Proof of Nuprl Lemma : fps-mul-slice

Step * 1 1 2 1 1 2 of Lemma fps-mul-slice

1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. r : CRng
5. n : ℕ
6. f : PowerSeries(X;r)
7. g : PowerSeries(X;r)
8. Assoc(|r|;+r)
9. Comm(|r|;+r)
10. x : bag(X)
11. upto(n + 1) ∈ bag(ℕ)
12. IsMonoid(|r|;+r;0)
13. #(x) = n ∈ ℤ
14. IsMonoid(|r|;+r;0)
15. Comm(|r|;+r)
16. p : bag(X) × bag(X)
17. p ↓∈ bag-partitions(eq;x)
18. p ↓∈ bag-partitions(eq;x)
19. #(fst(p)) ↓∈ upto(n + 1)
20. #(fst(p)) = #(fst(p)) ∈ ℤ
⊢ #(snd(p)) = (n - #(fst(p))) ∈ ℤ
BY
{ (RW assert_pushdownC 0 THEN Auto) }

1
1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. r : CRng
5. n : ℕ
6. f : PowerSeries(X;r)
7. g : PowerSeries(X;r)
8. Assoc(|r|;+r)
9. Comm(|r|;+r)
10. x : bag(X)
11. upto(n + 1) ∈ bag(ℕ)
12. IsMonoid(|r|;+r;0)
13. #(x) = n ∈ ℤ
14. IsMonoid(|r|;+r;0)
15. Comm(|r|;+r)
16. p : bag(X) × bag(X)
17. p ↓∈ bag-partitions(eq;x)
18. p ↓∈ bag-partitions(eq;x)
19. #(fst(p)) ↓∈ upto(n + 1)
20. #(fst(p)) = #(fst(p)) ∈ ℤ
⊢ #(snd(p)) = (n - #(fst(p))) ∈ ℤ

Latex:

Latex:
1. X : Type 2. valueall-type(X) 3. eq : EqDecider(X) 4. r : CRng 5. n : \mBbbN{} 6. f : PowerSeries(X;r) 7. g : PowerSeries(X;r) 8. Assoc(|r|;+r) 9. Comm(|r|;+r) 10. x : bag(X) 11. upto(n + 1) \mmember{} bag(\mBbbN{}) 12. IsMonoid(|r|;+r;0) 13. \#(x) = n 14. IsMonoid(|r|;+r;0) 15. Comm(|r|;+r) 16. p : bag(X) \mtimes{} bag(X) 17. p \mdownarrow{}\mmember{} bag-partitions(eq;x) 18. p \mdownarrow{}\mmember{} bag-partitions(eq;x) 19. \#(fst(p)) \mdownarrow{}\mmember{} upto(n + 1) 20. \#(fst(p)) = \#(fst(p)) \mvdash{} \#(snd(p)) = (n - \#(fst(p))) By Latex: (RW assert\_pushdownC 0 THEN Auto) Home Index