Proof of Nuprl Lemma : isl-apply-alist

Step * 1 1 of Lemma isl-apply-alist

.....assertion.....
1. [A] : Type
2. [T] : Type
3. eq : EqDecider(T)
4. x : T
5. L : (T × A) List
6. apply-alist(eq;L;x) ~ ff supposing ¬(x ∈ map(λp.(fst(p));L))
7. ∀[i:ℕ||L||]

     (apply-alist(eq;L;x) ~ inl (snd(L[i]))) supposing (((fst(L[i])) = x ∈ T) and (∀j:ℕi. (¬((fst(L[j])) = x ∈ T))))

8. ∀a,b:T. Dec(a = b ∈ T)
9. (x ∈ map(λp.(fst(p));L))
⊢ ∃i:ℕ||L||. (((fst(L[i])) = x ∈ T) ∧ (∀j:ℕi. (¬((fst(L[j])) = x ∈ T))))
BY
{ ((RWO "member-map" (-1) THENA Auto) THEN Reduce (-1) THEN ExRepD) }

1
1. [A] : Type
2. [T] : Type
3. eq : EqDecider(T)
4. x : T
5. L : (T × A) List
6. apply-alist(eq;L;x) ~ ff supposing ¬(x ∈ map(λp.(fst(p));L))
7. ∀[i:ℕ||L||]

     (apply-alist(eq;L;x) ~ inl (snd(L[i]))) supposing (((fst(L[i])) = x ∈ T) and (∀j:ℕi. (¬((fst(L[j])) = x ∈ T))))

8. ∀a,b:T. Dec(a = b ∈ T)
9. y : T × A
10. (y ∈ L)
11. x = (fst(y)) ∈ T
⊢ ∃i:ℕ||L||. (((fst(L[i])) = x ∈ T) ∧ (∀j:ℕi. (¬((fst(L[j])) = x ∈ T))))

Latex:

Latex:
.....assertion..... 1. [A] : Type 2. [T] : Type 3. eq : EqDecider(T) 4. x : T 5. L : (T \mtimes{} A) List 6. apply-alist(eq;L;x) \msim{} ff supposing \mneg{}(x \mmember{} map(\mlambda{}p.(fst(p));L)) 7. \mforall{}[i:\mBbbN{}||L||] (apply-alist(eq;L;x) \msim{} inl (snd(L[i]))) supposing (((fst(L[i])) = x) and (\mforall{}j:\mBbbN{}i. (\mneg{}((fst(L[j])) = x)))) 8. \mforall{}a,b:T. Dec(a = b) 9. (x \mmember{} map(\mlambda{}p.(fst(p));L)) \mvdash{} \mexists{}i:\mBbbN{}||L||. (((fst(L[i])) = x) \mwedge{} (\mforall{}j:\mBbbN{}i. (\mneg{}((fst(L[j])) = x)))) By Latex: ((RWO "member-map" (-1) THENA Auto) THEN Reduce (-1) THEN ExRepD) Home Index