Proof of Nuprl Lemma : alpha-rename-equivalent

Step * 2 1 3 1 2 2 1 1 1 of Lemma alpha-rename-equivalent

.....equality.....
1. opr : Type
2. ∀t:term(opr). ∀bnds:varname() List. ∀f:{v:varname()| (v ∈ bnds @ all-vars(t))}  ⟶ varname().
     (map(f;bnds) ∈ varname() List)
3. bts : bound-term(opr) List
4. ∀bt:bound-term(opr)
     ((bt ∈ bts)
     ⇒ (∀bnds:varname() List. ∀f:{v:varname()| (v ∈ bnds @ all-vars(snd(bt)))}  ⟶ varname().
           alpha-aux(opr;map(f;bnds);bnds;alpha-rename-aux(f;bnds;snd(bt));snd(bt))
           supposing ((∀x:{v:varname()| (v ∈ bnds @ all-vars(snd(bt)))}
                         ((f x ∈ free-vars-aux(bnds;snd(bt))) ⇒ ((f x) = x ∈ varname())))
           ∧ (∀x:{v:varname()| (v ∈ bnds @ all-vars(snd(bt)))}
                (((f x) = nullvar() ∈ varname()) ⇒ (x = nullvar() ∈ varname()))))
           ∧ Inj({v:varname()| (v ∈ bnds @ all-vars(snd(bt)))} ;varname();f)))
5. f : opr
6. bnds : varname() List
7. f@0 : {v:varname()| (v ∈ bnds @ all-vars(mkterm(f;bts)))}  ⟶ varname()
8. ((∀x:{v:varname()| (v ∈ bnds @ all-vars(mkterm(f;bts)))}
       ((f@0 x ∈ free-vars-aux(bnds;mkterm(f;bts))) ⇒ ((f@0 x) = x ∈ varname())))
∧ (∀x:{v:varname()| (v ∈ bnds @ all-vars(mkterm(f;bts)))}
     (((f@0 x) = nullvar() ∈ varname()) ⇒ (x = nullvar() ∈ varname()))))
∧ Inj({v:varname()| (v ∈ bnds @ all-vars(mkterm(f;bts)))} ;varname();f@0)
9. bnds ∈ {v:varname()| (v ∈ bnds)}  List
10. λbt.let vs,a = bt

        in <map(f@0;vs), alpha-rename-aux(f@0;rev(vs) + bnds;a)> ∈ {bt:bound-term(opr)| (bt ∈ bts)}  ⟶ bound-term(opr)

11. bts ∈ {bt:bound-term(opr)| (bt ∈ bts)} List
12. L : bound-term(opr) List

13. map(λbt.let vs,a = bt in <map(f@0;vs), alpha-rename-aux(f@0;rev(vs) + bnds;a)>;bts) = L ∈ (bound-term(opr) List)

14. f = f ∈ opr
15. ||L|| = ||bts|| ∈ ℤ
16. i : ℕ||L||
⊢ rev(map(f@0;fst(bts[i]))) + map(f@0;bnds) ~ map(f@0;rev(fst(bts[i])) + bnds)
BY
{ ((RWO "rev-append-property" 0 THENA Auto)
   THEN (RWO "map_append_sq" 0 THENA Auto)
   THEN EqCD
   THEN Try (Trivial)
   THEN Fold `reverse` 0
   THEN RWO "map-reverse" 0
   THEN Auto) }

Latex:

Latex:
.....equality..... 1. opr : Type 2. \mforall{}t:term(opr). \mforall{}bnds:varname() List. \mforall{}f:\{v:varname()| (v \mmember{} bnds @ all-vars(t))\} {}\mrightarrow{} varname(). (map(f;bnds) \mmember{} varname() List) 3. bts : bound-term(opr) List 4. \mforall{}bt:bound-term(opr) ((bt \mmember{} bts) {}\mRightarrow{} (\mforall{}bnds:varname() List. \mforall{}f:\{v:varname()| (v \mmember{} bnds @ all-vars(snd(bt)))\} {}\mrightarrow{} varname(). alpha-aux(opr;map(f;bnds);bnds;alpha-rename-aux(f;bnds;snd(bt));snd(bt)) supposing ((\mforall{}x:\{v:varname()| (v \mmember{} bnds @ all-vars(snd(bt)))\} ((f x \mmember{} free-vars-aux(bnds;snd(bt))) {}\mRightarrow{} ((f x) = x))) \mwedge{} (\mforall{}x:\{v:varname()| (v \mmember{} bnds @ all-vars(snd(bt)))\} (((f x) = nullvar()) {}\mRightarrow{} (x = nullvar())))) \mwedge{} Inj(\{v:varname()| (v \mmember{} bnds @ all-vars(snd(bt)))\} ;varname();f))) 5. f : opr 6. bnds : varname() List 7. f@0 : \{v:varname()| (v \mmember{} bnds @ all-vars(mkterm(f;bts)))\} {}\mrightarrow{} varname() 8. ((\mforall{}x:\{v:varname()| (v \mmember{} bnds @ all-vars(mkterm(f;bts)))\} ((f@0 x \mmember{} free-vars-aux(bnds;mkterm(f;bts))) {}\mRightarrow{} ((f@0 x) = x))) \mwedge{} (\mforall{}x:\{v:varname()| (v \mmember{} bnds @ all-vars(mkterm(f;bts)))\} (((f@0 x) = nullvar()) {}\mRightarrow{} (x = nullvar())))) \mwedge{} Inj(\{v:varname()| (v \mmember{} bnds @ all-vars(mkterm(f;bts)))\} ;varname();f@0) 9. bnds \mmember{} \{v:varname()| (v \mmember{} bnds)\} List 10. \mlambda{}bt.let vs,a = bt in <map(f@0;vs), alpha-rename-aux(f@0;rev(vs) + bnds;a)> \mmember{} \{bt:bound-term(opr)| (bt \mmember{} bts)\} \000C {}\mrightarrow{} bound-term(opr) 11. bts \mmember{} \{bt:bound-term(opr)| (bt \mmember{} bts)\} List 12. L : bound-term(opr) List 13. map(\mlambda{}bt.let vs,a = bt in <map(f@0;vs), alpha-rename-aux(f@0;rev(vs) + bnds;a)>bts) = L 14. f = f 15. ||L|| = ||bts|| 16. i : \mBbbN{}||L|| \mvdash{} rev(map(f@0;fst(bts[i]))) + map(f@0;bnds) \msim{} map(f@0;rev(fst(bts[i])) + bnds) By Latex: ((RWO "rev-append-property" 0 THENA Auto) THEN (RWO "map\_append\_sq" 0 THENA Auto) THEN EqCD THEN Try (Trivial) THEN Fold `reverse` 0 THEN RWO "map-reverse" 0 THEN Auto) Home Index