Proof of Nuprl Lemma : sqle-list

Step * 1 1 1 1 of Lemma sqle-list_accum

1. F : Base
2. strict1(λx.F[x])
3. G : Base
4. strict1(λx.G[x])
5. H : Base
6. J : Base
7. ∀a,r1,r2:Base.  ((F[r1] ≤ G[r2]) ⇒ (F[H[r1;a]] ≤ G[J[r2;a]]))
8. j : ℤ
9. 0 < j
10. ∀as,b1,b2:Base.
      ((F[b1] ≤ G[b2])
      ⇒ (F[λlist_accum,y,L. eval v = L in
                             if v is a pair then let h,t = v

                                                 in list_accum H[y;h] t otherwise if v = Ax then y otherwise ⊥^j - 1

            ⊥
            b1
            as] ≤ G[λlist_accum,y,L. eval v = L in
                                     if v is a pair then let h,t = v

                                                         in list_accum J[y;h] t otherwise if v = Ax then y otherwise ⊥^j\000C - 1

                    ⊥
                    b2
                    as]))
11. as : Base@i
12. b1 : Base@i
13. b2 : Base@i
14. F[b1] ≤ G[b2]@i
15. ∀[a,B:Top].  (F[eval x = a in B[x]] ~ eval x = a in F[B[x]])
16. ∀[a,B:Top].  (G[eval x = a in B[x]] ~ eval x = a in G[B[x]])
17. (as)↓@i

18. ∀[a,b,c:Top].  (F[if a is a pair then b otherwise c] ~ if a is a pair then F[b] otherwise F[c])

19. ∀[a,b,c:Top].  (G[if a is a pair then b otherwise c] ~ if a is a pair then G[b] otherwise G[c])

20. ∀[a,b,c:Top].  (F[if a = Ax then b otherwise c] ~ if a = Ax then F[b] otherwise F[c])
21. ∀[a,b,c:Top].  (G[if a = Ax then b otherwise c] ~ if a = Ax then G[b] otherwise G[c])
22. (F[⊥])↓
23. (as)↓
24. ∀a,b:Top.  (if as is a pair then a otherwise b ~ b)
25. ∀a,b:Top.  (if as = Ax then a otherwise b ~ b)
⊢ F[⊥] ≤ G[⊥]
BY

{ OnMaybeHyp 2 (\h. (D h THEN (SplitAndHyps THEN All Reduce) THEN ((FHyp h [-4] THENA Auto) THENM BotDiv))) }

Latex:

Latex:
1. F : Base 2. strict1(\mlambda{}x.F[x]) 3. G : Base 4. strict1(\mlambda{}x.G[x]) 5. H : Base 6. J : Base 7. \mforall{}a,r1,r2:Base. ((F[r1] \mleq{} G[r2]) {}\mRightarrow{} (F[H[r1;a]] \mleq{} G[J[r2;a]])) 8. j : \mBbbZ{} 9. 0 < j 10. \mforall{}as,b1,b2:Base. ((F[b1] \mleq{} G[b2]) {}\mRightarrow{} (F[\mlambda{}list$_{accum}$,y,L. eval v = L in if v is a pair then let h,t = v in list$_{accum}$ H[y;h] t otherwise if v = Ax then y otherwise \mbot{}\^{}j - 1 \mbot{} b1 as] \mleq{} G[\mlambda{}list$_{accum}$,y,L. eval v = L in if v is a pair then let h,t = v in list$_{accum}$ J[y;h]\000C t otherwise if v = Ax then y otherwise \mbot{}\^{}j - 1 \mbot{} b2 as])) 11. as : Base@i 12. b1 : Base@i 13. b2 : Base@i 14. F[b1] \mleq{} G[b2]@i 15. \mforall{}[a,B:Top]. (F[eval x = a in B[x]] \msim{} eval x = a in F[B[x]]) 16. \mforall{}[a,B:Top]. (G[eval x = a in B[x]] \msim{} eval x = a in G[B[x]]) 17. (as)\mdownarrow{}@i 18. \mforall{}[a,b,c:Top]. (F[if a is a pair then b otherwise c] \msim{} if a is a pair then F[b] otherwise F[c]) 19. \mforall{}[a,b,c:Top]. (G[if a is a pair then b otherwise c] \msim{} if a is a pair then G[b] otherwise G[c]) 20. \mforall{}[a,b,c:Top]. (F[if a = Ax then b otherwise c] \msim{} if a = Ax then F[b] otherwise F[c]) 21. \mforall{}[a,b,c:Top]. (G[if a = Ax then b otherwise c] \msim{} if a = Ax then G[b] otherwise G[c]) 22. (F[\mbot{}])\mdownarrow{} 23. (as)\mdownarrow{} 24. \mforall{}a,b:Top. (if as is a pair then a otherwise b \msim{} b) 25. \mforall{}a,b:Top. (if as = Ax then a otherwise b \msim{} b) \mvdash{} F[\mbot{}] \mleq{} G[\mbot{}] By Latex: OnMaybeHyp 2 (\mbackslash{}h. (D h THEN (SplitAndHyps THEN All Reduce) THEN ((FHyp h [-4] THENA Auto) THENM BotDiv))) Home Index