Proof of Nuprl Lemma : cycle-decomp

Step * 1 of Lemma cycle-decomp

1. n : ℕ
2. f : {f:ℕn ⟶ ℕn| Inj(ℕn;ℕn;f)}
3. orbits : ℕn List List
4. ∀orbit:ℕn List
     ((orbit ∈ orbits)
     ⇒ (0 < ||orbit||
        ∧ no_repeats(ℕn;orbit)

        ∧ (∀i:ℕ||orbit||. ((f orbit[i]) = if (i =_z ||orbit|| - 1) then orbit[0] else orbit[i + 1] fi  ∈ ℕn))

        ∧ (∀x∈orbit.∀n@0:ℕ. (f^n@0 x ∈ orbit))))
5. ∀a:ℕn. (∃orbit∈orbits. (a ∈ orbit))
6. (∀o1,o2∈orbits.  l_disjoint(ℕn;o1;o2))
⊢ no_repeats(ℕn List;orbits)
BY
{ ((D 0 THEN Auto) THEN ParallelLast) }

1
1. n : ℕ
2. f : {f:ℕn ⟶ ℕn| Inj(ℕn;ℕn;f)}
3. orbits : ℕn List List
4. ∀orbit:ℕn List
     ((orbit ∈ orbits)
     ⇒ (0 < ||orbit||
        ∧ no_repeats(ℕn;orbit)

        ∧ (∀i:ℕ||orbit||. ((f orbit[i]) = if (i =_z ||orbit|| - 1) then orbit[0] else orbit[i + 1] fi  ∈ ℕn))

∧ (∀x∈orbit.∀n@0:ℕ. (f^n@0 x ∈ orbit))))
5. ∀a:ℕn. (∃orbit∈orbits. (a ∈ orbit))
6. (∀o1,o2∈orbits. l_disjoint(ℕn;o1;o2))
7. i : ℕ
8. j : ℕ
9. i < ||orbits||
10. j < ||orbits||
11. orbits[i] = orbits[j] ∈ (ℕn List)
⊢ i = j ∈ ℕ

Latex:

Latex:
1. n : \mBbbN{} 2. f : \{f:\mBbbN{}n {}\mrightarrow{} \mBbbN{}n| Inj(\mBbbN{}n;\mBbbN{}n;f)\} 3. orbits : \mBbbN{}n List List 4. \mforall{}orbit:\mBbbN{}n List ((orbit \mmember{} orbits) {}\mRightarrow{} (0 < ||orbit|| \mwedge{} no\_repeats(\mBbbN{}n;orbit) \mwedge{} (\mforall{}i:\mBbbN{}||orbit|| ((f orbit[i]) = if (i =\msubz{} ||orbit|| - 1) then orbit[0] else orbit[i + 1] fi )) \mwedge{} (\mforall{}x\mmember{}orbit.\mforall{}n@0:\mBbbN{}. (f\^{}n@0 x \mmember{} orbit)))) 5. \mforall{}a:\mBbbN{}n. (\mexists{}orbit\mmember{}orbits. (a \mmember{} orbit)) 6. (\mforall{}o1,o2\mmember{}orbits. l\_disjoint(\mBbbN{}n;o1;o2)) \mvdash{} no\_repeats(\mBbbN{}n List;orbits) By Latex: ((D 0 THEN Auto) THEN ParallelLast) Home Index