Proof of Nuprl Lemma : st-lookup-property

Step * 2 3 1 1 of Lemma st-lookup-property

1. T : Id ─→ Type
2. K : ℕ@i
3. t2 : ℕ@i
4. t3 : ℕK ─→ (Atom1 × ℕ + Atom1 × data(T))@i
5. x : Atom1@i
6. v : ℕ@i
7. mu(λn.(t2 <z n ∨_bK ≤z n ∨_bfst((t3 n)) =a1 x)) = v ∈ ℕ@i
8. ↑(t2 <z v ∨_bK ≤z v ∨_bfst((t3 v)) =a1 x)
9. ∀[i:ℕ]. ¬↑(t2 <z i ∨_bK ≤z i ∨_bfst((t3 i)) =a1 x) supposing i < v
10. t2 < v ∨ (K ≤ v)
11. n : ℕK@i
12. n ≤ t2@i
13. (fst((t3 n))) = x ∈ Atom1@i
⊢ False
BY
{ ((InstHyp [n] (-5))⋅ THEN Auto) }

Latex:

1. T : Id {}\mrightarrow{} Type 2. K : \mBbbN{}@i 3. t2 : \mBbbN{}@i 4. t3 : \mBbbN{}K {}\mrightarrow{} (Atom1 \mtimes{} \mBbbN{} + Atom1 \mtimes{} data(T))@i 5. x : Atom1@i 6. v : \mBbbN{}@i 7. mu(\mlambda{}n.(t2 <z n \mvee{}\msubb{}K \mleq{}z n \mvee{}\msubb{}fst((t3 n)) =a1 x)) = v@i 8. \muparrow{}(t2 <z v \mvee{}\msubb{}K \mleq{}z v \mvee{}\msubb{}fst((t3 v)) =a1 x) 9. \mforall{}[i:\mBbbN{}]. \mneg{}\muparrow{}(t2 <z i \mvee{}\msubb{}K \mleq{}z i \mvee{}\msubb{}fst((t3 i)) =a1 x) supposing i < v 10. t2 < v \mvee{} (K \mleq{} v) 11. n : \mBbbN{}K@i 12. n \mleq{} t2@i 13. (fst((t3 n))) = x@i \mvdash{} False By ((InstHyp [n] (-5))\mcdot{} THEN Auto) Home Index