Proof of Nuprl Lemma : rec-value-evalall

Step * 1 1 1 1 1 2 of Lemma rec-value-evalall

1. j : ℤ
2. 0 < j
3. ∀x:Base
     ((λevalall,t. eval x = t in
                   if x is a pair then let a,b = x
                                       in eval a' = evalall a in
                                          eval b' = evalall b in

                                            <a', b'> otherwise if x is inl then eval y = evalall outl(x) in

                                                                                inl y

                                                               else if x is inr then eval y = evalall outr(x) in

                                                                                     inr y

                                                                    else x^j - 1

       ⊥
       x)↓
     ⇒ (x ∈ rec-value()))
4. x : Base@i
5. (eval a' = λevalall,t. eval x = t in
                          if x is a pair then let a,b = x

                                              in eval a' = evalall a in

                                                 eval b' = evalall b in

                                                   <a', b'> otherwise if x is inl then eval y = evalall outl(x) in

                                                                                       inl y

                                                                      else if x is inr then eval y = evalall outr(x) in

                                                                                            inr y

                                                                           else x^j - 1

              ⊥
              (fst(x)) in
    eval b' = λevalall,t. eval x = t in
                          if x is a pair then let a,b = x

                                              in eval a' = evalall a in

                                                 eval b' = evalall b in

                                                   <a', b'> otherwise if x is inl then eval y = evalall outl(x) in

                                                                                       inl y

                                                                      else if x is inr then eval y = evalall outr(x) in

                                                                                            inr y

                                                                           else x^j - 1

              ⊥
              (snd(x)) in
      <a', b'>)↓
6. (x)↓
7. x ~ <fst(x), snd(x)>

8. <fst(x), snd(x)> = <fst(x), snd(x)> ∈ (atomic-values() ⋃ (rec-value() × rec-value()) ⋃ (rec-value() + rec-value()))

⊢ (atomic-values() ⋃ (rec-value() × rec-value()) ⋃ (rec-value() + rec-value())) ⊆r rec-value()
BY
{ (InstLemma `rec-value-ext` [] THEN D -1 THEN Hypothesis) }

Latex:

Latex:
1. j : \mBbbZ{} 2. 0 < j 3. \mforall{}x:Base ((\mlambda{}evalall,t. eval x = t in if x is a pair then let a,b = x in eval a' = evalall a in eval b' = evalall b in <a', b'> otherwise if x is inl then eval y = evalall outl(x) in inl y else if x is inr eval y = evalall outr(x) in inr y else x\^{}j - 1 \mbot{} x)\mdownarrow{} {}\mRightarrow{} (x \mmember{} rec-value())) 4. x : Base@i 5. (eval a' = \mlambda{}evalall,t. eval x = t in if x is a pair then let a,b = x in eval a' = evalall a in eval b' = evalall b in <a', b'> otherwise if x is inl then eval y = evalall outl(x) in inl y else if x is inr then eval y = evalall outr(x) in inr y else x\^{}j - 1 \mbot{} (fst(x)) in eval b' = \mlambda{}evalall,t. eval x = t in if x is a pair then let a,b = x in eval a' = evalall a in eval b' = evalall b in <a', b'> otherwise if x is inl then eval y = evalall outl(x) in inl y else if x is inr then eval y = evalall outr(x) in inr y else x\^{}j - 1 \mbot{} (snd(x)) in <a', b'>)\mdownarrow{} 6. (x)\mdownarrow{} 7. x \msim{} <fst(x), snd(x)> 8. <fst(x), snd(x)> = <fst(x), snd(x)> \mvdash{} (atomic-values() \mcup{} (rec-value() \mtimes{} rec-value()) \mcup{} (rec-value() + rec-value())) \msubseteq{}r rec-value() By Latex: (InstLemma `rec-value-ext` [] THEN D -1 THEN Hypothesis) Home Index