Proof of Nuprl Lemma : search

Step * 2 of Lemma search_succ

.....falsecase.....
1. k : ℕ
2. P : ℕk + 1 ⟶ 𝔹
3. (∃i:ℕk + 1. (↑(P i))) ⇒ 0 < search(k + 1;P)
4. (∃i:ℕk + 1. (↑(P i))) ⇐ 0 < search(k + 1;P)

5. (↑(P (search(k + 1;P) - 1))) ∧ (∀j:ℕk + 1. ¬↑(P j) supposing j < search(k + 1;P) - 1) supposing 0 < search(k + 1;P)

6. ¬↑(P 0)

⊢ search(k + 1;P) = if 0 <z search(k;λi.(P (i + 1))) then search(k;λi.(P (i + 1))) + 1 else 0 fi  ∈ ℤ

BY
{ (InstLemma `search_property` [k; λi.(P (i + 1))] THEN Auto) }

1
1. k : ℕ
2. P : ℕk + 1 ⟶ 𝔹
3. (∃i:ℕk + 1. (↑(P i))) ⇒ 0 < search(k + 1;P)
4. (∃i:ℕk + 1. (↑(P i))) ⇐ 0 < search(k + 1;P)

5. (↑(P (search(k + 1;P) - 1))) ∧ (∀j:ℕk + 1. ¬↑(P j) supposing j < search(k + 1;P) - 1) supposing 0 < search(k + 1;P)

6. ¬↑(P 0)
7. (∃i:ℕk. (↑((λi.(P (i + 1))) i))) ⇒ 0 < search(k;λi.(P (i + 1)))
8. (∃i:ℕk. (↑((λi.(P (i + 1))) i))) ⇐ 0 < search(k;λi.(P (i + 1)))
9. (↑((λi.(P (i + 1))) (search(k;λi.(P (i + 1))) - 1)))
∧ (∀j:ℕk. ¬↑((λi.(P (i + 1))) j) supposing j < search(k;λi.(P (i + 1))) - 1)
supposing 0 < search(k;λi.(P (i + 1)))

⊢ search(k + 1;P) = if 0 <z search(k;λi.(P (i + 1))) then search(k;λi.(P (i + 1))) + 1 else 0 fi  ∈ ℤ

Latex:

Latex:
.....falsecase..... 1. k : \mBbbN{} 2. P : \mBbbN{}k + 1 {}\mrightarrow{} \mBbbB{} 3. (\mexists{}i:\mBbbN{}k + 1. (\muparrow{}(P i))) {}\mRightarrow{} 0 < search(k + 1;P) 4. (\mexists{}i:\mBbbN{}k + 1. (\muparrow{}(P i))) \mLeftarrow{}{} 0 < search(k + 1;P) 5. (\muparrow{}(P (search(k + 1;P) - 1))) \mwedge{} (\mforall{}j:\mBbbN{}k + 1. \mneg{}\muparrow{}(P j) supposing j < search(k + 1;P) - 1) supposing 0 < search(k + 1;P) 6. \mneg{}\muparrow{}(P 0) \mvdash{} search(k + 1;P) = if 0 <z search(k;\mlambda{}i.(P (i + 1))) then search(k;\mlambda{}i.(P (i + 1))) + 1 else 0 fi By Latex: (InstLemma `search\_property` [k; \mlambda{}i.(P (i + 1))] THEN Auto) Home Index