Proof of Nuprl Lemma : fps-deriv-single

Step * 2 of Lemma fps-deriv-single

1. X : Type
2. eq : EqDecider(X)
3. r : CRng
4. b : bag(X)
5. x : X
6. b1 : bag(X)
7. ¬(x.b1 = b ∈ bag(X))
8. (b = ({x} + bag-drop(eq;b;x)) ∈ bag(X)) ∨ ((¬x ↓∈ b) ∧ (b = bag-drop(eq;b;x) ∈ bag(X)))
⊢ (int-to-ring(r;(#x in b1) + 1) * 0)
= (int-to-ring(r;(#x in b)) * if bag-eq(eq;b1;bag-drop(eq;b;x)) then 1 else 0 fi )
∈ |r|
BY
{ AutoSplit }

1
1. X : Type
2. eq : EqDecider(X)
3. r : CRng
4. b : bag(X)
5. x : X
6. b1 : bag(X)
7. ¬(x.b1 = b ∈ bag(X))
8. (b = ({x} + bag-drop(eq;b;x)) ∈ bag(X)) ∨ ((¬x ↓∈ b) ∧ (b = bag-drop(eq;b;x) ∈ bag(X)))
9. b1 = bag-drop(eq;b;x) ∈ bag(X)
⊢ (int-to-ring(r;(#x in b1) + 1) * 0) = (int-to-ring(r;(#x in b)) * 1) ∈ |r|

Latex:

Latex:
1. X : Type 2. eq : EqDecider(X) 3. r : CRng 4. b : bag(X) 5. x : X 6. b1 : bag(X) 7. \mneg{}(x.b1 = b) 8. (b = (\{x\} + bag-drop(eq;b;x))) \mvee{} ((\mneg{}x \mdownarrow{}\mmember{} b) \mwedge{} (b = bag-drop(eq;b;x))) \mvdash{} (int-to-ring(r;(\#x in b1) + 1) * 0) = (int-to-ring(r;(\#x in b)) * if bag-eq(eq;b1;bag-drop(eq;b;x)) then 1 else 0 fi ) By Latex: AutoSplit Home Index