Proof of Nuprl Lemma : KozenSilva-theorem

Step * 2 1 1 of Lemma KozenSilva-theorem

.....equality.....
1. r : CRng
2. x : Atom
3. y : Atom
4. ¬(x = y ∈ Atom)
5. h : PowerSeries(r)
6. d : ℕ ⟶ ℕ
7. k : ℤ
8. k ∈ ℕ
9. k ≠ 0
10. 0 < k
11. [Moessner-aux(r;x;y;h;d;k - 1)]_Σ(d i | i < k)

= ([h]_d 0(y:=(((k - 1) ⋅r 1)*atom(x)+atom(y)))*Π(i∈upto(k - 1)).((((k - 1 - i) ⋅r 1)*atom(x)+atom(y)))^(d (i + 1)))

∈ PowerSeries(r)
12. Σ(d i | i < k) ∈ ℕ
13. Σ(d i | i < k + 1) ∈ ℕ
⊢ [Moessner-aux(r;x;y;h;d;k - 1)]_Σ(d i | i < k)(y:=1)
= [[Moessner-aux(r;x;y;h;d;k - 1)]_Σ(d i | i < k)]_Σ(d i | i < k)(y:=1)
∈ PowerSeries(r)
BY
{ TACTIC:(RWO "fps-set-to-one-slice" 0 THEN Auto)⋅ }

Latex:

Latex:
.....equality..... 1. r : CRng 2. x : Atom 3. y : Atom 4. \mneg{}(x = y) 5. h : PowerSeries(r) 6. d : \mBbbN{} {}\mrightarrow{} \mBbbN{} 7. k : \mBbbZ{} 8. k \mmember{} \mBbbN{} 9. k \mneq{} 0 10. 0 < k 11. [Moessner-aux(r;x;y;h;d;k - 1)]\_\mSigma{}(d i | i < k) = ([h]\_d 0(y:=(((k - 1) \mcdot{}r 1)*atom(x)+atom(y)))*\mPi{}(i\mmember{}upto(k - 1)).((((k - 1 - i) \mcdot{}r 1)*atom(x)+atom(y)))\^{}(d (i + 1))) 12. \mSigma{}(d i | i < k) \mmember{} \mBbbN{} 13. \mSigma{}(d i | i < k + 1) \mmember{} \mBbbN{} \mvdash{} [Moessner-aux(r;x;y;h;d;k - 1)]\_\mSigma{}(d i | i < k)(y:=1) = [[Moessner-aux(r;x;y;h;d;k - 1)]\_\mSigma{}(d i | i < k)]\_\mSigma{}(d i | i < k)(y:=1) By Latex: TACTIC:(RWO "fps-set-to-one-slice" 0 THEN Auto)\mcdot{} Home Index