mirror of
https://github.com/achlipala/frap.git
synced 2024-11-28 07:16:20 +00:00
FirstClassFunctions: flattenKD_ok
This commit is contained in:
parent
3e689a9a4a
commit
0047d49139
1 changed files with 124 additions and 0 deletions
|
@ -343,3 +343,127 @@ Proof.
|
|||
rewrite mapK_ok with (f_base := AppearedInYear); trivial.
|
||||
apply fold_leftK_ok with (f_base := max); trivial.
|
||||
Qed.
|
||||
|
||||
|
||||
(** * Tree traversals *)
|
||||
|
||||
Inductive tree {A} :=
|
||||
| Leaf
|
||||
| Node (l : tree) (d : A) (r : tree).
|
||||
Arguments tree : clear implicits.
|
||||
|
||||
Fixpoint depth {A} (t : tree A) : nat :=
|
||||
match t with
|
||||
| Leaf => 0
|
||||
| Node l _ r => 2 + depth l + depth r
|
||||
end.
|
||||
|
||||
Fixpoint flatten {A} (t : tree A) : list A :=
|
||||
match t with
|
||||
| Leaf => []
|
||||
| Node l d r => flatten l ++ d :: flatten r
|
||||
end.
|
||||
|
||||
Fixpoint flattenAcc {A} (t : tree A) (acc : list A) : list A :=
|
||||
match t with
|
||||
| Leaf => acc
|
||||
| Node l d r => flattenAcc l (d :: flattenAcc r acc)
|
||||
end.
|
||||
|
||||
Theorem flattenAcc_ok : forall {A} (t : tree A) acc,
|
||||
flattenAcc t acc = flatten t ++ acc.
|
||||
Proof.
|
||||
induct t; simplify; try equality.
|
||||
|
||||
rewrite IHt1, IHt2.
|
||||
rewrite <- app_assoc.
|
||||
simplify.
|
||||
equality.
|
||||
Qed.
|
||||
|
||||
Fixpoint flattenK {A R} (t : tree A) (acc : list A) (k : list A -> R) : R :=
|
||||
match t with
|
||||
| Leaf => k acc
|
||||
| Node l d r => flattenK r acc (fun acc' =>
|
||||
flattenK l (d :: acc') k)
|
||||
end.
|
||||
|
||||
Theorem flattenK_ok : forall {A R} (t : tree A) acc (k : list A -> R),
|
||||
flattenK t acc k = k (flattenAcc t acc).
|
||||
Proof.
|
||||
induct t; simplify; try equality.
|
||||
|
||||
rewrite IHt2, IHt1.
|
||||
equality.
|
||||
Qed.
|
||||
|
||||
Inductive flatten_continuation {A} :=
|
||||
| KDone
|
||||
| KMore (l : tree A) (d : A) (k : flatten_continuation).
|
||||
Arguments flatten_continuation : clear implicits.
|
||||
|
||||
Definition apply_continuation {A} (acc : list A) (k : flatten_continuation A)
|
||||
(flattenKD : tree A -> list A -> flatten_continuation A -> list A)
|
||||
: list A :=
|
||||
match k with
|
||||
| KDone => acc
|
||||
| KMore l d k' => flattenKD l (d :: acc) k'
|
||||
end.
|
||||
|
||||
Fixpoint flattenKD {A} (fuel : nat) (t : tree A) (acc : list A)
|
||||
(k : flatten_continuation A) : list A :=
|
||||
match fuel with
|
||||
| O => []
|
||||
| S fuel' =>
|
||||
match t with
|
||||
| Leaf => apply_continuation acc k (flattenKD fuel')
|
||||
| Node l d r => flattenKD fuel' r acc (KMore l d k)
|
||||
end
|
||||
end.
|
||||
|
||||
Fixpoint continuation_depth {A} (k : flatten_continuation A) : nat :=
|
||||
match k with
|
||||
| KDone => 0
|
||||
| KMore l d k' => 1 + depth l + continuation_depth k'
|
||||
end.
|
||||
|
||||
Fixpoint flatten_cont {A} (k : flatten_continuation A) : list A :=
|
||||
match k with
|
||||
| KDone => []
|
||||
| KMore l d k' => flatten_cont k' ++ flatten l ++ [d]
|
||||
end.
|
||||
|
||||
Lemma flattenKD_ok' : forall {A} fuel fuel' (t : tree A) acc k,
|
||||
depth t + continuation_depth k < fuel' < fuel
|
||||
-> flattenKD fuel' t acc k
|
||||
= flatten_cont k ++ flatten t ++ acc.
|
||||
Proof.
|
||||
induct fuel; simplify; cases fuel'; simplify; try linear_arithmetic.
|
||||
|
||||
cases t; simplify; trivial.
|
||||
|
||||
cases k; simplify; trivial.
|
||||
rewrite IHfuel; try linear_arithmetic.
|
||||
repeat rewrite <- app_assoc.
|
||||
simplify.
|
||||
equality.
|
||||
|
||||
rewrite IHfuel.
|
||||
simplify.
|
||||
repeat rewrite <- app_assoc.
|
||||
simplify.
|
||||
equality.
|
||||
simplify.
|
||||
linear_arithmetic.
|
||||
Qed.
|
||||
|
||||
Theorem flattenKD_ok : forall {A} (t : tree A),
|
||||
flattenKD (depth t + 1) t [] KDone = flatten t.
|
||||
Proof.
|
||||
simplify.
|
||||
rewrite flattenKD_ok' with (fuel := depth t + 2).
|
||||
simplify.
|
||||
apply app_nil_r.
|
||||
simplify.
|
||||
linear_arithmetic.
|
||||
Qed.
|
||||
|
|
Loading…
Reference in a new issue