Proof of Nuprl Lemma : win2strat-strat2play-wf

Step * 2 of Lemma win2strat-strat2play-wf

.....upcase.....
1. g : SimpleGame
2. n : ℤ
3. 0 < n
4. <Ax, Ax, Ax, Ax> ∈ (win2strat(g;n - 1) ∈ Type)
∧ (∀[s:win2strat(g;n - 1)]. (strat2play(g;n - 1;s) ∈ Type))
∧ (∀[s:win2strat(g;n - 1)]. ∀[f:strat2play(g;n - 1;s)]. (||f|| ∈ ℤ))

   ∧ (∀[s:win2strat(g;n - 1)]. ∀[f:strat2play(g;n - 1;s)]. ∀[k:{(2 * (n - 1)) + 2..||f|| + 1^-}].

        (seq-truncate(f;k) ∈ strat2play(g;n - 1;s)))
⊢ <Ax, Ax, Ax, Ax> ∈ (win2strat(g;n) ∈ Type)
  ∧ (∀[s:win2strat(g;n)]. (strat2play(g;n;s) ∈ Type))
  ∧ (∀[s:win2strat(g;n)]. ∀[f:strat2play(g;n;s)].  (||f|| ∈ ℤ))
  ∧ (∀[s:win2strat(g;n)]. ∀[f:strat2play(g;n;s)]. ∀[k:{(2 * n) + 2..||f|| + 1^-}].
       (seq-truncate(f;k) ∈ strat2play(g;n;s)))
BY
{ ((Assert win2strat(g;n - 1) ∈ Type BY
          ((MemHD (-1) THENA Auto) THEN All Reduce THEN UseWitness ⌜Ax⌝⋅ THEN Auto))
   THEN (Assert ∀[s:win2strat(g;n - 1)]. (strat2play(g;n - 1;s) ∈ Type) BY

               (RepeatFor 2 (((MemHD (-2) THENA Auto) THEN All Reduce)) THEN UseWitness ⌜Ax⌝⋅ THEN Auto))

THEN (Assert ∀[s:win2strat(g;n - 1)]. ∀[f:strat2play(g;n - 1;s)]. (||f|| ∈ ℤ) BY

               (RepeatFor 3 (((MemHD (-3) THENA Auto) THEN All Reduce)) THEN UseWitness ⌜Ax⌝⋅ THEN Auto))

   THEN (Assert ∀[s:win2strat(g;n - 1)]. ∀[f:strat2play(g;n - 1;s)]. ∀[k:{(2 * (n - 1)) + 2..||f|| + 1^-}].

(seq-truncate(f;k) ∈ strat2play(g;n - 1;s)) BY

               (RepeatFor 3 (((MemHD (-4) THENA Auto) THEN All Reduce)) THEN UseWitness ⌜Ax⌝⋅ THEN Auto))

   THEN Thin 4) }

1
1. g : SimpleGame
2. n : ℤ
3. 0 < n
4. win2strat(g;n - 1) ∈ Type
5. ∀[s:win2strat(g;n - 1)]. (strat2play(g;n - 1;s) ∈ Type)
6. ∀[s:win2strat(g;n - 1)]. ∀[f:strat2play(g;n - 1;s)].  (||f|| ∈ ℤ)
7. ∀[s:win2strat(g;n - 1)]. ∀[f:strat2play(g;n - 1;s)]. ∀[k:{(2 * (n - 1)) + 2..||f|| + 1^-}].
     (seq-truncate(f;k) ∈ strat2play(g;n - 1;s))
⊢ <Ax, Ax, Ax, Ax> ∈ (win2strat(g;n) ∈ Type)
  ∧ (∀[s:win2strat(g;n)]. (strat2play(g;n;s) ∈ Type))
  ∧ (∀[s:win2strat(g;n)]. ∀[f:strat2play(g;n;s)].  (||f|| ∈ ℤ))
  ∧ (∀[s:win2strat(g;n)]. ∀[f:strat2play(g;n;s)]. ∀[k:{(2 * n) + 2..||f|| + 1^-}].
       (seq-truncate(f;k) ∈ strat2play(g;n;s)))

Latex:

Latex:
.....upcase..... 1. g : SimpleGame 2. n : \mBbbZ{} 3. 0 < n 4. <Ax, Ax, Ax, Ax> \mmember{} (win2strat(g;n - 1) \mmember{} Type) \mwedge{} (\mforall{}[s:win2strat(g;n - 1)]. (strat2play(g;n - 1;s) \mmember{} Type)) \mwedge{} (\mforall{}[s:win2strat(g;n - 1)]. \mforall{}[f:strat2play(g;n - 1;s)]. (||f|| \mmember{} \mBbbZ{})) \mwedge{} (\mforall{}[s:win2strat(g;n - 1)]. \mforall{}[f:strat2play(g;n - 1;s)]. \mforall{}[k:\{(2 * (n - 1)) + 2..||f|| + 1\msupminus{}\}]. (seq-truncate(f;k) \mmember{} strat2play(g;n - 1;s))) \mvdash{} <Ax, Ax, Ax, Ax> \mmember{} (win2strat(g;n) \mmember{} Type) \mwedge{} (\mforall{}[s:win2strat(g;n)]. (strat2play(g;n;s) \mmember{} Type)) \mwedge{} (\mforall{}[s:win2strat(g;n)]. \mforall{}[f:strat2play(g;n;s)]. (||f|| \mmember{} \mBbbZ{})) \mwedge{} (\mforall{}[s:win2strat(g;n)]. \mforall{}[f:strat2play(g;n;s)]. \mforall{}[k:\{(2 * n) + 2..||f|| + 1\msupminus{}\}]. (seq-truncate(f;k) \mmember{} strat2play(g;n;s))) By Latex: ((Assert win2strat(g;n - 1) \mmember{} Type BY ((MemHD (-1) THENA Auto) THEN All Reduce THEN UseWitness \mkleeneopen{}Ax\mkleeneclose{}\mcdot{} THEN Auto)) THEN (Assert \mforall{}[s:win2strat(g;n - 1)]. (strat2play(g;n - 1;s) \mmember{} Type) BY (RepeatFor 2 (((MemHD (-2) THENA Auto) THEN All Reduce)) THEN UseWitness \mkleeneopen{}Ax\mkleeneclose{}\mcdot{} THEN Auto)) THEN (Assert \mforall{}[s:win2strat(g;n - 1)]. \mforall{}[f:strat2play(g;n - 1;s)]. (||f|| \mmember{} \mBbbZ{}) BY (RepeatFor 3 (((MemHD (-3) THENA Auto) THEN All Reduce)) THEN UseWitness \mkleeneopen{}Ax\mkleeneclose{}\mcdot{} THEN Auto)) THEN (Assert \mforall{}[s:win2strat(g;n - 1)]. \mforall{}[f:strat2play(g;n - 1;s)]. \mforall{}[k:\{(2 * (n - 1)) + 2..||f|| + 1\msupminus{}\}]. (seq-truncate(f;k) \mmember{} strat2play(g;n - 1;s)) BY (RepeatFor 3 (((MemHD (-4) THENA Auto) THEN All Reduce)) THEN UseWitness \mkleeneopen{}Ax\mkleeneclose{}\mcdot{} THEN Auto)) THEN Thin 4) Home Index