# Inheritance for functors

Excuse me the lengthy example:

``````module type MONAD = sig
type ('r, 'a) t
val return : 'a -> ('r, 'a) t
val bind : ('r, 'a) t -> ('a -> ('r, 'b) t) -> ('r, 'b) t
end

type ('r, 'a) monad = ('r, 'a) t
let run x = x
let (>>=) a b = bind a b
let rec foldM f a = function
| [] -> return a
| x::xs -> f a x >>= fun a' -> foldM f a' xs
let whenM p s = if p then s else return ()
let lift f m = perform x <-- m; return (f x)
let join m = perform x <-- m; x
let (>=>) f g = fun x -> f x >>= g
end

val run : ('a, 'b) monad -> ('a, 'b) M.t
val return : 'a -> ('b, 'a) monad
val ( >>= ) :
val foldM :
('a -> 'b -> ('c, 'a) monad) -> 'a -> 'b list -> ('c, 'a) monad
val whenM : bool -> ('a, unit) monad -> ('a, unit) monad
val lift : ('a -> 'b) -> ('c, 'a) monad -> ('c, 'b) monad
val ( >=> ) :
('a -> ('b, 'c) monad) ->
end)

val mzero : ('r, 'a) t
val mplus : ('r, 'a) t -> ('r, 'a) t -> ('r, 'a) t
end

let fail = mzero
let (++) a b = mplus a b
let guard p = if p then return () else fail
end
``````

Is there a way to have `MonadPlus` analogous to `Monad` without excessive signature code duplication? Along the lines of (wrong solution):

``````module MonadPlus = (MonadPlusOps : functor (M : MONAD_PLUS) -> sig
include module type of MonadPlusOps (M)
end)
``````

or (does not type-check):

``````module MonadPlus = (MonadPlusOps : functor (M : MONAD_PLUS) -> sig
val mzero : ('a, 'b) monad
(* ... *)
end)
``````

Edit: updated -- better final solution

``````module type MONAD = sig
type ('s, 'a) t
val return : 'a -> ('s, 'a) t
val bind : ('s, 'a) t -> ('a -> ('s, 'b) t) -> ('s, 'b) t
end

val ( >>= ) :
val foldM :
('a -> 'b -> ('s, 'a) monad) -> 'a -> 'b list -> ('s, 'a) monad
val whenM : bool -> ('s, unit) monad -> ('s, unit) monad
val lift : ('a -> 'b) -> ('s, 'a) monad -> ('s, 'b) monad
val ( >=> ) :
('a -> ('s, 'b) monad) ->
end

open M
type ('s, 'a) monad = ('s, 'a) t
let run x = x
let (>>=) a b = bind a b
let rec foldM f a = function
| [] -> return a
| x::xs -> f a x >>= fun a' -> foldM f a' xs
let whenM p s = if p then s else return ()
let lift f m = perform x <-- m; return (f x)
let join m = perform x <-- m; x
let (>=>) f g = fun x -> f x >>= g
end

sig
val run : ('s, 'a) monad -> ('s, 'a) M.t
end = struct
include M
end

val mzero : ('s, 'a) t
val mplus : ('s, 'a) t -> ('s, 'a) t -> ('s, 'a) t
end

val mzero : ('s, 'a) monad
val fail : ('s, 'a) monad
val guard : bool -> ('s, unit) monad
end

sig
val run : ('s, 'a) monad -> ('s, 'a) M.t
end = struct
include M
let fail = mzero
let (++) a b = mplus a b
let guard p = if p then return () else fail
end
``````
-

