-secures(X;\mlambda{}m,s. (((A m s) \mvee{} (B m s)) \mvee{} (([[R]] m s) \mwedge{} ([[S]] m s)));tree-tensor(n;Wsup(tt;\mcdot{});Wsup(ff;f))\000C)))) By Latex: TACTIC:RepeatFor 2 ((D 0 THENA (Auto THEN Unfold `wfd-tree` 0 THEN MemCD THEN Reduce 0 THEN Auto))) Home Index