Step
*
1
2
1
2
of Lemma
gen_log_aux_wf
1. d : ℕ
2. ∀d:ℕd
∀[p,c:ℕ+]. ∀[x:{2...}]. ∀[i,n:ℕ]. ∀[M:ℤ].
((M ≤ (d + (c * p))) ⇒ (gen_log_aux(p;c;x;i;n;M) ∈ {k:{n...}| M ≤ ((c + ((k - n) * i)) * p * x^(k - n))} ))
3. p : ℕ+
4. c : ℕ+
5. x : {2...}
6. i : ℕ
7. n : ℕ
8. M : ℤ
9. ¬(M ≤ (c * p))
10. M ≤ (d + (c * p))
11. gen_log_aux(x * p;c + i;x;i;n + 1;M) ∈ {k:{n + 1...}|
M ≤ (((c + i) + ((k - n + 1) * i)) * (x * p) * x^(k - n + 1))}
⊢ gen_log_aux(x * p;c + i;x;i;n + 1;M) ∈ {k:{n...}| M ≤ ((c + ((k - n) * i)) * p * x^(k - n))}
BY
{ ((DoSubsume THEN Auto) THEN (D 0 THENA Auto)) }
Latex:
Latex:
1. d : \mBbbN{}
2. \mforall{}d:\mBbbN{}d
\mforall{}[p,c:\mBbbN{}\msupplus{}]. \mforall{}[x:\{2...\}]. \mforall{}[i,n:\mBbbN{}]. \mforall{}[M:\mBbbZ{}].
((M \mleq{} (d + (c * p)))
{}\mRightarrow{} (gen\_log\_aux(p;c;x;i;n;M) \mmember{} \{k:\{n...\}| M \mleq{} ((c + ((k - n) * i)) * p * x\^{}(k - n))\} ))
3. p : \mBbbN{}\msupplus{}
4. c : \mBbbN{}\msupplus{}
5. x : \{2...\}
6. i : \mBbbN{}
7. n : \mBbbN{}
8. M : \mBbbZ{}
9. \mneg{}(M \mleq{} (c * p))
10. M \mleq{} (d + (c * p))
11. gen\_log\_aux(x * p;c + i;x;i;n + 1;M) \mmember{} \{k:\{n + 1...\}|
M \mleq{} (((c + i) + ((k - n + 1) * i))
* (x * p)
* x\^{}(k - n + 1))\}
\mvdash{} gen\_log\_aux(x * p;c + i;x;i;n + 1;M) \mmember{} \{k:\{n...\}| M \mleq{} ((c + ((k - n) * i)) * p * x\^{}(k - n))\}
By
Latex:
((DoSubsume THEN Auto) THEN (D 0 THENA Auto))
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