Proof of Nuprl Lemma : cbv-reduce-strict

Step * 2 1 2 of Lemma cbv-reduce-strict

1. F : Base
2. a : Base
3. B : Base
4. ∀x:Base. ((F[x])↓ ⇒ (x)↓)
5. ∀u,v,x:Base.  ((F[x] ~ exception(u; v)) ⇒ (↓(x ~ exception(u; v)) ∨ (x)↓))
6. ∀u,v:Base.  (B[exception(u; v)] ~ exception(u; v))
7. is-exception(F[eval x = a in
                  B[x]])
8. u : Base
9. v : Base
10. F eval x = a in B x ~ exception(u; v)
11. eval x = a in
    B x ~ exception(u; v)
12. is-exception(eval x = a in
                 B x)
13. is-exception(a)
⊢ F[eval x = a in
    B[x]] ≤ F[B[a]]
BY
{ TACTIC:(ExceptionSqequal (-1) THEN HypSubst' (-1) 0 THEN SqLeCD THEN Try (SqLeCD)) }

1
1. F : Base
2. a : Base
3. B : Base
4. ∀x:Base. ((F[x])↓ ⇒ (x)↓)
5. ∀u,v,x:Base.  ((F[x] ~ exception(u; v)) ⇒ (↓(x ~ exception(u; v)) ∨ (x)↓))
6. ∀u,v:Base.  (B[exception(u; v)] ~ exception(u; v))
7. is-exception(F[eval x = a in
                  B[x]])
8. u : Base
9. v : Base
10. F eval x = a in B x ~ exception(u; v)
11. eval x = a in
    B x ~ exception(u; v)
12. is-exception(eval x = a in
                 B x)
13. is-exception(a)
14. u1 : Base
15. v1 : Base
16. a ~ exception(u1; v1)
⊢ eval x = exception(u1; v1) in
  B[x] ≤ B[exception(u1; v1)]

Latex:

Latex:
1. F : Base 2. a : Base 3. B : Base 4. \mforall{}x:Base. ((F[x])\mdownarrow{} {}\mRightarrow{} (x)\mdownarrow{}) 5. \mforall{}u,v,x:Base. ((F[x] \msim{} exception(u; v)) {}\mRightarrow{} (\mdownarrow{}(x \msim{} exception(u; v)) \mvee{} (x)\mdownarrow{})) 6. \mforall{}u,v:Base. (B[exception(u; v)] \msim{} exception(u; v)) 7. is-exception(F[eval x = a in B[x]]) 8. u : Base 9. v : Base 10. F eval x = a in B x \msim{} exception(u; v) 11. eval x = a in B x \msim{} exception(u; v) 12. is-exception(eval x = a in B x) 13. is-exception(a) \mvdash{} F[eval x = a in B[x]] \mleq{} F[B[a]] By Latex: TACTIC:(ExceptionSqequal (-1) THEN HypSubst' (-1) 0 THEN SqLeCD THEN Try (SqLeCD)) Home Index