Mercurial > cpdt > repo
diff src/Generic.v @ 216:d1464997078d
Switch DepList to inductive, not recursive, types
| author | Adam Chlipala <adamc@hcoop.net> |
|---|---|
| date | Wed, 11 Nov 2009 14:28:47 -0500 |
| parents | f8bcd33bdd91 |
| children | dbac52f5bce1 |
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--- a/src/Generic.v Wed Nov 11 14:00:04 2009 -0500 +++ b/src/Generic.v Wed Nov 11 14:28:47 2009 -0500 @@ -1,4 +1,4 @@ -(* Copyright (c) 2008, Adam Chlipala +(* Copyright (c) 2008-2009, Adam Chlipala * * This work is licensed under a * Creative Commons Attribution-Noncommercial-No Derivative Works 3.0 @@ -70,17 +70,17 @@ (* begin thide *) Definition Empty_set_den : datatypeDenote Empty_set Empty_set_dt := - hnil. + HNil. Definition unit_den : datatypeDenote unit unit_dt := - [!, ! ~> tt] ::: hnil. + [!, ! ~> tt] ::: HNil. Definition bool_den : datatypeDenote bool bool_dt := - [!, ! ~> true] ::: [!, ! ~> false] ::: hnil. + [!, ! ~> true] ::: [!, ! ~> false] ::: HNil. Definition nat_den : datatypeDenote nat nat_dt := - [!, ! ~> O] ::: [!, r # 1 ~> S (hd r)] ::: hnil. + [!, ! ~> O] ::: [!, r # 1 ~> S (hd r)] ::: HNil. Definition list_den (A : Type) : datatypeDenote (list A) (list_dt A) := - [!, ! ~> nil] ::: [x, r # 1 ~> x :: hd r] ::: hnil. + [!, ! ~> nil] ::: [x, r # 1 ~> x :: hd r] ::: HNil. Definition tree_den (A : Type) : datatypeDenote (tree A) (tree_dt A) := - [v, ! ~> Leaf v] ::: [!, r # 2 ~> Node (hd r) (hd (tl r))] ::: hnil. + [v, ! ~> Leaf v] ::: [!, r # 2 ~> Node (hd r) (hd (tl r))] ::: HNil. (* end thide *) @@ -100,36 +100,36 @@ Eval compute in size Empty_set_fix. Definition unit_fix : fixDenote unit unit_dt := - fun R cases _ => (fst cases) tt inil. + fun R cases _ => (hhd cases) tt INil. Eval compute in size unit_fix. Definition bool_fix : fixDenote bool bool_dt := fun R cases b => if b - then (fst cases) tt inil - else (fst (snd cases)) tt inil. + then (hhd cases) tt INil + else (hhd (htl cases)) tt INil. Eval compute in size bool_fix. Definition nat_fix : fixDenote nat nat_dt := fun R cases => fix F (n : nat) : R := match n with - | O => (fst cases) tt inil - | S n' => (fst (snd cases)) tt (icons (F n') inil) + | O => (hhd cases) tt INil + | S n' => (hhd (htl cases)) tt (ICons (F n') INil) end. Eval cbv beta iota delta -[plus] in size nat_fix. Definition list_fix (A : Type) : fixDenote (list A) (list_dt A) := fun R cases => fix F (ls : list A) : R := match ls with - | nil => (fst cases) tt inil - | x :: ls' => (fst (snd cases)) x (icons (F ls') inil) + | nil => (hhd cases) tt INil + | x :: ls' => (hhd (htl cases)) x (ICons (F ls') INil) end. Eval cbv beta iota delta -[plus] in fun A => size (@list_fix A). Definition tree_fix (A : Type) : fixDenote (tree A) (tree_dt A) := fun R cases => fix F (t : tree A) : R := match t with - | Leaf x => (fst cases) x inil - | Node t1 t2 => (fst (snd cases)) tt (icons (F t1) (icons (F t2) inil)) + | Leaf x => (hhd cases) x INil + | Node t1 t2 => (hhd (htl cases)) tt (ICons (F t1) (ICons (F t2) INil)) end. Eval cbv beta iota delta -[plus] in fun A => size (@tree_fix A). (* end thide *) @@ -157,15 +157,15 @@ ++ foldr (fun s acc => ", " ++ s ++ acc) ")" r) pr). (* end thide *) -Eval compute in print hnil Empty_set_fix. -Eval compute in print (^ "tt" (fun _ => "") ::: hnil) unit_fix. +Eval compute in print HNil Empty_set_fix. +Eval compute in print (^ "tt" (fun _ => "") ::: HNil) unit_fix. Eval compute in print (^ "true" (fun _ => "") ::: ^ "false" (fun _ => "") - ::: hnil) bool_fix. + ::: HNil) bool_fix. Definition print_nat := print (^ "O" (fun _ => "") ::: ^ "S" (fun _ => "") - ::: hnil) nat_fix. + ::: HNil) nat_fix. Eval cbv beta iota delta -[append] in print_nat. Eval simpl in print_nat 0. Eval simpl in print_nat 1. @@ -174,11 +174,11 @@ Eval cbv beta iota delta -[append] in fun A (pr : A -> string) => print (^ "nil" (fun _ => "") ::: ^ "cons" pr - ::: hnil) (@list_fix A). + ::: HNil) (@list_fix A). Eval cbv beta iota delta -[append] in fun A (pr : A -> string) => print (^ "Leaf" pr ::: ^ "Node" (fun _ => "") - ::: hnil) (@tree_fix A). + ::: HNil) (@tree_fix A). (** ** Mapping *) @@ -225,16 +225,15 @@ forall (R : Type) (cases : datatypeDenote R dt) c (m : member c dt) (x : nonrecursive c) (r : ilist T (recursive c)), - fx R cases ((hget dd m) x r) - = (hget cases m) x (imap (fx R cases) r). + fx cases ((hget dd m) x r) + = (hget cases m) x (imap (fx cases) r). End ok. Implicit Arguments datatypeDenoteOk [T dt]. Lemma foldr_plus : forall n (ils : ilist nat n), foldr plus 1 ils > 0. - induction n; crush. - generalize (IHn b); crush. + induction ils; crush. Qed. (* end thide *) @@ -265,12 +264,11 @@ end; crush. induction (recursive c); crush. - destruct r; reflexivity. - destruct r; crush. - rewrite (H None). - unfold icons. + dep_destruct r; reflexivity. + dep_destruct r; crush. + rewrite (H First). f_equal. apply IHn; crush. - apply (H (Some i0)). + apply (H (Next i)). Qed. (* end thide *)