Proof of Nuprl Lemma : run-event-cases

Step * 1 1 2 1 1 1 of Lemma run-event-cases

1. M : Type ─→ Type
2. S0 : System(P.M[P])@i
3. r : pRunType(P.M[P])@i
4. n : ℕ@i
5. x : Id@i
6. m : ℕ@i
7. n ≤ m
8. ↑is-run-event(r;m;x)
9. ↑is-run-event(r;n;x)
10. mapfilter(λt.<t, x>;λt.is-run-event(r;t;x);[0, n))
= []
∈ ({tx:ℕn × {i:Id| i = x ∈ Id} | ↑is-run-event(r;fst(tx);snd(tx))}  List)@i
11. L2 : {tx:{n..m^-} × {i:Id| i = x ∈ Id} | ↑is-run-event(r;fst(tx);snd(tx))}  List@i
12. ¬(L2 = [] ∈ ({tx:{n..m^-} × {i:Id| i = x ∈ Id} | ↑is-run-event(r;fst(tx);snd(tx))}  List))
13. mapfilter(λt.<t, x>;λt.is-run-event(r;t;x);[n, m))
= L2
∈ ({tx:{n..m^-} × {i:Id| i = x ∈ Id} | ↑is-run-event(r;fst(tx);snd(tx))}  List)@i
14. [] = [] ∈ ({tx:ℕn × {i:Id| i = x ∈ Id} | ↑is-run-event(r;fst(tx);snd(tx))}  List)
15. ↑is-run-event(r;m;x)
16. X : {tx:{n..m^-} × {i:Id| i = x ∈ Id} | ↑is-run-event(r;fst(tx);snd(tx))} @i
17. last(L2) = X ∈ {tx:{n..m^-} × {i:Id| i = x ∈ Id} | ↑is-run-event(r;fst(tx);snd(tx))} @i
18. fst(X) < m
19. n ≤ (fst(X))
⊢ x = (snd(X)) ∈ Id
BY
{ (RepeatFor 2 (DVar `X') THEN DVar `X2' THEN Reduce 0 THEN Auto) }

Latex:

Latex:
1. M : Type {}\mrightarrow{} Type 2. S0 : System(P.M[P])@i 3. r : pRunType(P.M[P])@i 4. n : \mBbbN{}@i 5. x : Id@i 6. m : \mBbbN{}@i 7. n \mleq{} m 8. \muparrow{}is-run-event(r;m;x) 9. \muparrow{}is-run-event(r;n;x) 10. mapfilter(\mlambda{}t.<t, x>\mlambda{}t.is-run-event(r;t;x);[0, n)) = []@i 11. L2 : \{tx:\{n..m\msupminus{}\} \mtimes{} \{i:Id| i = x\} | \muparrow{}is-run-event(r;fst(tx);snd(tx))\} List@i 12. \mneg{}(L2 = []) 13. mapfilter(\mlambda{}t.<t, x>\mlambda{}t.is-run-event(r;t;x);[n, m)) = L2@i 14. [] = [] 15. \muparrow{}is-run-event(r;m;x) 16. X : \{tx:\{n..m\msupminus{}\} \mtimes{} \{i:Id| i = x\} | \muparrow{}is-run-event(r;fst(tx);snd(tx))\} @i 17. last(L2) = X@i 18. fst(X) < m 19. n \mleq{} (fst(X)) \mvdash{} x = (snd(X)) By Latex: (RepeatFor 2 (DVar `X') THEN DVar `X2' THEN Reduce 0 THEN Auto) Home Index