Proof of Nuprl Lemma : ws-monotone

Step * 1 2 1 1 2 1 1 of Lemma ws-monotone

1. d : ℤ
2. 0 < d
3. ∀p:ℚ List
     ((||p|| ≤ (d - 1))
     ⇒ (∀F,G:ℕ||p|| ─→ ℚ.
           ((∀q:ℚ. ((q ∈ p) ⇒ (0 ≤ q))) ⇒ (∀x:ℕ||p||. ((F x) ≤ (G x))) ⇒ (weighted-sum(p;F) ≤ weighted-sum(p;G)))))
4. u : ℚ
5. v : ℚ List
6. (||v|| + 1) ≤ d@i
7. F : ℕ||v|| + 1 ─→ ℚ@i
8. G : ℕ||v|| + 1 ─→ ℚ@i
9. ∀q:ℚ. ((q ∈ [u / v]) ⇒ (0 ≤ q))@i
10. ∀x:ℕ||v|| + 1. ((F x) ≤ (G x))@i
11. weighted-sum(v;λi.(F (i + 1))) ≤ weighted-sum(v;λi.(G (i + 1)))
12. ((F 0) * u) ≤ ((G 0) * u)

13. (((F 0) * u) + weighted-sum(v;λi.(F (i + 1)))) ≤ (((F 0) * u) + weighted-sum(v;λi.(G (i + 1))))

14. (((F 0) * u) + weighted-sum(v;λi.(G (i + 1)))) ≤ (((G 0) * u) + weighted-sum(v;λi.(G (i + 1))))

⊢ (((F 0) * u) + weighted-sum(v;λi.(F (i + 1)))) ≤ (((G 0) * u) + weighted-sum(v;λi.(G (i + 1))))

BY
{ (RelRST THEN Auto') }

Latex:

1. d : \mBbbZ{} 2. 0 < d 3. \mforall{}p:\mBbbQ{} List ((||p|| \mleq{} (d - 1)) {}\mRightarrow{} (\mforall{}F,G:\mBbbN{}||p|| {}\mrightarrow{} \mBbbQ{}. ((\mforall{}q:\mBbbQ{}. ((q \mmember{} p) {}\mRightarrow{} (0 \mleq{} q))) {}\mRightarrow{} (\mforall{}x:\mBbbN{}||p||. ((F x) \mleq{} (G x))) {}\mRightarrow{} (weighted-sum(p;F) \mleq{} weighted-sum(p;G))))) 4. u : \mBbbQ{} 5. v : \mBbbQ{} List 6. (||v|| + 1) \mleq{} d@i 7. F : \mBbbN{}||v|| + 1 {}\mrightarrow{} \mBbbQ{}@i 8. G : \mBbbN{}||v|| + 1 {}\mrightarrow{} \mBbbQ{}@i 9. \mforall{}q:\mBbbQ{}. ((q \mmember{} [u / v]) {}\mRightarrow{} (0 \mleq{} q))@i 10. \mforall{}x:\mBbbN{}||v|| + 1. ((F x) \mleq{} (G x))@i 11. weighted-sum(v;\mlambda{}i.(F (i + 1))) \mleq{} weighted-sum(v;\mlambda{}i.(G (i + 1))) 12. ((F 0) * u) \mleq{} ((G 0) * u) 13. (((F 0) * u) + weighted-sum(v;\mlambda{}i.(F (i + 1)))) \mleq{} (((F 0) * u) + weighted-sum(v;\mlambda{}i.(G (i + 1)))) 14. (((F 0) * u) + weighted-sum(v;\mlambda{}i.(G (i + 1)))) \mleq{} (((G 0) * u) + weighted-sum(v;\mlambda{}i.(G (i + 1)))) \mvdash{} (((F 0) * u) + weighted-sum(v;\mlambda{}i.(F (i + 1)))) \mleq{} (((G 0) * u) + weighted-sum(v;\mlambda{}i.(G (i + 1)))) By (RelRST THEN Auto') Home Index