Proof of Nuprl Lemma : global-order-compat-combine

Step * 2 2 1 2 1 of Lemma global-order-compat-combine

.....assertion.....
1. Info : Type
2. L1 : (Id × Info) List@i
3. ys : (Id × Info) List@i
4. y : Id × Info@i
5. L1 || ys @ [y]@i
6. L : (Id × Info) List@i
7. L1 ≤ L@i
8. f : ℕ||ys|| ─→ ℕ||L||@i
9. ∀i,j:ℕ||ys||.  (i < j ⇒ (f i < f j ∨ f j < ||L1||))@i
10. ∀j:ℕ||ys||
      ((ys[j] = L[f j] ∈ (Id × Info))
      ∧ (filter(λx.fst(x) = fst(ys[j]);firstn(j + 1;ys))
        = filter(λx.fst(x) = fst(ys[j]);firstn((f j) + 1;L))
        ∈ ((Id × Info) List)))@i
11. ∀x:ℕ||L||. (x < ||L1|| ∨ (∃i:ℕ||ys||. (x = (f i) ∈ ℤ)))@i
12. ys ≤ L, locally@i
13. ∀i:Id
      ((filter(λx.fst(x) = i;L) = filter(λx.fst(x) = i;L1) ∈ ((Id × Info) List))
      ∨ (filter(λx.fst(x) = i;L) = filter(λx.fst(x) = i;ys) ∈ ((Id × Info) List)))@i
14. ¬(||filter(λx.fst(x) = fst(y);L1)|| ≤ ||filter(λx.fst(x) = fst(y);ys)||)
⊢ filter(λx.fst(x) = fst(y);L1) = filter(λx.fst(x) = fst(y);L) ∈ ((Id × Info) List)
BY
{ ((InstHyp [⌈fst(y)⌉] (-2)⋅ THENM D -1) THEN Auto THEN D -2) }

1
1. Info : Type
2. L1 : (Id × Info) List@i
3. ys : (Id × Info) List@i
4. y : Id × Info@i
5. L1 || ys @ [y]@i
6. L : (Id × Info) List@i
7. L1 ≤ L@i
8. f : ℕ||ys|| ─→ ℕ||L||@i
9. ∀i,j:ℕ||ys||.  (i < j ⇒ (f i < f j ∨ f j < ||L1||))@i
10. ∀j:ℕ||ys||
      ((ys[j] = L[f j] ∈ (Id × Info))
      ∧ (filter(λx.fst(x) = fst(ys[j]);firstn(j + 1;ys))
        = filter(λx.fst(x) = fst(ys[j]);firstn((f j) + 1;L))
        ∈ ((Id × Info) List)))@i
11. ∀x:ℕ||L||. (x < ||L1|| ∨ (∃i:ℕ||ys||. (x = (f i) ∈ ℤ)))@i
12. ys ≤ L, locally@i
13. ∀i:Id
      ((filter(λx.fst(x) = i;L) = filter(λx.fst(x) = i;L1) ∈ ((Id × Info) List))
      ∨ (filter(λx.fst(x) = i;L) = filter(λx.fst(x) = i;ys) ∈ ((Id × Info) List)))@i
14. filter(λx.fst(x) = fst(y);L) = filter(λx.fst(x) = fst(y);ys) ∈ ((Id × Info) List)
⊢ ||filter(λx.fst(x) = fst(y);L1)|| ≤ ||filter(λx.fst(x) = fst(y);ys)||

Latex:

Latex:
.....assertion..... 1. Info : Type 2. L1 : (Id \mtimes{} Info) List@i 3. ys : (Id \mtimes{} Info) List@i 4. y : Id \mtimes{} Info@i 5. L1 || ys @ [y]@i 6. L : (Id \mtimes{} Info) List@i 7. L1 \mleq{} L@i 8. f : \mBbbN{}||ys|| {}\mrightarrow{} \mBbbN{}||L||@i 9. \mforall{}i,j:\mBbbN{}||ys||. (i < j {}\mRightarrow{} (f i < f j \mvee{} f j < ||L1||))@i 10. \mforall{}j:\mBbbN{}||ys|| ((ys[j] = L[f j]) \mwedge{} (filter(\mlambda{}x.fst(x) = fst(ys[j]);firstn(j + 1;ys)) = filter(\mlambda{}x.fst(x) = fst(ys[j]);firstn((f j) + 1;L))))@i 11. \mforall{}x:\mBbbN{}||L||. (x < ||L1|| \mvee{} (\mexists{}i:\mBbbN{}||ys||. (x = (f i))))@i 12. ys \mleq{} L, locally@i 13. \mforall{}i:Id ((filter(\mlambda{}x.fst(x) = i;L) = filter(\mlambda{}x.fst(x) = i;L1)) \mvee{} (filter(\mlambda{}x.fst(x) = i;L) = filter(\mlambda{}x.fst(x) = i;ys)))@i 14. \mneg{}(||filter(\mlambda{}x.fst(x) = fst(y);L1)|| \mleq{} ||filter(\mlambda{}x.fst(x) = fst(y);ys)||) \mvdash{} filter(\mlambda{}x.fst(x) = fst(y);L1) = filter(\mlambda{}x.fst(x) = fst(y);L) By Latex: ((InstHyp [\mkleeneopen{}fst(y)\mkleeneclose{}] (-2)\mcdot{} THENM D -1) THEN Auto THEN D -2) Home Index