I'm not entirely sure what you are trying to achieve, but I would perhaps try to factor it as follows:

``````module type MONAD =
sig
type ('r, 'a) t
val return : 'a -> ('r, 'a) t
val bind : ('r, 'a) t -> ('a -> ('r, 'b) t) -> ('r, 'b) t
end

sig
(* ... *)
end

sig
end =
struct
type ('r, 'a) monad = ('r, 'a) t
let run x = x
let (>>=) = bind
let rec foldM f a = function
| [] -> return a
| x::xs -> f a x >>= fun a' -> foldM f a' xs
(* ... *)
end

val mzero : ('r, 'a) t
val mplus : ('r, 'a) t -> ('r, 'a) t -> ('r, 'a) t
end

sig
val fail : ('r, 'a) monad
(* ... *)
end

sig
end =
struct
let fail = mzero
let (++) = mplus
(* ... *)
end
``````
-
Yep! I've just come up with the MONAD_OPS part myself, it should have been straightforward but I guess I need more experience. –  lukstafi Dec 12 '12 at 23:20
I'm sorry, I've accepted too quickly. I want `'a monad` to be abstract and `run` to expose the type. But factoring as above almost gets me there. –  lukstafi Dec 12 '12 at 23:26
Then all you need to change is leaving out the `with type` on the `include MONAD_OPS` and `include MONAD_PLUS_OPS` I'd say. –  Andreas Rossberg Dec 12 '12 at 23:32
No, sorry, you'd need to include type t in the _OPS signatures. –  Andreas Rossberg Dec 12 '12 at 23:35
Only that I do not want `type t` in the final signatures, rather I want `val run : 'a monad -> 'a M.t` in the functors. But thank you, I'll sort it out. (`val run ...` below `include MONAD_OPS` rather than in `MONAD_OPS`.) –  lukstafi Dec 12 '12 at 23:43

As a complement to Andreas' answer, I wished to show that you can use functors to produce signatures. I haven't exactly followed the discussion on which exact level of type abstraction you want, so this code is to be compared with Andreas' version.

``````module MonadSig = struct
module type S = sig
type ('r, 'a) t
val return : 'a -> ('r, 'a) t
val bind : ('r, 'a) t -> ('a -> ('r, 'b) t) -> ('r, 'b) t
end
end

module type S = sig
type ('a, 'b) monad = ('a, 'b) M.t
(* ... *)
end
end

open M
type ('r, 'a) monad = ('r, 'a) t
let run x = x
let (>>=) = bind
let rec foldM f a = function
| [] -> return a
| x::xs -> f a x >>= fun a' -> foldM f a' xs
(* ... *)
end

module type S = sig
val mzero : ('r, 'a) t
val mplus : ('r, 'a) t -> ('r, 'a) t -> ('r, 'a) t
end
end

module type S = sig
val fail : ('r, 'a) monad
(* ... *)
end
end

open M
let fail = mzero
let (++) = mplus
(* ... *)
end
``````

The idea is that to provide a signature parametrized on something, you can either embed this signature into a parametrized functor (I'd call this the "functor style"), or define the parameters as abstract (but they're really inputs rather than outputs) and, at use site, equate them with the actual parameters (I'd call this the "mixin style"). I'm not saying the code above is better than Andreas', in fact I'd probably rather use his version, but its interesting to compare them.

-
Worth remembering although I don't think it helps here. What would help is nested modules -- perhaps `module MonadPlus ... = struct include M include MonadOps(M).Ops` without clashing redefinitions. `MonadOps` would define functions in `Ops` and then `include Ops`. –  lukstafi Dec 13 '12 at 11:30
But I get a syntax error in `include MonadOps(M).Ops`, see updated edit in the question. –  lukstafi Dec 13 '12 at 11:42
OK, it is enough to name the application `module MO = MonadOps(M) include MO.Ops`. –  lukstafi Dec 13 '12 at 13:19
I tested that my code compiles with OCaml 4.00. It must be a different with older versions. –  gasche Dec 13 '12 at 14:24
Also I indeed explicitly chose the style where `MonadOps(M)` only provides the delta it actually provides, instead of (needlessly?) re-copying `M`. –  gasche Dec 13 '12 at 14:26