Proof of Nuprl Lemma : hered-term-accum

Step * 1 1 2 of Lemma hered-term-accum_wf

1. opr : Type
2. P : term(opr) ⟶ ℙ
3. Param : Type
4. C : Param ⟶ (varname() List × hered-term(opr;t.P[t])) ⟶ Type

5. nextp : Param ⟶ (varname() List) ⟶ opr ⟶ very-dep-fun(Param;varname() List × hered-term(opr;t.P[t]);a,bt.C[a;bt])

6. m : a:Param
⟶ vs:(varname() List)
⟶ f:opr
⟶ L:{L:(a:Param × bt:varname() List × hered-term(opr;t.P[t]) × C[a;bt]) List|
      vdf-eq(Param;nextp a vs f;L) ∧ hereditarily(opr;s.P[s];mkterm(f;map(λx.(fst(snd(x)));L)))}
⟶ C[a;<vs, mkterm(f;map(λx.(fst(snd(x)));L))>]
7. varcase : a:Param
⟶ vs:(varname() List)
⟶ v:{v:varname()| (¬(v = nullvar() ∈ varname())) ∧ P[varterm(v)]}
⟶ C[a;<vs, varterm(v)>]
8. n : ℕ
9. ∀n:ℕn. ∀p:Param. ∀bt:varname() List × hered-term(opr;t.P[t]).
     ((term-size(snd(bt)) ≤ n)
     ⇒ (hered-term-accum(p,vs,v.varcase[p;vs;v];
                          prm,vs,f,L.m[prm;vs;f;L];
                          p0,ws,op,sofar,bt.nextp[p0;ws;op;sofar;bt];
                          p;
                          bt) ∈ C[p;bt]))
10. p : Param
11. b1 : varname() List
12. y1 : opr
13. y2 : (varname() List × term(opr)) List
14. hereditarily(opr;s.P[s];inr <y1, y2> )
15. term-size(inr <y1, y2> ) ≤ n

16. λsofar,bt. nextp[p;b1;y1;sofar;bt] ∈ very-dep-fun(Param;varname() List × hered-term(opr;t.P[t]);a,bt.C[a;bt])

17. y2 ∈ (varname() List × hered-term(opr;t.P[t])) List
18. bound-terms-accum(L,bt.nextp[p;b1;y1;L;bt];a,bt.λp',bt. hered-term-accum(p,vs,v.varcase[p;vs;v];

                                                                             prm,vs,f,L.m[prm;vs;f;L];

                                                                             p0,ws,op,sofar,bt.nextp[p0;ws;op;sofar;bt];

p';

                                                                             bt)[a;bt];y2)

    ∈ {L:(a:Param × b:varname() List × hered-term(opr;t.P[t]) × C[a;b]) List|
       vdf-eq(Param;λ₂sofar bt.nextp[p;b1;y1;sofar;bt];L)
       ∧ (map(λx.(fst(snd(x)));L) = y2 ∈ ((varname() List × hered-term(opr;t.P[t])) List))}
⊢ let L = bound-terms-accum(sofar,bt.nextp[p;b1;y1;sofar;bt];p',bt.hered-term-accum(p,vs,v.varcase[p;vs;v];

                                                                                    prm,vs,f,L.m[prm;vs;f;L];

                                                                                    p0,ws,op,sofar,bt.nextp[p0;ws;op;

                                                                                                           sofar;bt];

p';

                                                                                    bt);y2) in

m[p;b1;y1;L] ∈ C[p;<b1, inr <y1, y2> >]
BY
{ ((Unfold `so_apply` -1 THEN Reduce -1 THEN Unfold `so_apply` 0 THEN Reduce 0)
THEN (GenConcl ⌜bound-terms-accum(L,bt.nextp p b1 y1 L bt;a,bt.hered-term-accum(p,vs,v.varcase p vs v;

                                                                                   prm,vs,f,L.m prm vs f L;

                                                                                   p0,ws,op,sofar,bt.nextp p0 ws op

                                                                                                     sofar

bt;

a;

                                                                                   bt);y2)

= L

                   ∈ {L:(a:Param × b:varname() List × hered-term(opr;t.P t) × (C a b)) List|

vdf-eq(Param;λ₂sofar bt.nextp p b1 y1 sofar bt;L)

                      ∧ (map(λx.(fst(snd(x)));L) = y2 ∈ ((varname() List × hered-term(opr;t.P t)) List))} ⌝⋅

         THENA Eq
         )
   THEN Thin (-1)
   THEN RepUR ``let`` 0) }

1
1. opr : Type
2. P : term(opr) ⟶ ℙ
3. Param : Type
4. C : Param ⟶ (varname() List × hered-term(opr;t.P[t])) ⟶ Type

5. nextp : Param ⟶ (varname() List) ⟶ opr ⟶ very-dep-fun(Param;varname() List × hered-term(opr;t.P[t]);a,bt.C[a;bt])

16. λsofar,bt. nextp[p;b1;y1;sofar;bt] ∈ very-dep-fun(Param;varname() List × hered-term(opr;t.P[t]);a,bt.C[a;bt])

17. y2 ∈ (varname() List × hered-term(opr;t.P[t])) List
18. bound-terms-accum(L,bt.nextp p b1 y1 L bt;a,bt.hered-term-accum(p,vs,v.varcase p vs v;

                                                                    prm,vs,f,L.m prm vs f L;

