Proof of Nuprl Lemma : wilson-theorem

Step * 1 1 2 3 1 of Lemma wilson-theorem

1. n : {i:ℤ| 1 < i}
2. prime(n)
3. ∀b:ℕn. ((rotate-by(n;1) (rotate-by(n;n - 1) b)) = b ∈ ℕn)
4. ∀b:ℕn. ((rotate-by(n;n - 1) (rotate-by(n;1) b)) = b ∈ ℕn)
5. cyclic-map(ℕn) ~ ℕ(n - 1)!
6. Inj(cyclic-map(ℕn);cyclic-map(ℕn);λf.(rotate-by(n;n - 1) o (f o rotate-by(n;1))))

7. {x:cyclic-map(ℕn)| (rotate-by(n;n - 1) o (x o rotate-by(n;1))) = x ∈ cyclic-map(ℕn)}  ~ ℕn - 1

8. x : ℕn →⟶ ℕn
9. ∀x@0,y:ℕn. ∃n@0:ℕ. ((x^n@0 x@0) = y ∈ ℕn)
⊢ x = (λf.(rotate-by(n;n - 1) o (f o rotate-by(n;1)))^n x) ∈ ℕn →⟶ ℕn
BY
{ ((D (-2) THEN EqTypeCD) THEN Auto THEN RenameVar `f' (-3)) }

1
1. n : {i:ℤ| 1 < i}
2. prime(n)
3. ∀b:ℕn. ((rotate-by(n;1) (rotate-by(n;n - 1) b)) = b ∈ ℕn)
4. ∀b:ℕn. ((rotate-by(n;n - 1) (rotate-by(n;1) b)) = b ∈ ℕn)
5. cyclic-map(ℕn) ~ ℕ(n - 1)!
6. Inj(cyclic-map(ℕn);cyclic-map(ℕn);λf.(rotate-by(n;n - 1) o (f o rotate-by(n;1))))

7. {x:cyclic-map(ℕn)| (rotate-by(n;n - 1) o (x o rotate-by(n;1))) = x ∈ cyclic-map(ℕn)}  ~ ℕn - 1

8. f : ℕn ⟶ ℕn
9. Inj(ℕn;ℕn;f)
10. ∀x@0,y:ℕn. ∃n@0:ℕ. ((f^n@0 x@0) = y ∈ ℕn)
⊢ f = (λf.(rotate-by(n;n - 1) o (f o rotate-by(n;1)))^n f) ∈ (ℕn ⟶ ℕn)

Latex:

Latex:
1. n : \{i:\mBbbZ{}| 1 < i\} 2. prime(n) 3. \mforall{}b:\mBbbN{}n. ((rotate-by(n;1) (rotate-by(n;n - 1) b)) = b) 4. \mforall{}b:\mBbbN{}n. ((rotate-by(n;n - 1) (rotate-by(n;1) b)) = b) 5. cyclic-map(\mBbbN{}n) \msim{} \mBbbN{}(n - 1)! 6. Inj(cyclic-map(\mBbbN{}n);cyclic-map(\mBbbN{}n);\mlambda{}f.(rotate-by(n;n - 1) o (f o rotate-by(n;1)))) 7. \{x:cyclic-map(\mBbbN{}n)| (rotate-by(n;n - 1) o (x o rotate-by(n;1))) = x\} \msim{} \mBbbN{}n - 1 8. x : \mBbbN{}n \mrightarrow{}{}\mrightarrow{} \mBbbN{}n 9. \mforall{}x@0,y:\mBbbN{}n. \mexists{}n@0:\mBbbN{}. ((x\^{}n@0 x@0) = y) \mvdash{} x = (\mlambda{}f.(rotate-by(n;n - 1) o (f o rotate-by(n;1)))\^{}n x) By Latex: ((D (-2) THEN EqTypeCD) THEN Auto THEN RenameVar `f' (-3)) Home Index