Proof of Nuprl Lemma : orbit-decomp

Step * 1 1 2 2 1 of Lemma orbit-decomp

1. T : Type
2. ∀x,y:T.  Dec(x = y ∈ T)
3. finite-type(T)
4. f : T ⟶ T
5. Inj(T;T;f)
6. orbits : T List List
7. ∀orbit:T List
     ((orbit ∈ orbits)
     ⇒ (0 < ||orbit||
        ∧ no_repeats(T;orbit)
        ∧ (∀i:ℕ||orbit||. (orbit[i] = (f^i orbit[0]) ∈ T))
        ∧ (∀b:T. ((b ∈ orbit) ⇐⇒ ∃n:ℕ. (b = (f^n orbit[0]) ∈ T)))))
8. ∀a:T. (∃orbit∈orbits. (a ∈ orbit))
9. ∀o1:T List. ((o1 ∈ orbits) ⇒ (∀o2:T List. ((o2 ∈ orbits) ⇒ (o1[0] ∈ o2) ⇒ o1 ⊆ o2)))
10. i : ℕ||orbits||
11. j : ℕi
12. ¬(orbits[j][0] ∈ orbits[i])
13. ¬(orbits[i][0] ∈ orbits[j])
14. x : T
15. (x ∈ orbits[j])
16. (x ∈ orbits[i])
17. n : ℤ
18. 0 < n
19. ∀m:ℕ. (¬((f^n - 1 orbits[i][0]) = (f^m orbits[j][0]) ∈ T))
20. m : ℤ
21. 0 < m
22. ¬((f^n orbits[i][0]) = (f^m - 1 orbits[j][0]) ∈ T)
23. ¬(n = 0 ∈ ℤ)
24. ¬(m = 0 ∈ ℤ)
25. (f (f^n - 1 orbits[i][0])) = (f (f^m - 1 orbits[j][0])) ∈ T
⊢ False
BY
{ ((Assert ¬((f^n - 1 orbits[i][0]) = (f^m - 1 orbits[j][0]) ∈ T) BY Auto) THEN D (-1))⋅ }

1
1. T : Type
2. ∀x,y:T.  Dec(x = y ∈ T)
3. finite-type(T)
4. f : T ⟶ T
5. Inj(T;T;f)
6. orbits : T List List
7. ∀orbit:T List
     ((orbit ∈ orbits)
     ⇒ (0 < ||orbit||
        ∧ no_repeats(T;orbit)
        ∧ (∀i:ℕ||orbit||. (orbit[i] = (f^i orbit[0]) ∈ T))
        ∧ (∀b:T. ((b ∈ orbit) ⇐⇒ ∃n:ℕ. (b = (f^n orbit[0]) ∈ T)))))
8. ∀a:T. (∃orbit∈orbits. (a ∈ orbit))
9. ∀o1:T List. ((o1 ∈ orbits) ⇒ (∀o2:T List. ((o2 ∈ orbits) ⇒ (o1[0] ∈ o2) ⇒ o1 ⊆ o2)))
10. i : ℕ||orbits||
11. j : ℕi
12. ¬(orbits[j][0] ∈ orbits[i])
13. ¬(orbits[i][0] ∈ orbits[j])
14. x : T
15. (x ∈ orbits[j])
16. (x ∈ orbits[i])
17. n : ℤ
18. 0 < n
19. ∀m:ℕ. (¬((f^n - 1 orbits[i][0]) = (f^m orbits[j][0]) ∈ T))
20. m : ℤ
21. 0 < m
22. ¬((f^n orbits[i][0]) = (f^m - 1 orbits[j][0]) ∈ T)
23. ¬(n = 0 ∈ ℤ)
24. ¬(m = 0 ∈ ℤ)
25. (f (f^n - 1 orbits[i][0])) = (f (f^m - 1 orbits[j][0])) ∈ T
⊢ (f^n - 1 orbits[i][0]) = (f^m - 1 orbits[j][0]) ∈ T

Latex:

Latex:
1. T : Type 2. \mforall{}x,y:T. Dec(x = y) 3. finite-type(T) 4. f : T {}\mrightarrow{} T 5. Inj(T;T;f) 6. orbits : T List List 7. \mforall{}orbit:T List ((orbit \mmember{} orbits) {}\mRightarrow{} (0 < ||orbit|| \mwedge{} no\_repeats(T;orbit) \mwedge{} (\mforall{}i:\mBbbN{}||orbit||. (orbit[i] = (f\^{}i orbit[0]))) \mwedge{} (\mforall{}b:T. ((b \mmember{} orbit) \mLeftarrow{}{}\mRightarrow{} \mexists{}n:\mBbbN{}. (b = (f\^{}n orbit[0])))))) 8. \mforall{}a:T. (\mexists{}orbit\mmember{}orbits. (a \mmember{} orbit)) 9. \mforall{}o1:T List. ((o1 \mmember{} orbits) {}\mRightarrow{} (\mforall{}o2:T List. ((o2 \mmember{} orbits) {}\mRightarrow{} (o1[0] \mmember{} o2) {}\mRightarrow{} o1 \msubseteq{} o2))) 10. i : \mBbbN{}||orbits|| 11. j : \mBbbN{}i 12. \mneg{}(orbits[j][0] \mmember{} orbits[i]) 13. \mneg{}(orbits[i][0] \mmember{} orbits[j]) 14. x : T 15. (x \mmember{} orbits[j]) 16. (x \mmember{} orbits[i]) 17. n : \mBbbZ{} 18. 0 < n 19. \mforall{}m:\mBbbN{}. (\mneg{}((f\^{}n - 1 orbits[i][0]) = (f\^{}m orbits[j][0]))) 20. m : \mBbbZ{} 21. 0 < m 22. \mneg{}((f\^{}n orbits[i][0]) = (f\^{}m - 1 orbits[j][0])) 23. \mneg{}(n = 0) 24. \mneg{}(m = 0) 25. (f (f\^{}n - 1 orbits[i][0])) = (f (f\^{}m - 1 orbits[j][0])) \mvdash{} False By Latex: ((Assert \mneg{}((f\^{}n - 1 orbits[i][0]) = (f\^{}m - 1 orbits[j][0])) BY Auto) THEN D (-1))\mcdot{} Home Index