Proof of Nuprl Lemma : cubic_converge

Step * 1 2 1 2 of Lemma cubic_converge_wf

1. b : {9...}
2. m : ℕ
3. ¬(m ≤ b)
4. ∀m:ℕm. (cubic_converge(b;m) ∈ {n:ℕ| m ≤ b^3^n} )
5. r : ℤ
6. iroot(3;m) = r ∈ ℤ
7. (r^3 ≤ m) ∧ m < r + 1^3
8. cubic_converge(b;r + 1) ∈ {n:ℕ| (r + 1) ≤ b^3^n}
⊢ eval n = cubic_converge(b;r + 1) in
n + 1 ∈ {n:ℕ| m ≤ b^3^n}
BY
{ ((GenConclTerm ⌜cubic_converge(b;r + 1)⌝⋅ THENA Auto) THEN (CallByValueReduce 0 THENA Auto)) }

1
1. b : {9...}
2. m : ℕ
3. ¬(m ≤ b)
4. ∀m:ℕm. (cubic_converge(b;m) ∈ {n:ℕ| m ≤ b^3^n} )
5. r : ℤ
6. iroot(3;m) = r ∈ ℤ
7. (r^3 ≤ m) ∧ m < r + 1^3
8. cubic_converge(b;r + 1) ∈ {n:ℕ| (r + 1) ≤ b^3^n}
9. v : {n:ℕ| (r + 1) ≤ b^3^n}
10. cubic_converge(b;r + 1) = v ∈ {n:ℕ| (r + 1) ≤ b^3^n}
⊢ v + 1 ∈ {n:ℕ| m ≤ b^3^n}

Latex:

Latex:
1. b : \{9...\} 2. m : \mBbbN{} 3. \mneg{}(m \mleq{} b) 4. \mforall{}m:\mBbbN{}m. (cubic\_converge(b;m) \mmember{} \{n:\mBbbN{}| m \mleq{} b\^{}3\^{}n\} ) 5. r : \mBbbZ{} 6. iroot(3;m) = r 7. (r\^{}3 \mleq{} m) \mwedge{} m < r + 1\^{}3 8. cubic\_converge(b;r + 1) \mmember{} \{n:\mBbbN{}| (r + 1) \mleq{} b\^{}3\^{}n\} \mvdash{} eval n = cubic\_converge(b;r + 1) in n + 1 \mmember{} \{n:\mBbbN{}| m \mleq{} b\^{}3\^{}n\} By Latex: ((GenConclTerm \mkleeneopen{}cubic\_converge(b;r + 1)\mkleeneclose{}\mcdot{} THENA Auto) THEN (CallByValueReduce 0 THENA Auto)) Home Index