Proof of Nuprl Lemma : count-by-decidable-equiv

Step * 1 of Lemma count-by-decidable-equiv

1. [A] : Type
2. [E] : A ⟶ A ⟶ ℙ
3. EquivRel(A;x,y.E[x;y])
4. ∀x,y:A.  Dec(E[x;y])
5. k : ℕ
6. A ~ ℕk
7. L : A List
8. (∀a,b∈L.  ¬E[a;b])
9. ∀a:A. (∃b∈L. E[a;b])
10. ||L|| ≤ k
11. (∀a,b∈L.  ¬E[a;b])
12. ∀a:A. (∃b∈L. E[a;b])

⊢ ∃f:ℕ||L|| ⟶ ℕ. ((∀i:ℕ||L||. {a:A| E[a;L[i]]}  ~ ℕf i) ∧ A ~ i:ℕ||L|| × ℕf i ∧ (k = Σ(f i | i < ||L||) ∈ ℤ))

BY
{ (Assert ∀i:ℕ||L||. ∃n:ℕ. {a:A| E[a;L[i]]} ~ ℕn BY

         (Auto THEN (InstLemma `equipollent-partition` [⌜k⌝;⌜A⌝;⌜λ₂a.E[a;L[i]]⌝]⋅ THENA Auto) THEN ExRepD THEN Auto)) }

1
1. [A] : Type
2. [E] : A ⟶ A ⟶ ℙ
3. EquivRel(A;x,y.E[x;y])
4. ∀x,y:A.  Dec(E[x;y])
5. k : ℕ
6. A ~ ℕk
7. L : A List
8. (∀a,b∈L.  ¬E[a;b])
9. ∀a:A. (∃b∈L. E[a;b])
10. ||L|| ≤ k
11. (∀a,b∈L.  ¬E[a;b])
12. ∀a:A. (∃b∈L. E[a;b])
13. ∀i:ℕ||L||. ∃n:ℕ. {a:A| E[a;L[i]]}  ~ ℕn

⊢ ∃f:ℕ||L|| ⟶ ℕ. ((∀i:ℕ||L||. {a:A| E[a;L[i]]}  ~ ℕf i) ∧ A ~ i:ℕ||L|| × ℕf i ∧ (k = Σ(f i | i < ||L||) ∈ ℤ))

Latex:

Latex:
1. [A] : Type 2. [E] : A {}\mrightarrow{} A {}\mrightarrow{} \mBbbP{} 3. EquivRel(A;x,y.E[x;y]) 4. \mforall{}x,y:A. Dec(E[x;y]) 5. k : \mBbbN{} 6. A \msim{} \mBbbN{}k 7. L : A List 8. (\mforall{}a,b\mmember{}L. \mneg{}E[a;b]) 9. \mforall{}a:A. (\mexists{}b\mmember{}L. E[a;b]) 10. ||L|| \mleq{} k 11. (\mforall{}a,b\mmember{}L. \mneg{}E[a;b]) 12. \mforall{}a:A. (\mexists{}b\mmember{}L. E[a;b]) \mvdash{} \mexists{}f:\mBbbN{}||L|| {}\mrightarrow{} \mBbbN{}. ((\mforall{}i:\mBbbN{}||L||. \{a:A| E[a;L[i]]\} \msim{} \mBbbN{}f i) \mwedge{} A \msim{} i:\mBbbN{}||L|| \mtimes{} \mBbbN{}f i \mwedge{} (k = \mSigma{}(f i | i < ||\000CL||))) By Latex: (Assert \mforall{}i:\mBbbN{}||L||. \mexists{}n:\mBbbN{}. \{a:A| E[a;L[i]]\} \msim{} \mBbbN{}n BY (Auto THEN (InstLemma `equipollent-partition` [\mkleeneopen{}k\mkleeneclose{};\mkleeneopen{}A\mkleeneclose{};\mkleeneopen{}\mlambda{}\msubtwo{}a.E[a;L[i]]\mkleeneclose{}]\mcdot{} THENA Auto) THEN ExRepD THEN Auto)) Home Index