Proof of Nuprl Lemma : accum_split

Step * 1 1 2 1 2 2 of Lemma accum_split_iseg

1. [T] : Type
2. [A] : Type
3. g : (T List × A) ⟶ A
4. f : (T List × A) ⟶ 𝔹
5. ys : T List
6. y : T
7. v1 : (T List × A) List
8. v3 : T List
9. v4 : A
10. v5 : (T List × A) List
11. v7 : T List
12. v8 : A
13. v9 : (T List × A) List
14. v11 : T List
15. v12 : A
16. ((v1 = v9 ∈ ((T List × A) List)) ∧ v3 ≤ v11 ∧ (v4 = v12 ∈ A))

∨ (∃Z:T List. ∃ZZ:(T List × A) List. (((v1 @ [<Z, v4> / ZZ]) = v9 ∈ ((T List × A) List)) ∧ v3 ≤ Z))

17. ¬(v11 = [] ∈ (T List))
18. ¬↑(f <v11, v12>)
19. <v9, v11 @ [y], v12> = <v5, v7, v8> ∈ ((T List × A) List × T List × A)
⊢ ((v1 = v5 ∈ ((T List × A) List)) ∧ v3 ≤ v7 ∧ (v4 = v8 ∈ A))

∨ (∃Z:T List. ∃ZZ:(T List × A) List. (((v1 @ [<Z, v4> / ZZ]) = v5 ∈ ((T List × A) List)) ∧ v3 ≤ Z))

{ ((Assert (v9 = v5 ∈ ((T List × A) List)) ∧ ((v11 @ [y]) = v7 ∈ (T List)) ∧ (v12 = v8 ∈ A) BY

          AutoSimpHyp Auto (-1))
   THEN Thin (-2)
   THEN ExRepD
   THEN SplitOrHyps
   THEN ExRepD) }

1
1. [T] : Type
2. [A] : Type
3. g : (T List × A) ⟶ A
4. f : (T List × A) ⟶ 𝔹
5. ys : T List
6. y : T
7. v1 : (T List × A) List
8. v3 : T List
9. v4 : A
10. v5 : (T List × A) List
11. v7 : T List
12. v8 : A
13. v9 : (T List × A) List
14. v11 : T List
15. v12 : A
16. v1 = v9 ∈ ((T List × A) List)
17. v3 ≤ v11
18. v4 = v12 ∈ A
19. ¬(v11 = [] ∈ (T List))
20. ¬↑(f <v11, v12>)
21. v9 = v5 ∈ ((T List × A) List)
22. (v11 @ [y]) = v7 ∈ (T List)
23. v12 = v8 ∈ A
⊢ ((v1 = v5 ∈ ((T List × A) List)) ∧ v3 ≤ v7 ∧ (v4 = v8 ∈ A))

∨ (∃Z:T List. ∃ZZ:(T List × A) List. (((v1 @ [<Z, v4> / ZZ]) = v5 ∈ ((T List × A) List)) ∧ v3 ≤ Z))

2
1. [T] : Type
2. [A] : Type
3. g : (T List × A) ⟶ A
4. f : (T List × A) ⟶ 𝔹
5. ys : T List
6. y : T
7. v1 : (T List × A) List
8. v3 : T List
9. v4 : A
10. v5 : (T List × A) List
11. v7 : T List
12. v8 : A
13. v9 : (T List × A) List
14. v11 : T List
15. v12 : A
16. Z : T List
17. ZZ : (T List × A) List
18. (v1 @ [<Z, v4> / ZZ]) = v9 ∈ ((T List × A) List)
19. v3 ≤ Z
20. ¬(v11 = [] ∈ (T List))
21. ¬↑(f <v11, v12>)
22. v9 = v5 ∈ ((T List × A) List)
23. (v11 @ [y]) = v7 ∈ (T List)
24. v12 = v8 ∈ A
⊢ ((v1 = v5 ∈ ((T List × A) List)) ∧ v3 ≤ v7 ∧ (v4 = v8 ∈ A))

∨ (∃Z:T List. ∃ZZ:(T List × A) List. (((v1 @ [<Z, v4> / ZZ]) = v5 ∈ ((T List × A) List)) ∧ v3 ≤ Z))

Latex:

Latex:
1. [T] : Type 2. [A] : Type 3. g : (T List \mtimes{} A) {}\mrightarrow{} A 4. f : (T List \mtimes{} A) {}\mrightarrow{} \mBbbB{} 5. ys : T List 6. y : T 7. v1 : (T List \mtimes{} A) List 8. v3 : T List 9. v4 : A 10. v5 : (T List \mtimes{} A) List 11. v7 : T List 12. v8 : A 13. v9 : (T List \mtimes{} A) List 14. v11 : T List 15. v12 : A 16. ((v1 = v9) \mwedge{} v3 \mleq{} v11 \mwedge{} (v4 = v12)) \mvee{} (\mexists{}Z:T List. \mexists{}ZZ:(T List \mtimes{} A) List. (((v1 @ [<Z, v4> / ZZ]) = v9) \mwedge{} v3 \mleq{} Z)) 17. \mneg{}(v11 = []) 18. \mneg{}\muparrow{}(f <v11, v12>) 19. <v9, v11 @ [y], v12> = <v5, v7, v8> \mvdash{} ((v1 = v5) \mwedge{} v3 \mleq{} v7 \mwedge{} (v4 = v8)) \mvee{} (\mexists{}Z:T List. \mexists{}ZZ:(T List \mtimes{} A) List. (((v1 @ [<Z, v4> / ZZ]) = v5) \mwedge{} v3 \mleq{} Z)) By Latex: ((Assert (v9 = v5) \mwedge{} ((v11 @ [y]) = v7) \mwedge{} (v12 = v8) BY AutoSimpHyp Auto (-1)) THEN Thin (-2) THEN ExRepD THEN SplitOrHyps THEN ExRepD) Home Index