Proof of Nuprl Lemma : concat-decomp

Step * of Lemma concat-decomp

∀[T:Type]
  ∀ll:T List List. ∀x:T.
    ((x ∈ concat(ll))
    ⇐⇒ ∃ll1,ll2:T List List
         ∃l1,l2:T List
          ((concat(ll) = (concat(ll1) @ (l1 @ [x] @ l2) @ concat(ll2)) ∈ (T List))
          ∧ (ll = (ll1 @ [l1 @ [x] @ l2] @ ll2) ∈ (T List List))))
BY
{ TACTIC:(Intros THEN RWO "member-concat" 0 THEN Auto THEN ExRepD) }

1
1. [T] : Type
2. ll : T List List
3. x : T
4. l : T List
5. (l ∈ ll)
6. (x ∈ l)
⊢ ∃ll1,ll2:T List List
   ∃l1,l2:T List
    ((concat(ll) = (concat(ll1) @ (l1 @ [x] @ l2) @ concat(ll2)) ∈ (T List))
    ∧ (ll = (ll1 @ [l1 @ [x] @ l2] @ ll2) ∈ (T List List)))

2
1. [T] : Type
2. ll : T List List
3. x : T
4. ll1 : T List List
5. ll2 : T List List
6. l1 : T List
7. l2 : T List
8. concat(ll) = (concat(ll1) @ (l1 @ [x] @ l2) @ concat(ll2)) ∈ (T List)
9. ll = (ll1 @ [l1 @ [x] @ l2] @ ll2) ∈ (T List List)
⊢ ∃l:T List. ((l ∈ ll) ∧ (x ∈ l))

Latex:

Latex:
\mforall{}[T:Type] \mforall{}ll:T List List. \mforall{}x:T. ((x \mmember{} concat(ll)) \mLeftarrow{}{}\mRightarrow{} \mexists{}ll1,ll2:T List List \mexists{}l1,l2:T List ((concat(ll) = (concat(ll1) @ (l1 @ [x] @ l2) @ concat(ll2))) \mwedge{} (ll = (ll1 @ [l1 @ [x] @ l2] @ ll2)))) By Latex: TACTIC:(Intros THEN RWO "member-concat" 0 THEN Auto THEN ExRepD) Home Index