Proof of Nuprl Lemma : divisor-in-range

Step * 2 1 2 1 of Lemma divisor-in-range

1. n : {2...}
2. [n@0] : ℕ
3. ∀[m:ℕn@0]
∀i:{1...}. ∀j:{i..i + m^-}.

       (∃m:ℤ [(m < n ∧ (2 ≤ m) ∧ (m | n))]) ∨ (¬(∃m:ℤ [((2 ≤ m) ∧ (i ≤ m) ∧ (m ≤ j) ∧ (m | n))])) supposing j < n

4. i : {1...}
5. j : {i..i + n@0^-}
6. j < n
7. p : ℤ
8. p = iseg_product_rem(i;j;n) ∈ ℤ
9. g : ℤ
10. g = gcd(n;iseg_product(i;j)) ∈ ℤ
11. 1 < g
12. ¬g < n
13. i < j

⊢ (∃m:ℤ [(m < n ∧ (2 ≤ m) ∧ (m | n))]) ∨ (¬(∃m:ℤ [((2 ≤ m) ∧ (i ≤ m) ∧ (m ≤ j) ∧ (m | n))]))

BY
{ (Assert (i ≤ (i + ((j - i) ÷ 2))) ∧ i + ((j - i) ÷ 2) < j BY
         ((InstLemma `div_rem_sum` [⌜j - i⌝;⌜2⌝]⋅ THENA Auto)
          THEN (InstLemma `rem_bounds_1` [⌜j - i⌝;⌜2⌝]⋅ THENA Auto)
          THEN Auto'))⋅ }

1
1. n : {2...}
2. [n@0] : ℕ
3. ∀[m:ℕn@0]
     ∀i:{1...}. ∀j:{i..i + m^-}.

       (∃m:ℤ [(m < n ∧ (2 ≤ m) ∧ (m | n))]) ∨ (¬(∃m:ℤ [((2 ≤ m) ∧ (i ≤ m) ∧ (m ≤ j) ∧ (m | n))])) supposing j < n

4. i : {1...}
5. j : {i..i + n@0^-}
6. j < n
7. p : ℤ
8. p = iseg_product_rem(i;j;n) ∈ ℤ
9. g : ℤ
10. g = gcd(n;iseg_product(i;j)) ∈ ℤ
11. 1 < g
12. ¬g < n
13. i < j
14. (i ≤ (i + ((j - i) ÷ 2))) ∧ i + ((j - i) ÷ 2) < j

⊢ (∃m:ℤ [(m < n ∧ (2 ≤ m) ∧ (m | n))]) ∨ (¬(∃m:ℤ [((2 ≤ m) ∧ (i ≤ m) ∧ (m ≤ j) ∧ (m | n))]))

Latex:

Latex:
1. n : \{2...\} 2. [n@0] : \mBbbN{} 3. \mforall{}[m:\mBbbN{}n@0] \mforall{}i:\{1...\}. \mforall{}j:\{i..i + m\msupminus{}\}. (\mexists{}m:\mBbbZ{} [(m < n \mwedge{} (2 \mleq{} m) \mwedge{} (m | n))]) \mvee{} (\mneg{}(\mexists{}m:\mBbbZ{} [((2 \mleq{} m) \mwedge{} (i \mleq{} m) \mwedge{} (m \mleq{} j) \mwedge{} (m | n))])) supposing j < n 4. i : \{1...\} 5. j : \{i..i + n@0\msupminus{}\} 6. j < n 7. p : \mBbbZ{} 8. p = iseg\_product\_rem(i;j;n) 9. g : \mBbbZ{} 10. g = gcd(n;iseg\_product(i;j)) 11. 1 < g 12. \mneg{}g < n 13. i < j \mvdash{} (\mexists{}m:\mBbbZ{} [(m < n \mwedge{} (2 \mleq{} m) \mwedge{} (m | n))]) \mvee{} (\mneg{}(\mexists{}m:\mBbbZ{} [((2 \mleq{} m) \mwedge{} (i \mleq{} m) \mwedge{} (m \mleq{} j) \mwedge{} (m | n))])) By Latex: (Assert (i \mleq{} (i + ((j - i) \mdiv{} 2))) \mwedge{} i + ((j - i) \mdiv{} 2) < j BY ((InstLemma `div\_rem\_sum` [\mkleeneopen{}j - i\mkleeneclose{};\mkleeneopen{}2\mkleeneclose{}]\mcdot{} THENA Auto) THEN (InstLemma `rem\_bounds\_1` [\mkleeneopen{}j - i\mkleeneclose{};\mkleeneopen{}2\mkleeneclose{}]\mcdot{} THENA Auto) THEN Auto'))\mcdot{} Home Index