Proof of Nuprl Lemma : AF-induction-iff

Step * 1 1 1 1 2 2 of Lemma AF-induction-iff

1. T : Type
2. R : T ⟶ T ⟶ ℙ

3. ∀Q:T ⟶ ℙ. TI(T;x,y.R[x;y];t.Q[t]) supposing ∃R':T ⟶ T ⟶ ℙ. (AFx,y:T.R'[x;y] ∧ (∀x,y:T.  (R⁺[x;y]

⇒ (¬R'[x;y]))))
4. ∀x,y:T. Dec(R⁺[x;y])
5. ∀Q:T ⟶ ℙ. TI(T;x,y.R[x;y];t.Q[t])
6. f : ℕ ⟶ T
7. t : T
8. ∀s:{s:T| R[t;s]} . ∀f:ℕ ⟶ T. (((f 0) = s ∈ T) ⇒ (↓∃n:ℕ. (¬(R⁺ (f n) (f (n + 1))))))
9. f1 : ℕ ⟶ T
10. (f1 0) = t ∈ T
11. ¬(R⁺ (f1 0) (f1 1))
⊢ ↓∃n:ℕ. (¬(R⁺ (f1 n) (f1 (n + 1))))
BY
{ (D 0 THEN With ⌜0⌝ (D 0)⋅ THEN Auto) }

Latex:

Latex:
1. T : Type 2. R : T {}\mrightarrow{} T {}\mrightarrow{} \mBbbP{} 3. \mforall{}Q:T {}\mrightarrow{} \mBbbP{}. TI(T;x,y.R[x;y];t.Q[t]) supposing \mexists{}R':T {}\mrightarrow{} T {}\mrightarrow{} \mBbbP{}. (AFx,y:T.R'[x;y] \mwedge{} (\mforall{}x,y:T. (R\msupplus{}[x;y] {}\mRightarrow{} (\mneg{}R'[x;y])))) 4. \mforall{}x,y:T. Dec(R\msupplus{}[x;y]) 5. \mforall{}Q:T {}\mrightarrow{} \mBbbP{}. TI(T;x,y.R[x;y];t.Q[t]) 6. f : \mBbbN{} {}\mrightarrow{} T 7. t : T 8. \mforall{}s:\{s:T| R[t;s]\} . \mforall{}f:\mBbbN{} {}\mrightarrow{} T. (((f 0) = s) {}\mRightarrow{} (\mdownarrow{}\mexists{}n:\mBbbN{}. (\mneg{}(R\msupplus{} (f n) (f (n + 1)))))) 9. f1 : \mBbbN{} {}\mrightarrow{} T 10. (f1 0) = t 11. \mneg{}(R\msupplus{} (f1 0) (f1 1)) \mvdash{} \mdownarrow{}\mexists{}n:\mBbbN{}. (\mneg{}(R\msupplus{} (f1 n) (f1 (n + 1)))) By Latex: (D 0 THEN With \mkleeneopen{}0\mkleeneclose{} (D 0)\mcdot{} THEN Auto) Home Index