Proof of Nuprl Lemma : RankEx2-defop

Step * 1 3 1 of Lemma RankEx2-defop

1. [T] : Type
2. [S] : Type
3. [P] : Type
4. [R] : P ─→ RankEx2(S;T) ─→ ℙ
5. ∀t:T. (∃x:{P| (R x RankEx2_LeafT(t))})@i
6. ∀s:S. (∃x:{P| (R x RankEx2_LeafS(s))})@i
7. ∀d:RankEx2(S;T). ∀s:S. ∀t:T.  ((∃x:{P| (R x d)}) ⇒ (∃x:{P| (R x RankEx2_Prod(<<d, s>, t>))}))@i
8. ∀z:S × RankEx2(S;T) + RankEx2(S;T)
     (case z of inl(p) => ∃x:{P| (R x (snd(p)))} | inr(d) => ∃x:{P| (R x d)} ⇒ (∃x:{P| (R x RankEx2_Union(z))}))@i
9. ∀L:(S × RankEx2(S;T)) List. ((∀p∈L.∃x:{P| (R x (snd(p)))}) ⇒ (∃x:{P| (R x RankEx2_ListProd(L))}))@i
10. ∀z:T + (RankEx2(S;T) List)
      (case z of inl(p) => True | inr(L) => (∀p∈L.∃x:{P| (R x p)}) ⇒ (∃x:{P| (R x RankEx2_UnionList(z))}))@i
11. listprod : (S × RankEx2(S;T)) List@i
12. (∀u∈listprod.let u1,u2 = u
                 in ∃x:{P| (R x u2)})@i
⊢ (∀p∈listprod.∃x:{P| (R x (snd(p)))})
BY

{ (RepeatFor 2 (ParallelLast) THEN MoveToConcl (-1) THEN GenConclAtAddr [1;1] THEN D -2 THEN Reduce 0 THEN Auto) }

Latex:

1. [T] : Type 2. [S] : Type 3. [P] : Type 4. [R] : P {}\mrightarrow{} RankEx2(S;T) {}\mrightarrow{} \mBbbP{} 5. \mforall{}t:T. (\mexists{}x:\{P| (R x RankEx2\_LeafT(t))\})@i 6. \mforall{}s:S. (\mexists{}x:\{P| (R x RankEx2\_LeafS(s))\})@i 7. \mforall{}d:RankEx2(S;T). \mforall{}s:S. \mforall{}t:T. ((\mexists{}x:\{P| (R x d)\}) {}\mRightarrow{} (\mexists{}x:\{P| (R x RankEx2\_Prod(<<d, s>, t>))\}))@i 8. \mforall{}z:S \mtimes{} RankEx2(S;T) + RankEx2(S;T) (case z of inl(p) => \mexists{}x:\{P| (R x (snd(p)))\} | inr(d) => \mexists{}x:\{P| (R x d)\} {}\mRightarrow{} (\mexists{}x:\{P| (R x RankEx2\_Union(z))\}))@i 9. \mforall{}L:(S \mtimes{} RankEx2(S;T)) List ((\mforall{}p\mmember{}L.\mexists{}x:\{P| (R x (snd(p)))\}) {}\mRightarrow{} (\mexists{}x:\{P| (R x RankEx2\_ListProd(L))\}))@i 10. \mforall{}z:T + (RankEx2(S;T) List) (case z of inl(p) => True | inr(L) => (\mforall{}p\mmember{}L.\mexists{}x:\{P| (R x p)\}) {}\mRightarrow{} (\mexists{}x:\{P| (R x RankEx2\_UnionList(z))\}))@i 11. listprod : (S \mtimes{} RankEx2(S;T)) List@i 12. (\mforall{}u\mmember{}listprod.let u1,u2 = u in \mexists{}x:\{P| (R x u2)\})@i \mvdash{} (\mforall{}p\mmember{}listprod.\mexists{}x:\{P| (R x (snd(p)))\}) By (RepeatFor 2 (ParallelLast) THEN MoveToConcl (-1) THEN GenConclAtAddr [1;1] THEN D -2 THEN Reduce 0 THEN Auto) Home Index