Proof of Nuprl Lemma : rel_inverse

Step * 2 2 1 1 of Lemma rel_inverse_exp

1. [T] : Type
2. [R] : T ⟶ T ⟶ ℙ
3. n : ℤ
4. [%1] : 0 < n
5. ∀x,y:T. (x R^n - 1^-1 y ⇐⇒ x R^-1^n - 1 y)
6. x : T
7. y : T
8. ¬(n = 0 ∈ ℤ)
9. z : T
10. z R x
11. z R^-1^n - 1 y
⊢ y R^n x
BY
{ ((AssertBY z R^n - 1^-1 y EasyHyp THEN Unfold `rel_inverse` (-1)) THEN Reduce (-1)) }

1
1. [T] : Type
2. [R] : T ⟶ T ⟶ ℙ
3. n : ℤ
4. [%1] : 0 < n
5. ∀x,y:T. (x R^n - 1^-1 y ⇐⇒ x R^-1^n - 1 y)
6. x : T
7. y : T
8. ¬(n = 0 ∈ ℤ)
9. z : T
10. z R x
11. z R^-1^n - 1 y
12. y R^n - 1 z
⊢ y R^n x

Latex:

Latex:
1. [T] : Type 2. [R] : T {}\mrightarrow{} T {}\mrightarrow{} \mBbbP{} 3. n : \mBbbZ{} 4. [\%1] : 0 < n 5. \mforall{}x,y:T. (x rel\_exp(T; R; n - 1)\^{}-1 y \mLeftarrow{}{}\mRightarrow{} x rel\_exp(T; R\^{}-1; n - 1) y) 6. x : T 7. y : T 8. \mneg{}(n = 0) 9. z : T 10. z R x 11. z rel\_exp(T; R\^{}-1; n - 1) y \mvdash{} y rel\_exp(T; R; n) x By Latex: ((AssertBY z rel\_exp(T; R; n - 1)\^{}-1 y EasyHyp THEN Unfold `rel\_inverse` (-1)) THEN Reduce (-1)) Home Index