Proof of Nuprl Lemma : mk_lambdas-fun-unroll

Step * 1 1 of Lemma mk_lambdas-fun-unroll

1. F : Top
2. k : ℤ
3. 0 < k
4. 0 < k - 1
⇒ (∀K:Top. ∀n:ℤ.
      ((0 ≤ n)
      ⇒ (mk_lambdas-fun(F;λx.mk_applies(x;K;n);n;n + (k - 1))
         ~ mk_lambdas-fun(λg,y. (F (λx.(g x y)));λx.mk_applies(x;K;n);n;(n + (k - 1)) - 1))))
5. 0 < k
6. K : Top
7. n : ℤ
8. 0 ≤ n
9. k = 1 ∈ ℤ

⊢ mk_lambdas-fun(F;λx.mk_applies(x;K;n);n;n + k) ~ mk_lambdas-fun(λg,y. (F (λx.(g x y)));λx.mk_applies(x;K;n);n;(n + k) \000C- 1)

BY
{ (HypSubst' (-1) 0
THEN (Subst ⌜(n + 1) - 1 ~ n⌝ 0⋅ THENA Auto)
THEN Repeat ((RecUnfold `mk_lambdas-fun` 0 THEN Repeat (AutoSplit)))) }

Latex:

Latex:
1. F : Top 2. k : \mBbbZ{} 3. 0 < k 4. 0 < k - 1 {}\mRightarrow{} (\mforall{}K:Top. \mforall{}n:\mBbbZ{}. ((0 \mleq{} n) {}\mRightarrow{} (mk\_lambdas-fun(F;\mlambda{}x.mk\_applies(x;K;n);n;n + (k - 1)) \msim{} mk\_lambdas-fun(\mlambda{}g,y. (F (\mlambda{}x.(g x y)));\mlambda{}x.mk\_applies(x;K;n);n;(n + (k - 1)) - 1)))) 5. 0 < k 6. K : Top 7. n : \mBbbZ{} 8. 0 \mleq{} n 9. k = 1 \mvdash{} mk\_lambdas-fun(F;\mlambda{}x.mk\_applies(x;K;n);n;n + k) \msim{} mk\_lambdas-fun(\mlambda{}g,y. (F (\mlambda{}x.(g x y)));\mlambda{}x.mk\_applies(x;K;n);n;(n + k) - 1) By Latex: (HypSubst' (-1) 0 THEN (Subst \mkleeneopen{}(n + 1) - 1 \msim{} n\mkleeneclose{} 0\mcdot{} THENA Auto) THEN Repeat ((RecUnfold `mk\_lambdas-fun` 0 THEN Repeat (AutoSplit)))) Home Index