Proof of Nuprl Lemma : WfdSpread-induction

Step * 2 1 1 2 1 1 of Lemma WfdSpread-induction

1. Pos : Type
2. eq : EqDecider(Pos)
3. Mv : Pos ⟶ Type
4. n : ℤ
5. n + 1 ≠ 0
6. 0 < n

7. ∀w:WfdSpread(Pos;a.Mv[a]). ∀s:ℕn - 1 ⟶ MoveChoice(Pos;a.Mv[a]). ∀a:Pos. ∀f:Mv[a] ⟶ WfdSpread(Pos;a.Mv[a]).

((W_sel(w;n - 1;s) = (inl mkW(a;f)) ∈ (WfdSpread(Pos;a.Mv[a])?))
⇒ (∀m:Mv[a]

           (W_sel(w;(n - 1) + 1;s++λb.if eq b a then inl m else inr ⋅  fi ) = (inl (f m)) ∈ (WfdSpread(Pos;a.Mv[a])?))))

8. w : WfdSpread(Pos;a.Mv[a])@i
9. s : ℕn ⟶ MoveChoice(Pos;a.Mv[a])@i
10. a : Pos@i
11. f : Mv[a] ⟶ WfdSpread(Pos;a.Mv[a])@i
12. m : Mv[a]@i
13. ¬(n = 0 ∈ ℤ)
14. WfdSpread(Pos;a.Mv[a]) ≡ a:Pos × (Mv[a] ⟶ WfdSpread(Pos;a.Mv[a]))
15. a1 : Pos@i
16. z1 : Mv[a1] ⟶ WfdSpread(Pos;a.Mv[a])@i
17. w = <a1, z1> ∈ (a:Pos × (Mv[a] ⟶ WfdSpread(Pos;a.Mv[a])))
18. x : Mv[a1]@i
19. (s 0 a1) = (inl x) ∈ (Mv[a1]?)
20. W_sel(z1 x;n - 1;λi.(s (i + 1))) = (inl mkW(a;f)) ∈ (WfdSpread(Pos;a.Mv[a])?)
⊢ W_sel(z1 x;(n + 1) - 1;λi.if (i + 1) < (n)
then s (i + 1)

                               else if (i + 1) < (n + 1)  then λb.if eq b a then inl m else inr ⋅  fi   else ⊥)

= (inl (f m))
∈ (WfdSpread(Pos;a.Mv[a])?)
BY

{ TACTIC:TACTIC:((Assert W_sel(z1 x;(n - 1) + 1;λi.(s (i + 1))++λb.if eq b a then inl m else inr ⋅  fi )

                        = (inl (f m))
                        ∈ (WfdSpread(Pos;a.Mv[a])?) BY
                        Auto)
                 THEN NthHypEq (-1)
                 THEN RepeatFor 2 ((EqCD THEN Auto))
                 THEN Ext
                 THEN RepUR ``seq-adjoin seq-append`` 0
                 THEN Auto
                 THEN AutoSplit) }

Latex:

Latex:
1. Pos : Type 2. eq : EqDecider(Pos) 3. Mv : Pos {}\mrightarrow{} Type 4. n : \mBbbZ{} 5. n + 1 \mneq{} 0 6. 0 < n 7. \mforall{}w:WfdSpread(Pos;a.Mv[a]). \mforall{}s:\mBbbN{}n - 1 {}\mrightarrow{} MoveChoice(Pos;a.Mv[a]). \mforall{}a:Pos. \mforall{}f:Mv[a] {}\mrightarrow{} WfdSpread(Pos;a.Mv[a]). ((W\_sel(w;n - 1;s) = (inl mkW(a;f))) {}\mRightarrow{} (\mforall{}m:Mv[a]. (W\_sel(w;(n - 1) + 1;s++\mlambda{}b.if eq b a then inl m else inr \mcdot{} fi ) = (inl (f m))))) 8. w : WfdSpread(Pos;a.Mv[a])@i 9. s : \mBbbN{}n {}\mrightarrow{} MoveChoice(Pos;a.Mv[a])@i 10. a : Pos@i 11. f : Mv[a] {}\mrightarrow{} WfdSpread(Pos;a.Mv[a])@i 12. m : Mv[a]@i 13. \mneg{}(n = 0) 14. WfdSpread(Pos;a.Mv[a]) \mequiv{} a:Pos \mtimes{} (Mv[a] {}\mrightarrow{} WfdSpread(Pos;a.Mv[a])) 15. a1 : Pos@i 16. z1 : Mv[a1] {}\mrightarrow{} WfdSpread(Pos;a.Mv[a])@i 17. w = <a1, z1> 18. x : Mv[a1]@i 19. (s 0 a1) = (inl x) 20. W\_sel(z1 x;n - 1;\mlambda{}i.(s (i + 1))) = (inl mkW(a;f)) \mvdash{} W\_sel(z1 x;(n + 1) - 1;\mlambda{}i.if (i + 1) < (n) then s (i + 1) else if (i + 1) < (n + 1) then \mlambda{}b.if eq b a then inl m else inr \mcdot{} fi else \mbot{}) = (inl (f m)) By Latex: TACTIC:TACTIC:((Assert W\_sel(z1 x;(n - 1) + 1;\mlambda{}i.(s (i + 1))++\mlambda{}b.if eq b a then inl m else inr \mcdot{} fi ) = (inl (f m)) BY Auto) THEN NthHypEq (-1) THEN RepeatFor 2 ((EqCD THEN Auto)) THEN Ext THEN RepUR ``seq-adjoin seq-append`` 0 THEN Auto THEN AutoSplit) Home Index