Proof of Nuprl Lemma : fps-geometric-slice

Step * 2 1 of Lemma fps-geometric-slice_lemma2

1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. r : CRng
5. n : ℕ⁺
6. m : ℕn
7. ¬(m = 0 ∈ ℤ)
8. g : PowerSeries(X;r)
9. g = [g]_n ∈ PowerSeries(X;r)
10. IsRing(PowerSeries(X;r);λf,g. (f+g);0;λf.-(f);λf,g. (f*g);1)
11. 0 = fps-summation(r;upto(m + 1);k.([(1-g)]_k*[(1÷(1-g))]_m - k)) ∈ PowerSeries(X;r)
⊢ [(1÷(1-g))]_m = if (m =_z 0) then 1 else 0 fi  ∈ PowerSeries(X;r)
BY
{ xxx(Subst' fps-summation(r;upto(m + 1);k.([(1-g)]_k*[(1÷(1-g))]_m - k))
      = ([(1-g)]_0*[(1÷(1-g))]_m - 0)
      ∈ PowerSeries(X;r) -1
      THEN Auto
      )⋅xxx }

1
.....equality.....
1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. r : CRng
5. n : ℕ⁺
6. m : ℕn
7. ¬(m = 0 ∈ ℤ)
8. g : PowerSeries(X;r)
9. g = [g]_n ∈ PowerSeries(X;r)
10. IsRing(PowerSeries(X;r);λf,g. (f+g);0;λf.-(f);λf,g. (f*g);1)
11. 0 = fps-summation(r;upto(m + 1);k.([(1-g)]_k*[(1÷(1-g))]_m - k)) ∈ PowerSeries(X;r)

⊢ fps-summation(r;upto(m + 1);k.([(1-g)]_k*[(1÷(1-g))]_m - k)) = ([(1-g)]_0*[(1÷(1-g))]_m - 0) ∈ PowerSeries(X;r)

2
1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. r : CRng
5. n : ℕ⁺
6. m : ℕn
7. ¬(m = 0 ∈ ℤ)
8. g : PowerSeries(X;r)
9. g = [g]_n ∈ PowerSeries(X;r)
10. IsRing(PowerSeries(X;r);λf,g. (f+g);0;λf.-(f);λf,g. (f*g);1)
11. 0 = ([(1-g)]_0*[(1÷(1-g))]_m - 0) ∈ PowerSeries(X;r)
⊢ [(1÷(1-g))]_m = if (m =_z 0) then 1 else 0 fi ∈ PowerSeries(X;r)

Latex:

Latex:
1. X : Type 2. valueall-type(X) 3. eq : EqDecider(X) 4. r : CRng 5. n : \mBbbN{}\msupplus{} 6. m : \mBbbN{}n 7. \mneg{}(m = 0) 8. g : PowerSeries(X;r) 9. g = [g]\_n 10. IsRing(PowerSeries(X;r);\mlambda{}f,g. (f+g);0;\mlambda{}f.-(f);\mlambda{}f,g. (f*g);1) 11. 0 = fps-summation(r;upto(m + 1);k.([(1-g)]\_k*[(1\mdiv{}(1-g))]\_m - k)) \mvdash{} [(1\mdiv{}(1-g))]\_m = if (m =\msubz{} 0) then 1 else 0 fi By Latex: xxx(Subst' fps-summation(r;upto(m + 1);k.([(1-g)]\_k*[(1\mdiv{}(1-g))]\_m - k)) = ([(1-g)]\_0*[(1\mdiv{}(1-g))]\_m - 0) -1 THEN Auto )\mcdot{}xxx Home Index