Proof of Nuprl Lemma : word-rel-diamond

Step * 1 1 2 of Lemma word-rel-diamond

1. [X] : Type
2. n : ℕ
3. x : (X + X) List
4. ∀x1:(X + X) List
     (||x1|| < ||x||
     ⇒ (∀y,z:(X + X) List.
           (word-rel(X;x1;y)
           ⇒ word-rel(X;x1;z)
           ⇒ ((y = z ∈ ((X + X) List)) ∨ (∃w:(X + X) List. (word-rel(X;y;w) ∧ word-rel(X;z;w)))))))
5. y : (X + X) List
6. z : (X + X) List
7. x@0 : X + X
8. y@0 : X + X
9. b1 : (X + X) List
10. x@0 = -y@0
11. x = [x@0; [y@0 / b1]] ∈ ((X + X) List)
12. y = b1 ∈ ((X + X) List)
13. x1 : X + X
14. y1 : X + X
15. u : X + X
16. v : (X + X) List
17. b : (X + X) List
18. x1 = -y1
19. x = [u / (v @ [x1; [y1 / b]])] ∈ ((X + X) List)
20. z = [u / (v @ b)] ∈ ((X + X) List)
21. x@0 = u ∈ (X + X)
22. [y@0 / b1] = (v @ [x1; [y1 / b]]) ∈ ((X + X) List)

⊢ (b1 = [u / (v @ b)] ∈ ((X + X) List)) ∨ (∃w:(X + X) List. (word-rel(X;b1;w) ∧ word-rel(X;[u / (v @ b)];w)))

BY
{ ((DVar `v' THEN All Reduce) THEN (RWO "cons_one_one" (-1) THENA Auto) THEN D -1) }

1
1. [X] : Type
2. n : ℕ
3. x : (X + X) List
4. ∀x1:(X + X) List
     (||x1|| < ||x||
     ⇒ (∀y,z:(X + X) List.
           (word-rel(X;x1;y)
           ⇒ word-rel(X;x1;z)
           ⇒ ((y = z ∈ ((X + X) List)) ∨ (∃w:(X + X) List. (word-rel(X;y;w) ∧ word-rel(X;z;w)))))))
5. y : (X + X) List
6. z : (X + X) List
7. x@0 : X + X
8. y@0 : X + X
9. b1 : (X + X) List
10. x@0 = -y@0
11. x = [x@0; [y@0 / b1]] ∈ ((X + X) List)
12. y = b1 ∈ ((X + X) List)
13. x1 : X + X
14. y1 : X + X
15. u : X + X
16. b : (X + X) List
17. x1 = -y1
18. x = [u; x1; [y1 / b]] ∈ ((X + X) List)
19. z = [u / b] ∈ ((X + X) List)
20. x@0 = u ∈ (X + X)
21. y@0 = x1 ∈ (X + X)
22. b1 = [y1 / b] ∈ ((X + X) List)

⊢ (b1 = [u / b] ∈ ((X + X) List)) ∨ (∃w:(X + X) List. (word-rel(X;b1;w) ∧ word-rel(X;[u / b];w)))

2
1. [X] : Type
2. n : ℕ
3. x : (X + X) List
4. ∀x1:(X + X) List
     (||x1|| < ||x||
     ⇒ (∀y,z:(X + X) List.
           (word-rel(X;x1;y)
           ⇒ word-rel(X;x1;z)
           ⇒ ((y = z ∈ ((X + X) List)) ∨ (∃w:(X + X) List. (word-rel(X;y;w) ∧ word-rel(X;z;w)))))))
5. y : (X + X) List
6. z : (X + X) List
7. x@0 : X + X
8. y@0 : X + X
9. b1 : (X + X) List
10. x@0 = -y@0
11. x = [x@0; [y@0 / b1]] ∈ ((X + X) List)
12. y = b1 ∈ ((X + X) List)
13. x1 : X + X
14. y1 : X + X
15. u : X + X
16. u1 : X + X
17. v : (X + X) List
18. b : (X + X) List
19. x1 = -y1
20. x = [u; [u1 / (v @ [x1; [y1 / b]])]] ∈ ((X + X) List)
21. z = [u; [u1 / (v @ b)]] ∈ ((X + X) List)
22. x@0 = u ∈ (X + X)
23. y@0 = u1 ∈ (X + X)
24. b1 = (v @ [x1; [y1 / b]]) ∈ ((X + X) List)
⊢ (b1 = [u; [u1 / (v @ b)]] ∈ ((X + X) List))
∨ (∃w:(X + X) List. (word-rel(X;b1;w) ∧ word-rel(X;[u; [u1 / (v @ b)]];w)))

Latex:

Latex:
1. [X] : Type 2. n : \mBbbN{} 3. x : (X + X) List 4. \mforall{}x1:(X + X) List (||x1|| < ||x|| {}\mRightarrow{} (\mforall{}y,z:(X + X) List. (word-rel(X;x1;y) {}\mRightarrow{} word-rel(X;x1;z) {}\mRightarrow{} ((y = z) \mvee{} (\mexists{}w:(X + X) List. (word-rel(X;y;w) \mwedge{} word-rel(X;z;w))))))) 5. y : (X + X) List 6. z : (X + X) List 7. x@0 : X + X 8. y@0 : X + X 9. b1 : (X + X) List 10. x@0 = -y@0 11. x = [x@0; [y@0 / b1]] 12. y = b1 13. x1 : X + X 14. y1 : X + X 15. u : X + X 16. v : (X + X) List 17. b : (X + X) List 18. x1 = -y1 19. x = [u / (v @ [x1; [y1 / b]])] 20. z = [u / (v @ b)] 21. x@0 = u 22. [y@0 / b1] = (v @ [x1; [y1 / b]]) \mvdash{} (b1 = [u / (v @ b)]) \mvee{} (\mexists{}w:(X + X) List. (word-rel(X;b1;w) \mwedge{} word-rel(X;[u / (v @ b)];w))) By Latex: ((DVar `v' THEN All Reduce) THEN (RWO "cons\_one\_one" (-1) THENA Auto) THEN D -1) Home Index