Proof of Nuprl Lemma : reals-uncountable

Step * 1 2 1 2 4 2 of Lemma reals-uncountable

1. z : ℕ ⟶ ℝ
2. x : ℝ
3. y : ℝ
4. x < y
5. X : ℕ ⟶ ℝ
6. Y : ℕ ⟶ ℝ
7. (X 0) = x ∈ ℝ
8. (Y 0) = y ∈ ℝ
9. ∀n:ℕ
     (((X n) ≤ (X (n + 1)))
     ∧ ((X (n + 1)) < (Y (n + 1)))
     ∧ ((Y (n + 1)) ≤ (Y n))
     ∧ (((z n) < (X (n + 1))) ∨ ((Y (n + 1)) < (z n)))
     ∧ (((Y (n + 1)) - X (n + 1)) < (r1/r(n + 1))))
10. ∀i,j:ℕ.  ((i ≤ j) ⇒ (((X i) ≤ (X j)) ∧ ((X j) < (Y j)) ∧ ((Y j) ≤ (Y i))))
11. ∀n:ℕ. (((Y (n + 1)) - X (n + 1)) < (r1/r(n + 1)))
12. u : ℝ
13. lim n→∞.X[n] = u
14. lim n→∞.Y[n] = u
15. x ≤ u
⊢ u ≤ y
BY
{ (InstLemma `rleq-limit` [⌜Y⌝;⌜λ₂n.Y 0⌝;⌜u⌝;⌜y⌝]⋅ THEN Auto)⋅ }

Latex:

Latex:
1. z : \mBbbN{} {}\mrightarrow{} \mBbbR{} 2. x : \mBbbR{} 3. y : \mBbbR{} 4. x < y 5. X : \mBbbN{} {}\mrightarrow{} \mBbbR{} 6. Y : \mBbbN{} {}\mrightarrow{} \mBbbR{} 7. (X 0) = x 8. (Y 0) = y 9. \mforall{}n:\mBbbN{} (((X n) \mleq{} (X (n + 1))) \mwedge{} ((X (n + 1)) < (Y (n + 1))) \mwedge{} ((Y (n + 1)) \mleq{} (Y n)) \mwedge{} (((z n) < (X (n + 1))) \mvee{} ((Y (n + 1)) < (z n))) \mwedge{} (((Y (n + 1)) - X (n + 1)) < (r1/r(n + 1)))) 10. \mforall{}i,j:\mBbbN{}. ((i \mleq{} j) {}\mRightarrow{} (((X i) \mleq{} (X j)) \mwedge{} ((X j) < (Y j)) \mwedge{} ((Y j) \mleq{} (Y i)))) 11. \mforall{}n:\mBbbN{}. (((Y (n + 1)) - X (n + 1)) < (r1/r(n + 1))) 12. u : \mBbbR{} 13. lim n\mrightarrow{}\minfty{}.X[n] = u 14. lim n\mrightarrow{}\minfty{}.Y[n] = u 15. x \mleq{} u \mvdash{} u \mleq{} y By Latex: (InstLemma `rleq-limit` [\mkleeneopen{}Y\mkleeneclose{};\mkleeneopen{}\mlambda{}\msubtwo{}n.Y 0\mkleeneclose{};\mkleeneopen{}u\mkleeneclose{};\mkleeneopen{}y\mkleeneclose{}]\mcdot{} THEN Auto)\mcdot{} Home Index