Proof of Nuprl Lemma : fun-path-append1

Step * 2 2 1 1 2 1 of Lemma fun-path-append1

1. T : Type
2. f : T ⟶ T
3. u : T
4. u1 : T
5. v : T List

6. ∀[x,y,z:T].  (z=f*(x) via [u1 / v] @ [x]) supposing ((¬(y = x ∈ T)) and (y = (f x) ∈ T) and z=f*(y) via [u1 / v])

7. x : T
8. y : T
9. z : T
10. z=f*(y) via [u; [u1 / v]]
11. y = (f x) ∈ T
12. ¬(y = x ∈ T)
13. z = u ∈ T
14. u = (f u1) ∈ T
15. ¬(u = u1 ∈ T)
16. u1=f*(y) via [u1 / v]
17. z = u ∈ T

18. ((u = (f u1) ∈ T) ∧ (¬(u = u1 ∈ T))) ∧ u1=f*(y) via [u1 / v] supposing 0 < ||v|| + 1

19. y = u ∈ T supposing ¬0 < ||v|| + 1
20. z = u ∈ T

21. ((u = (f u1) ∈ T) ∧ (¬(u = u1 ∈ T))) ∧ u1=f*(x) via [u1 / (v @ [x])] supposing 0 < ||v @ [x]|| + 1

⊢ 0 < ||v @ [x]|| + 1
BY
{ (GenConclAtAddr [2;1] THEN Auto) }

Latex:

Latex:
1. T : Type 2. f : T {}\mrightarrow{} T 3. u : T 4. u1 : T 5. v : T List 6. \mforall{}[x,y,z:T]. (z=f*(x) via [u1 / v] @ [x]) supposing ((\mneg{}(y = x)) and (y = (f x)) and z=f*(y) via [u1 / v]) 7. x : T 8. y : T 9. z : T 10. z=f*(y) via [u; [u1 / v]] 11. y = (f x) 12. \mneg{}(y = x) 13. z = u 14. u = (f u1) 15. \mneg{}(u = u1) 16. u1=f*(y) via [u1 / v] 17. z = u 18. ((u = (f u1)) \mwedge{} (\mneg{}(u = u1))) \mwedge{} u1=f*(y) via [u1 / v] supposing 0 < ||v|| + 1 19. y = u supposing \mneg{}0 < ||v|| + 1 20. z = u 21. ((u = (f u1)) \mwedge{} (\mneg{}(u = u1))) \mwedge{} u1=f*(x) via [u1 / (v @ [x])] supposing 0 < ||v @ [x]|| + 1 \mvdash{} 0 < ||v @ [x]|| + 1 By Latex: (GenConclAtAddr [2;1] THEN Auto) Home Index