Proof of Nuprl Lemma : orbit-transitive

Step * 1 of Lemma orbit-transitive

1. [T] : Type
2. f : T ⟶ T
3. L : T List
4. 0 < ||L||
5. no_repeats(T;L)
6. ∀i:ℕ||L||. ((f L[i]) = if (i =_z ||L|| - 1) then L[0] else L[i + 1] fi  ∈ T)
7. j : ℕ
8. j < ||L||
9. i : ℕ
10. i < ||L||
⊢ ∃n:ℕ. ((f^n L[j]) = L[i] ∈ T)
BY
{ InstConcl [⌜if j ≤z i then i - j else ||L|| + (i - j) fi ⌝]⋅ }

1
.....wf.....
1. T : Type
2. f : T ⟶ T
3. L : T List
4. 0 < ||L||
5. no_repeats(T;L)
6. ∀i:ℕ||L||. ((f L[i]) = if (i =_z ||L|| - 1) then L[0] else L[i + 1] fi  ∈ T)
7. j : ℕ
8. j < ||L||
9. i : ℕ
10. i < ||L||
⊢ if j ≤z i then i - j else ||L|| + (i - j) fi  ∈ ℕ

2
1. T : Type
2. f : T ⟶ T
3. L : T List
4. 0 < ||L||
5. no_repeats(T;L)
6. ∀i:ℕ||L||. ((f L[i]) = if (i =_z ||L|| - 1) then L[0] else L[i + 1] fi  ∈ T)
7. j : ℕ
8. j < ||L||
9. i : ℕ
10. i < ||L||
⊢ (f^if j ≤z i then i - j else ||L|| + (i - j) fi  L[j]) = L[i] ∈ T

3
.....wf.....
1. T : Type
2. f : T ⟶ T
3. L : T List
4. 0 < ||L||
5. no_repeats(T;L)
6. ∀i:ℕ||L||. ((f L[i]) = if (i =_z ||L|| - 1) then L[0] else L[i + 1] fi  ∈ T)
7. j : ℕ
8. j < ||L||
9. i : ℕ
10. i < ||L||
11. n : ℕ
⊢ istype((f^n L[j]) = L[i] ∈ T)

Latex:

Latex:
1. [T] : Type 2. f : T {}\mrightarrow{} T 3. L : T List 4. 0 < ||L|| 5. no\_repeats(T;L) 6. \mforall{}i:\mBbbN{}||L||. ((f L[i]) = if (i =\msubz{} ||L|| - 1) then L[0] else L[i + 1] fi ) 7. j : \mBbbN{} 8. j < ||L|| 9. i : \mBbbN{} 10. i < ||L|| \mvdash{} \mexists{}n:\mBbbN{}. ((f\^{}n L[j]) = L[i]) By Latex: InstConcl [\mkleeneopen{}if j \mleq{}z i then i - j else ||L|| + (i - j) fi \mkleeneclose{}]\mcdot{} Home Index