Proof of Nuprl Lemma : callbyvalueall-seq-extend

Step * 2 of Lemma callbyvalueall-seq-extend

.....upcase.....
1. F : Top
2. G : Top
3. L : Top
4. i : ℤ
5. 0 < i
6. ∀K:Top. ∀n:ℤ.
     ((0 ≤ n)
     ⇒ 0 < n + (i - 1)
     ⇒ (callbyvalueall-seq(L;λf.mk_applies(f;K;n);mk_lambdas(λout.let x ⟵ F[out]

                                                                   in G[x];(n + (i - 1)) - 1);n;n + (i - 1))

        ~ callbyvalueall-seq(λn@0.if (n@0 =_z n + (i - 1)) then mk_lambdas(F;(n + (i - 1)) - 1) else L n@0 fi

                             ;λf.mk_applies(f;K;n);mk_lambdas(G;n + (i - 1));n;(n + (i - 1)) + 1)))

⊢ ∀K:Top. ∀n:ℤ.
    ((0 ≤ n)
    ⇒ 0 < n + i
    ⇒ (callbyvalueall-seq(L;λf.mk_applies(f;K;n);mk_lambdas(λout.let x ⟵ F[out]

                                                                  in G[x];(n + i) - 1);n;n + i)

       ~ callbyvalueall-seq(λn@0.if (n@0 =_z n + i) then mk_lambdas(F;(n + i) - 1) else L n@0 fi ;λf.mk_applies(f;K;n)

                            ;mk_lambdas(G;n + i);n;(n + i) + 1)))
BY
{ ((UnivCD THENA Auto) THEN (Decide ⌜i = 1 ∈ ℤ⌝⋅ THENA Auto)) }

1
1. F : Top
2. G : Top
3. L : Top
4. i : ℤ
5. 0 < i
6. ∀K:Top. ∀n:ℤ.
     ((0 ≤ n)
     ⇒ 0 < n + (i - 1)
     ⇒ (callbyvalueall-seq(L;λf.mk_applies(f;K;n);mk_lambdas(λout.let x ⟵ F[out]

                                                                   in G[x];(n + (i - 1)) - 1);n;n + (i - 1))

        ~ callbyvalueall-seq(λn@0.if (n@0 =_z n + (i - 1)) then mk_lambdas(F;(n + (i - 1)) - 1) else L n@0 fi

                             ;λf.mk_applies(f;K;n);mk_lambdas(G;n + (i - 1));n;(n + (i - 1)) + 1)))

7. K : Top
8. n : ℤ
9. 0 ≤ n
10. 0 < n + i
11. i = 1 ∈ ℤ
⊢ callbyvalueall-seq(L;λf.mk_applies(f;K;n);mk_lambdas(λout.let x ⟵ F[out]

                                                            in G[x];(n + i) - 1);n;n + i)

~ callbyvalueall-seq(λn@0.if (n@0 =_z n + i) then mk_lambdas(F;(n + i) - 1) else L n@0 fi ;λf.mk_applies(f;K;n)

                     ;mk_lambdas(G;n + i);n;(n + i) + 1)

2
1. F : Top
2. G : Top
3. L : Top
4. i : ℤ
5. 0 < i
6. ∀K:Top. ∀n:ℤ.
     ((0 ≤ n)
     ⇒ 0 < n + (i - 1)
     ⇒ (callbyvalueall-seq(L;λf.mk_applies(f;K;n);mk_lambdas(λout.let x ⟵ F[out]

                                                                   in G[x];(n + (i - 1)) - 1);n;n + (i - 1))

        ~ callbyvalueall-seq(λn@0.if (n@0 =_z n + (i - 1)) then mk_lambdas(F;(n + (i - 1)) - 1) else L n@0 fi

                             ;λf.mk_applies(f;K;n);mk_lambdas(G;n + (i - 1));n;(n + (i - 1)) + 1)))

7. K : Top
8. n : ℤ
9. 0 ≤ n
10. 0 < n + i
11. ¬(i = 1 ∈ ℤ)
⊢ callbyvalueall-seq(L;λf.mk_applies(f;K;n);mk_lambdas(λout.let x ⟵ F[out]

                                                            in G[x];(n + i) - 1);n;n + i)

~ callbyvalueall-seq(λn@0.if (n@0 =_z n + i) then mk_lambdas(F;(n + i) - 1) else L n@0 fi ;λf.mk_applies(f;K;n)

;mk_lambdas(G;n + i);n;(n + i) + 1)

Latex:

Latex:
.....upcase..... 1. F : Top 2. G : Top 3. L : Top 4. i : \mBbbZ{} 5. 0 < i 6. \mforall{}K:Top. \mforall{}n:\mBbbZ{}. ((0 \mleq{} n) {}\mRightarrow{} 0 < n + (i - 1) {}\mRightarrow{} (callbyvalueall-seq(L;\mlambda{}f.mk\_applies(f;K;n);mk\_lambdas(\mlambda{}out.let x \mleftarrow{}{} F[out] in G[x];(n + (i - 1)) - 1);n;n + (i - 1)) \msim{} callbyvalueall-seq(\mlambda{}n@0.if (n@0 =\msubz{} n + (i - 1)) then mk\_lambdas(F;(n + (i - 1)) - 1) else L n@0 fi ;\mlambda{}f.mk\_applies(f;K;n) ;mk\_lambdas(G;n + (i - 1));n;(n + (i - 1)) + 1))) \mvdash{} \mforall{}K:Top. \mforall{}n:\mBbbZ{}. ((0 \mleq{} n) {}\mRightarrow{} 0 < n + i {}\mRightarrow{} (callbyvalueall-seq(L;\mlambda{}f.mk\_applies(f;K;n);mk\_lambdas(\mlambda{}out.let x \mleftarrow{}{} F[out] in G[x];(n + i) - 1);n;n + i) \msim{} callbyvalueall-seq(\mlambda{}n@0.if (n@0 =\msubz{} n + i) then mk\_lambdas(F;(n + i) - 1) else L n@0 fi ;\mlambda{}f.mk\_applies(f;K;n);mk\_lambdas(G;n + i);n;(n + i) + 1))) By Latex: ((UnivCD THENA Auto) THEN (Decide \mkleeneopen{}i = 1\mkleeneclose{}\mcdot{} THENA Auto)) Home Index