Proof of Nuprl Lemma : remove-singularity-seq-mcauchy

Step * 1 of Lemma remove-singularity-seq-mcauchy

1. [X] : Type
2. [d] : metric(X)
3. [k] : ℕ
4. [f] : {p:ℝ^k| r0 < ||p||}  ⟶ X
5. [z] : X
6. c : {c:ℝ| r0 ≤ c}
7. ∀m:ℕ⁺. ∀p:{p:ℝ^k| r0 < ||p||} .  ((||p|| ≤ (r(4)/r(m))) ⇒ (mdist(d;f p;z) ≤ (c/r(m))))
8. [p] : ℝ^k
9. b : ℕ⁺
⊢ ∃N:ℕ [(∀n,m:ℕ.
           ((N ≤ n)
           ⇒ (N ≤ m)
           ⇒ (mdist(d;remove-singularity-seq(k;p;f;z) n;remove-singularity-seq(k;p;f;z) m) ≤ (r1/r(b)))))]
BY
{ Assert ⌜∃N:ℕ⁺. ((c/r(N)) ≤ (r1/r(b)))⌝⋅ }

1
.....assertion.....
1. [X] : Type
2. [d] : metric(X)
3. [k] : ℕ
4. [f] : {p:ℝ^k| r0 < ||p||}  ⟶ X
5. [z] : X
6. c : {c:ℝ| r0 ≤ c}
7. ∀m:ℕ⁺. ∀p:{p:ℝ^k| r0 < ||p||} .  ((||p|| ≤ (r(4)/r(m))) ⇒ (mdist(d;f p;z) ≤ (c/r(m))))
8. [p] : ℝ^k
9. b : ℕ⁺
⊢ ∃N:ℕ⁺. ((c/r(N)) ≤ (r1/r(b)))

2
1. [X] : Type
2. [d] : metric(X)
3. [k] : ℕ
4. [f] : {p:ℝ^k| r0 < ||p||}  ⟶ X
5. [z] : X
6. c : {c:ℝ| r0 ≤ c}
7. ∀m:ℕ⁺. ∀p:{p:ℝ^k| r0 < ||p||} .  ((||p|| ≤ (r(4)/r(m))) ⇒ (mdist(d;f p;z) ≤ (c/r(m))))
8. [p] : ℝ^k
9. b : ℕ⁺
10. ∃N:ℕ⁺. ((c/r(N)) ≤ (r1/r(b)))
⊢ ∃N:ℕ [(∀n,m:ℕ.
           ((N ≤ n)
           ⇒ (N ≤ m)
           ⇒ (mdist(d;remove-singularity-seq(k;p;f;z) n;remove-singularity-seq(k;p;f;z) m) ≤ (r1/r(b)))))]

Latex:

Latex:
1. [X] : Type 2. [d] : metric(X) 3. [k] : \mBbbN{} 4. [f] : \{p:\mBbbR{}\^{}k| r0 < ||p||\} {}\mrightarrow{} X 5. [z] : X 6. c : \{c:\mBbbR{}| r0 \mleq{} c\} 7. \mforall{}m:\mBbbN{}\msupplus{}. \mforall{}p:\{p:\mBbbR{}\^{}k| r0 < ||p||\} . ((||p|| \mleq{} (r(4)/r(m))) {}\mRightarrow{} (mdist(d;f p;z) \mleq{} (c/r(m)))) 8. [p] : \mBbbR{}\^{}k 9. b : \mBbbN{}\msupplus{} \mvdash{} \mexists{}N:\mBbbN{} [(\mforall{}n,m:\mBbbN{}. ((N \mleq{} n) {}\mRightarrow{} (N \mleq{} m) {}\mRightarrow{} (mdist(d;remove-singularity-seq(k;p;f;z) n;remove-singularity-seq(k;p;f;z) m) \mleq{} (r1/r(b)))))] By Latex: Assert \mkleeneopen{}\mexists{}N:\mBbbN{}\msupplus{}. ((c/r(N)) \mleq{} (r1/r(b)))\mkleeneclose{}\mcdot{} Home Index