Proof of Nuprl Lemma : sg-normalize-win2

Step * 1 2 1 1 1 1 1 of Lemma sg-normalize-win2

.....assertion.....
1. g : SimpleGame
2. n : ℕ
3. 0 < n
4. win2strat(g;n - 1) ≡ win2strat(sg-normalize(g);n - 1)

5. x : s:win2strat(sg-normalize(g);n - 1) ⋂ moves:{f:strat2play(sg-normalize(g);n - 1;s)| ||f|| = (2 * n) ∈ ℤ}  ⟶ {p:Po\000Cs(sg-normalize(g))|

                                                                        Legal2(moves[(2 * n) - 1];p)}

6. x ∈ win2strat(sg-normalize(g);n - 1)

7. x ∈ moves:{f:strat2play(sg-normalize(g);n - 1;x)| ||f|| = (2 * n) ∈ ℤ}  ⟶ {p:Pos(sg-normalize(g))|

                                                                    Legal2(moves[(2 * n) - 1];p)}

8. ¬(n = 0 ∈ ℤ)
9. ¬(n = 0 ∈ ℤ)
10. moves : strat2play(g;n - 1;x)
11. ||moves|| = (2 * n) ∈ ℤ
12. x ∈ win2strat(g;n - 1)
13. moves ∈ {moves:sequence(Pos(g))| ((2 * (n - 1)) + 2) ≤ ||moves||}
14. sequence(Pos(sg-normalize(g))) ⊆r sequence(Pos(g))
15. (moves[0] = InitialPos(g) ∈ Pos(g))
∧ (∀i:ℕ(n - 1) + 1
     ((↓Legal1(moves[2 * i];moves[(2 * i) + 1]))
     ∧ (i < n - 1
       ⇒ ((↓Legal2(moves[(2 * i) + 1];moves[2 * (i + 1)]))
          ∧ (moves[2 * (i + 1)] = (x play-truncate(moves;2 * (i + 1))) ∈ Pos(g))))))
⊢ moves ∈ sequence(Pos(sg-normalize(g)))
BY
{ (InstLemma `strat2play-reachable` [⌜g⌝;⌜n - 1⌝;⌜x⌝;⌜moves⌝]⋅
   THENA (Try ((RWO  "11" 0 THEN Auto)) THEN Try (QuickAuto))
   ) }

1
1. g : SimpleGame
2. n : ℕ
3. 0 < n
4. win2strat(g;n - 1) ≡ win2strat(sg-normalize(g);n - 1)

5. x : s:win2strat(sg-normalize(g);n - 1) ⋂ moves:{f:strat2play(sg-normalize(g);n - 1;s)| ||f|| = (2 * n) ∈ ℤ}  ⟶ {p:Po\000Cs(sg-normalize(g))|

                                                                        Legal2(moves[(2 * n) - 1];p)}

6. x ∈ win2strat(sg-normalize(g);n - 1)

7. x ∈ moves:{f:strat2play(sg-normalize(g);n - 1;x)| ||f|| = (2 * n) ∈ ℤ}  ⟶ {p:Pos(sg-normalize(g))|

                                                                    Legal2(moves[(2 * n) - 1];p)}

8. ¬(n = 0 ∈ ℤ)
9. ¬(n = 0 ∈ ℤ)
10. moves : strat2play(g;n - 1;x)
11. ||moves|| = (2 * n) ∈ ℤ
12. x ∈ win2strat(g;n - 1)
13. moves ∈ {moves:sequence(Pos(g))| ((2 * (n - 1)) + 2) ≤ ||moves||}
14. sequence(Pos(sg-normalize(g))) ⊆r sequence(Pos(g))
15. (moves[0] = InitialPos(g) ∈ Pos(g))
∧ (∀i:ℕ(n - 1) + 1
     ((↓Legal1(moves[2 * i];moves[(2 * i) + 1]))
     ∧ (i < n - 1
       ⇒ ((↓Legal2(moves[(2 * i) + 1];moves[2 * (i + 1)]))
          ∧ (moves[2 * (i + 1)] = (x play-truncate(moves;2 * (i + 1))) ∈ Pos(g))))))
16. moves ∈ sequence({p:Pos(g)| sg-reachable(g;InitialPos(g);p)} )
⊢ moves ∈ sequence(Pos(sg-normalize(g)))

Latex:

Latex:
.....assertion..... 1. g : SimpleGame 2. n : \mBbbN{} 3. 0 < n 4. win2strat(g;n - 1) \mequiv{} win2strat(sg-normalize(g);n - 1) 5. x : s:win2strat(sg-normalize(g);n - 1) \mcap{} moves:\{f:strat2play(sg-normalize(g);n - 1;s)| ||f|| = (2 * n)\} {}\mrightarrow{} \{p:Pos(sg-normalize(g))| Leg\000Cal2(moves[(2 * n) - 1];p)\} 6. x \mmember{} win2strat(sg-normalize(g);n - 1) 7. x \mmember{} moves:\{f:strat2play(sg-normalize(g);n - 1;x)| ||f|| = (2 * n)\} {}\mrightarrow{} \{p:Pos(sg-normalize(g))| Legal2(moves[(2 * n) - 1];p)\} 8. \mneg{}(n = 0) 9. \mneg{}(n = 0) 10. moves : strat2play(g;n - 1;x) 11. ||moves|| = (2 * n) 12. x \mmember{} win2strat(g;n - 1) 13. moves \mmember{} \{moves:sequence(Pos(g))| ((2 * (n - 1)) + 2) \mleq{} ||moves||\} 14. sequence(Pos(sg-normalize(g))) \msubseteq{}r sequence(Pos(g)) 15. (moves[0] = InitialPos(g)) \mwedge{} (\mforall{}i:\mBbbN{}(n - 1) + 1 ((\mdownarrow{}Legal1(moves[2 * i];moves[(2 * i) + 1])) \mwedge{} (i < n - 1 {}\mRightarrow{} ((\mdownarrow{}Legal2(moves[(2 * i) + 1];moves[2 * (i + 1)])) \mwedge{} (moves[2 * (i + 1)] = (x play-truncate(moves;2 * (i + 1)))))))) \mvdash{} moves \mmember{} sequence(Pos(sg-normalize(g))) By Latex: (InstLemma `strat2play-reachable` [\mkleeneopen{}g\mkleeneclose{};\mkleeneopen{}n - 1\mkleeneclose{};\mkleeneopen{}x\mkleeneclose{};\mkleeneopen{}moves\mkleeneclose{}]\mcdot{} THENA (Try ((RWO "11" 0 THEN Auto)) THEN Try (QuickAuto)) ) Home Index