Proof of Nuprl Lemma : record+

Step * 3 of Lemma record+_extensionality

1. T : Atom ⟶ 𝕌'
2. B : record(x.T[x]) ⟶ 𝕌'
3. z : Atom
4. r1 : self:record(x.T[x]) ⋂ x:Atom ⟶ if x =a z then B[self] else Top fi
5. r2 : self:record(x.T[x]) ⋂ x:Atom ⟶ if x =a z then B[self] else Top fi
6. (r1 = r2 ∈ record(x.T[x])) ∧ (r1.z = r2.z ∈ B[r1])
⊢ r1 = r2 ∈ self:record(x.T[x]) ⋂ x:Atom ⟶ if x =a z then B[self] else Top fi
BY
{ (D -1 THEN DepIsectCD THEN Try (Trivial)) }

1
1. T : Atom ⟶ 𝕌'
2. B : record(x.T[x]) ⟶ 𝕌'
3. z : Atom
4. r1 : self:record(x.T[x]) ⋂ x:Atom ⟶ if x =a z then B[self] else Top fi
5. r2 : self:record(x.T[x]) ⋂ x:Atom ⟶ if x =a z then B[self] else Top fi
6. r1 = r2 ∈ record(x.T[x])
7. r1.z = r2.z ∈ B[r1]
⊢ r1 = r2 ∈ (x:Atom ⟶ if x =a z then B[r1] else Top fi )

Latex:

Latex:
1. T : Atom {}\mrightarrow{} \mBbbU{}' 2. B : record(x.T[x]) {}\mrightarrow{} \mBbbU{}' 3. z : Atom 4. r1 : self:record(x.T[x]) \mcap{} x:Atom {}\mrightarrow{} if x =a z then B[self] else Top fi 5. r2 : self:record(x.T[x]) \mcap{} x:Atom {}\mrightarrow{} if x =a z then B[self] else Top fi 6. (r1 = r2) \mwedge{} (r1.z = r2.z) \mvdash{} r1 = r2 By Latex: (D -1 THEN DepIsectCD THEN Try (Trivial)) Home Index