                                                                    p0,ws,op,sofar,bt.nextp p0 ws op sofar bt;

a;

                                                                    bt);y2) ∈ {L:(a:Param

                                                                               × b:varname() List × hered-term(opr;t.P

t)

                                                                               × (C a b)) List|

                                                                               vdf-eq(Param;λ₂sofar bt.nextp p b1 y1

                                                                                                       sofar

                                                                                                       bt;L)

                                                                               ∧ (map(λx.(fst(snd(x)));L)

                                                                                 = y2

                                                                                 ∈ ((varname() List

                                                                                   × hered-term(opr;t.P t)) List))}

19. L : {L:(a:Param × b:varname() List × hered-term(opr;t.P t) × (C a b)) List|
vdf-eq(Param;λ₂sofar bt.nextp p b1 y1 sofar bt;L)
∧ (map(λx.(fst(snd(x)));L) = y2 ∈ ((varname() List × hered-term(opr;t.P t)) List))}
⊢ m p b1 y1 L ∈ C p <b1, inr <y1, y2> >

Latex:

Latex:
1. opr : Type 2. P : term(opr) {}\mrightarrow{} \mBbbP{} 3. Param : Type 4. C : Param {}\mrightarrow{} (varname() List \mtimes{} hered-term(opr;t.P[t])) {}\mrightarrow{} Type 5. nextp : Param {}\mrightarrow{} (varname() List) {}\mrightarrow{} opr {}\mrightarrow{} very-dep-fun(Param;varname() List \mtimes{} hered-term(opr;t.P[t]);a,bt.C[a;bt]) 6. m : a:Param {}\mrightarrow{} vs:(varname() List) {}\mrightarrow{} f:opr {}\mrightarrow{} L:\{L:(a:Param \mtimes{} bt:varname() List \mtimes{} hered-term(opr;t.P[t]) \mtimes{} C[a;bt]) List| vdf-eq(Param;nextp a vs f;L) \mwedge{} hereditarily(opr;s.P[s];mkterm(f;map(\mlambda{}x.(fst(snd(x)));L)))\} {}\mrightarrow{} C[a;<vs, mkterm(f;map(\mlambda{}x.(fst(snd(x)));L))>] 7. varcase : a:Param {}\mrightarrow{} vs:(varname() List) {}\mrightarrow{} v:\{v:varname()| (\mneg{}(v = nullvar())) \mwedge{} P[varterm(v)]\} {}\mrightarrow{} C[a;<vs, varterm(v)>] 8. n : \mBbbN{} 9. \mforall{}n:\mBbbN{}n. \mforall{}p:Param. \mforall{}bt:varname() List \mtimes{} hered-term(opr;t.P[t]). ((term-size(snd(bt)) \mleq{} n) {}\mRightarrow{} (hered-term-accum(p,vs,v.varcase[p;vs;v]; prm,vs,f,L.m[prm;vs;f;L]; p0,ws,op,sofar,bt.nextp[p0;ws;op;sofar;bt]; p; bt) \mmember{} C[p;bt])) 10. p : Param 11. b1 : varname() List 12. y1 : opr 13. y2 : (varname() List \mtimes{} term(opr)) List 14. hereditarily(opr;s.P[s];inr <y1, y2> ) 15. term-size(inr <y1, y2> ) \mleq{} n 16. \mlambda{}sofar,bt. nextp[p;b1;y1;sofar;bt] \mmember{} very-dep-fun(Param;varname() List \mtimes{} hered-term(opr;t.P[t]);a,bt.C[a;bt]) 17. y2 \mmember{} (varname() List \mtimes{} hered-term(opr;t.P[t])) List 18. bound-terms-accum(L,bt.nextp[p;b1;y1;L;bt];a,bt.\mlambda{}p',bt. hered-term-accum (p,vs,v.varcase[p;vs;v]; prm,vs,f,L.m[prm;vs;f;L]; p0,ws,op,sofar,bt.nextp[p0;ws;op; sofar;bt]; p'; bt)[a;bt];y2) \mmember{} \{L:(a:Param \mtimes{} b:varname() List \mtimes{} hered-term(opr;t.P[t]) \mtimes{} C[a;b]) List| vdf-eq(Param;\mlambda{}\msubtwo{}sofar bt.nextp[p;b1;y1;sofar;bt];L) \mwedge{} (map(\mlambda{}x.(fst(snd(x)));L) = y2)\} \mvdash{} let L = bound-terms-accum(sofar,bt.nextp[p;b1;y1;sofar; bt];p',bt.hered-term-accum(p,vs,v.varcase[p;vs;v]; prm,vs,f,L.m[prm;vs;f;L]; p0,ws,op,sofar,bt.nextp[p0;ws; op; sofar; bt]; p'; bt);y2) in m[p;b1;y1;L] \mmember{} C[p;<b1, inr <y1, y2> >] By Latex: ((Unfold `so\_apply` -1 THEN Reduce -1 THEN Unfold `so\_apply` 0 THEN Reduce 0) THEN (GenConcl \mkleeneopen{}bound-terms-accum(L,bt.nextp p b1 y1 L bt;a,bt.hered-term-accum(p,vs,v.varcase p vs v; prm,vs,f,L.m prm vs f L; p0,ws,op,sofar,bt.nextp p0 ws op sofar bt; a; bt);y2) = L\mkleeneclose{}\mcdot{} THENA Eq ) THEN Thin (-1) THEN RepUR ``let`` 0) Home Index