Proof of Nuprl Lemma : hdf-once-transformation2

Step * 1 1 2 of Lemma hdf-once-transformation2

1. j : ℤ
2. j ≠ 0
3. 0 < j
4. ∀L,G,S,init:Top. ∀m:ℕ. ∀a,g:Base.
     (λmk-hdf,s0. case s0
                  of inl(y) =>
                  inl (λa.let X',b = y a

                          in <mk-hdf case null(b) of inl() => X' | inr() => inr Ax , b>)

                  | inr(y) =>
                  inr Ax ^j - 1
      ⊥
      case null(G g)
       of inl() =>
       fix((λmk-hdf,s. (inl (λa.cbva_seq(L s a; λg.<mk-hdf (S g s), G g>; m))))) (S g init)
       | inr() =>
       inr Ax  ≤ case null(G g)
       of inl() =>

       fix((λmk-hdf,s. (inl (λa.cbva_seq(L s a; λg.<case null(G g) of inl() => mk-hdf (S g s) | inr() => inr Ax , G g>;

                                         m)))))
       (S g init)
       | inr() =>
       inr Ax )
5. L : Top@i
6. G : Top@i
7. S : Top@i
8. init : Top@i
9. m : ℕ@i
10. a : Base@i
11. g : Base@i
12. @0 : Base
13. a@0 : Base
14. g@0 : Base
15. λmk-hdf,s0. case s0
                of inl(y) =>
                inl (λa.let X',b = y a

                        in <mk-hdf case null(b) of inl() => X' | inr() => inr Ax , b>)

                | inr(y) =>
                inr Ax ^j - 1
    ⊥
    case null(G g@0)
     of inl() =>

     fix((λmk-hdf,s. (inl (λa.cbva_seq(L s a; λg.<mk-hdf (S g s), G g>; m))))) (S g@0 (S g init))

     | inr() =>
     inr Ax  ≤ case null(G g@0)
     of inl() =>

     fix((λmk-hdf,s. (inl (λa.cbva_seq(L s a; λg.<case null(G g) of inl() => mk-hdf (S g s) | inr() => inr Ax , G g>;

                                       m)))))
     (S g@0 (S g init))
     | inr() =>
     inr Ax
16. @1 : Base

⊢ inl (λa.cbva_seq(L (S g@0 (S g init)) a; λg@1.<fix((λmk-hdf,s. (inl (λa.cbva_seq(L s a; λg.<mk-hdf (S g s), G g>; m)))\000C))

                                                 (S g@1 (S g@0 (S g init)))

, G g@1

                                                >; m)) ~ fix((λmk-hdf,s. (inl (λa.cbva_seq(L s a; λg.<mk-hdf (S g s)

                                                                                                     , G g

                                                                                                     >; m)))))

                                                         (S g@0 (S g init))

BY
{ ((RW (AddrC [2] UnrollRecursionC) 0 THEN Reduce 0) THEN Auto) }

Latex:

1. j : \mBbbZ{} 2. j \mneq{} 0 3. 0 < j 4. \mforall{}L,G,S,init:Top. \mforall{}m:\mBbbN{}. \mforall{}a,g:Base. (\mlambda{}mk-hdf,s0. case s0 of inl(y) => inl (\mlambda{}a.let X',b = y a in <mk-hdf case null(b) of inl() => X' | inr() => inr Ax , b>) | inr(y) => inr Ax \^{}j - 1 \mbot{} case null(G g) of inl() => fix((\mlambda{}mk-hdf,s. (inl (\mlambda{}a.cbva\_seq(L s a; \mlambda{}g.<mk-hdf (S g s), G g> m))))) (S g init) | inr() => inr Ax \mleq{} case null(G g) of inl() => fix((\mlambda{}mk-hdf,s. (inl (\mlambda{}a.cbva\_seq(L s a; \mlambda{}g.<case null(G g) of inl() => mk-hdf (S g s) | inr() => inr Ax , G g > m))))) (S g init) | inr() => inr Ax ) 5. L : Top@i 6. G : Top@i 7. S : Top@i 8. init : Top@i 9. m : \mBbbN{}@i 10. a : Base@i 11. g : Base@i 12. @0 : Base 13. a@0 : Base 14. g@0 : Base 15. \mlambda{}mk-hdf,s0. case s0 of inl(y) => inl (\mlambda{}a.let X',b = y a in <mk-hdf case null(b) of inl() => X' | inr() => inr Ax , b>) | inr(y) => inr Ax \^{}j - 1 \mbot{} case null(G g@0) of inl() => fix((\mlambda{}mk-hdf,s. (inl (\mlambda{}a.cbva\_seq(L s a; \mlambda{}g.<mk-hdf (S g s), G g> m))))) (S g@0 (S g init)) | inr() => inr Ax \mleq{} case null(G g@0) of inl() => fix((\mlambda{}mk-hdf,s. (inl (\mlambda{}a.cbva\_seq(L s a; \mlambda{}g.<case null(G g) of inl() => mk-hdf (S g s) | inr() => inr Ax , G g > m))))) (S g@0 (S g init)) | inr() => inr Ax 16. @1 : Base \mvdash{} inl (\mlambda{}a.cbva\_seq(L (S g@0 (S g init)) a; \mlambda{}g@1.<fix((\mlambda{}mk-hdf,s. (inl (\mlambda{}a.cbva\_seq(L s a; \mlambda{}g.<mk-hdf (S g s), G g> m))))) (S g@1 (S g@0 (S g init))) , G g@1 > m)) \msim{} fix((\mlambda{}mk-hdf,s. (inl (\mlambda{}a.cbva\_seq(L s a; \mlambda{}g.<mk-hdf (S g s), G g> m))))) (S g@0 (S g init)) By ((RW (AddrC [2] UnrollRecursionC) 0 THEN Reduce 0) THEN Auto) Home Index