187 lines
5.3 KiB
OCaml
187 lines
5.3 KiB
OCaml
(* TEST *)
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(* Full fledge version, using objects to structure code *)
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open StdLabels
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open MoreLabels
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(* Use maps for substitutions and sets for free variables *)
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module Subst = Map.Make(struct type t = string let compare = compare end)
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module Names = Set.Make(struct type t = string let compare = compare end)
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(* To build recursive objects *)
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let lazy_fix make =
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let rec obj () = make (lazy (obj ()) : _ Lazy.t) in
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obj ()
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let (!!) = Lazy.force
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(* The basic operations *)
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class type ['a, 'b] ops =
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object
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method free : 'b -> Names.t
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method subst : sub:'a Subst.t -> 'b -> 'a
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method eval : 'b -> 'a
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end
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(* Variables are common to lambda and expr *)
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type var = [`Var of string]
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let var = object (self : ([>var], var) #ops)
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method subst ~sub (`Var s as x) =
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try Subst.find s sub with Not_found -> x
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method free (`Var s) =
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Names.singleton s
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method eval (#var as v) = v
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end
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(* The lambda language: free variables, substitutions, and evaluation *)
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type 'a lambda = [`Var of string | `Abs of string * 'a | `App of 'a * 'a]
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let next_id =
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let current = ref 3 in
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fun () -> incr current; !current
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let lambda_ops (ops : ('a,'a) #ops Lazy.t) =
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let free = lazy !!ops#free
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and subst = lazy !!ops#subst
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and eval = lazy !!ops#eval in
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object (self : ([> 'a lambda], 'a lambda) #ops)
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method free = function
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#var as x -> var#free x
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| `Abs (s, t) -> Names.remove s (!!free t)
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| `App (t1, t2) -> Names.union (!!free t1) (!!free t2)
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method private map ~f = function
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#var as x -> x
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| `Abs (s, t) as l ->
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let t' = f t in
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if t == t' then l else `Abs(s, t')
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| `App (t1, t2) as l ->
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let t'1 = f t1 and t'2 = f t2 in
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if t'1 == t1 && t'2 == t2 then l else `App (t'1, t'2)
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method subst ~sub = function
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#var as x -> var#subst ~sub x
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| `Abs(s, t) as l ->
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let used = !!free t in
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let used_expr =
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Subst.fold sub ~init:[]
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~f:(fun ~key ~data acc ->
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if Names.mem s used then data::acc else acc) in
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if List.exists used_expr ~f:(fun t -> Names.mem s (!!free t)) then
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let name = s ^ Int.to_string (next_id ()) in
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`Abs(name,
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!!subst ~sub:(Subst.add ~key:s ~data:(`Var name) sub) t)
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else
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self#map ~f:(!!subst ~sub:(Subst.remove s sub)) l
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| `App _ as l ->
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self#map ~f:(!!subst ~sub) l
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method eval l =
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match self#map ~f:!!eval l with
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`App(`Abs(s,t1), t2) ->
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!!eval (!!subst ~sub:(Subst.add ~key:s ~data:t2 Subst.empty) t1)
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| t -> t
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end
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(* Operations specialized to lambda *)
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let lambda = lazy_fix lambda_ops
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(* The expr language of arithmetic expressions *)
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type 'a expr =
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[ `Var of string | `Num of int | `Add of 'a * 'a
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| `Neg of 'a | `Mult of 'a * 'a]
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let expr_ops (ops : ('a,'a) #ops Lazy.t) =
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let free = lazy !!ops#free
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and subst = lazy !!ops#subst
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and eval = lazy !!ops#eval in
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object (self : ([> 'a expr], 'a expr) #ops)
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method free = function
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#var as x -> var#free x
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| `Num _ -> Names.empty
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| `Add(x, y) -> Names.union (!!free x) (!!free y)
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| `Neg x -> !!free x
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| `Mult(x, y) -> Names.union (!!free x) (!!free y)
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method private map ~f = function
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#var as x -> x
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| `Num _ as x -> x
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| `Add(x, y) as e ->
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let x' = f x and y' = f y in
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if x == x' && y == y' then e
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else `Add(x', y')
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| `Neg x as e ->
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let x' = f x in
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if x == x' then e else `Neg x'
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| `Mult(x, y) as e ->
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let x' = f x and y' = f y in
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if x == x' && y == y' then e
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else `Mult(x', y')
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method subst ~sub = function
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#var as x -> var#subst ~sub x
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| #expr as e -> self#map ~f:(!!subst ~sub) e
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method eval (#expr as e) =
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match self#map ~f:!!eval e with
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`Add(`Num m, `Num n) -> `Num (m+n)
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| `Neg(`Num n) -> `Num (-n)
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| `Mult(`Num m, `Num n) -> `Num (m*n)
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| e -> e
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end
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(* Specialized versions *)
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let expr = lazy_fix expr_ops
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(* The lexpr language, reunion of lambda and expr *)
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type 'a lexpr = [ 'a lambda | 'a expr ]
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let lexpr_ops (ops : ('a,'a) #ops Lazy.t) =
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let lambda = lambda_ops ops in
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let expr = expr_ops ops in
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object (self : ([> 'a lexpr], 'a lexpr) #ops)
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method free = function
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#lambda as x -> lambda#free x
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| #expr as x -> expr#free x
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method subst ~sub = function
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#lambda as x -> lambda#subst ~sub x
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| #expr as x -> expr#subst ~sub x
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method eval = function
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#lambda as x -> lambda#eval x
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| #expr as x -> expr#eval x
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end
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let lexpr = lazy_fix lexpr_ops
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let rec print = function
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| `Var id -> print_string id
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| `Abs (id, l) -> print_string ("\ " ^ id ^ " . "); print l
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| `App (l1, l2) -> print l1; print_string " "; print l2
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| `Num x -> print_int x
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| `Add (e1, e2) -> print e1; print_string " + "; print e2
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| `Neg e -> print_string "-"; print e
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| `Mult (e1, e2) -> print e1; print_string " * "; print e2
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let () =
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let e1 = lambda#eval (`App(`Abs("x",`Var"x"), `Var"y")) in
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let e2 = expr#eval (`Add(`Mult(`Num 3,`Neg(`Num 2)), `Var"x")) in
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let e3 =
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lexpr#eval (`Add(`App(`Abs("x",`Mult(`Var"x",`Var"x")),`Num 2), `Num 5))
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in
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print e1; print_newline ();
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print e2; print_newline ();
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print e3; print_newline ()
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