Proof of Nuprl Lemma : permutation-invariant2

Step * 3 1 1 1 2 1 of Lemma permutation-invariant2

1. [T] : Type
2. [R] : (T List) ⟶ (T List) ⟶ ℙ
3. Trans(T List;x,y.R[x;y])
4. Refl(T List;as,bs.R[as;bs])
5. ∀as:T List. ∀a:T.  R[[a / as];as @ [a]]
6. ∀as:T List. ∀a1,a2:T.  R[[a1; [a2 / as]];[a2; [a1 / as]]]
7. as : T List
8. f : ℕ||as|| ⟶ ℕ||as||
9. Inj(ℕ||as||;ℕ||as||;f)
10. f1 : {f:ℕ||as|| ⟶ ℕ||as||| Inj(ℕ||as||;ℕ||as||;f)}
11. R[as;(as o f1)]
12. u : T
13. v : T List
⊢ R[v @ [u];([u / v] o rot(||[u / v]||))]
BY
{ (Subst ⌜([u / v] o rot(||[u / v]||)) = (v @ [u]) ∈ (T List)⌝ 0⋅ THEN Auto) }

1
.....equality.....
1. T : Type
2. R : (T List) ⟶ (T List) ⟶ ℙ
3. Trans(T List;x,y.R[x;y])
4. Refl(T List;as,bs.R[as;bs])
5. ∀as:T List. ∀a:T.  R[[a / as];as @ [a]]
6. ∀as:T List. ∀a1,a2:T.  R[[a1; [a2 / as]];[a2; [a1 / as]]]
7. as : T List
8. f : ℕ||as|| ⟶ ℕ||as||
9. Inj(ℕ||as||;ℕ||as||;f)
10. f1 : {f:ℕ||as|| ⟶ ℕ||as||| Inj(ℕ||as||;ℕ||as||;f)}
11. R[as;(as o f1)]
12. u : T
13. v : T List
⊢ ([u / v] o rot(||[u / v]||)) = (v @ [u]) ∈ (T List)

Latex:

Latex:
1. [T] : Type 2. [R] : (T List) {}\mrightarrow{} (T List) {}\mrightarrow{} \mBbbP{} 3. Trans(T List;x,y.R[x;y]) 4. Refl(T List;as,bs.R[as;bs]) 5. \mforall{}as:T List. \mforall{}a:T. R[[a / as];as @ [a]] 6. \mforall{}as:T List. \mforall{}a1,a2:T. R[[a1; [a2 / as]];[a2; [a1 / as]]] 7. as : T List 8. f : \mBbbN{}||as|| {}\mrightarrow{} \mBbbN{}||as|| 9. Inj(\mBbbN{}||as||;\mBbbN{}||as||;f) 10. f1 : \{f:\mBbbN{}||as|| {}\mrightarrow{} \mBbbN{}||as||| Inj(\mBbbN{}||as||;\mBbbN{}||as||;f)\} 11. R[as;(as o f1)] 12. u : T 13. v : T List \mvdash{} R[v @ [u];([u / v] o rot(||[u / v]||))] By Latex: (Subst \mkleeneopen{}([u / v] o rot(||[u / v]||)) = (v @ [u])\mkleeneclose{} 0\mcdot{} THEN Auto) Home Index