Proof of Nuprl Lemma : count

Step * 2 2 of Lemma count_remove1

.....falsecase.....
1. s : DSet
2. b : |s|
3. c : |s|
4. u : |s|
5. v : |s| List
6. (c #∈ (v \ b)) = ((c #∈ v) -- b2i(b (=_b) c)) ∈ ℤ
7. ¬(u = b ∈ |s|)
⊢ (c #∈ [u / (v \ b)]) = ((b2i(u (=_b) c) + (c #∈ v)) -- b2i(b (=_b) c)) ∈ ℤ
BY
{ AbReduce 0 }

1
1. s : DSet
2. b : |s|
3. c : |s|
4. u : |s|
5. v : |s| List
6. (c #∈ (v \ b)) = ((c #∈ v) -- b2i(b (=_b) c)) ∈ ℤ
7. ¬(u = b ∈ |s|)

⊢ (b2i(u (=_b) c) + (c #∈ (v \ b))) = ((b2i(u (=_b) c) + (c #∈ v)) -- b2i(b (=_b) c)) ∈ ℤ

Latex:

Latex:
.....falsecase..... 1. s : DSet 2. b : |s| 3. c : |s| 4. u : |s| 5. v : |s| List 6. (c \#\mmember{} (v \mbackslash{} b)) = ((c \#\mmember{} v) -- b2i(b (=\msubb{}) c)) 7. \mneg{}(u = b) \mvdash{} (c \#\mmember{} [u / (v \mbackslash{} b)]) = ((b2i(u (=\msubb{}) c) + (c \#\mmember{} v)) -- b2i(b (=\msubb{}) c)) By Latex: AbReduce 0 Home Index