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From compcert Require Errors.
From vericert Require Import Monad.
From Coq Require Import Lists.List.
Module Type State.
Parameter st : Type.
Parameter st_prop : st -> st -> Prop.
Axiom st_refl : forall s, st_prop s s.
Axiom st_trans : forall s1 s2 s3, st_prop s1 s2 -> st_prop s2 s3 -> st_prop s1 s3.
End State.
Module Statemonad(S : State) <: Monad.
Inductive res (A: Type) (s: S.st): Type :=
| Error : Errors.errmsg -> res A s
| OK : A -> forall (s' : S.st), S.st_prop s s' -> res A s.
Arguments OK [A s].
Arguments Error [A s].
Definition mon (A: Type) : Type := forall (s: S.st), res A s.
Definition ret {A: Type} (x: A) : mon A :=
fun (s : S.st) => OK x s (S.st_refl s).
Definition bind {A B: Type} (f: mon A) (g: A -> mon B) : mon B :=
fun (s : S.st) =>
match f s with
| Error msg => Error msg
| OK a s' i =>
match g a s' with
| Error msg => Error msg
| OK b s'' i' => OK b s'' (S.st_trans s s' s'' i i')
end
end.
Definition bind2 {A B C: Type} (f: mon (A * B)) (g: A -> B -> mon C) : mon C :=
bind f (fun xy => g (fst xy) (snd xy)).
Definition handle_error {A: Type} (f g: mon A) : mon A :=
fun (s : S.st) =>
match f s with
| OK a s' i => OK a s' i
| Error _ => g s
end.
Definition error {A: Type} (err: Errors.errmsg) : mon A := fun (s: S.st) => Error err.
Definition get : mon S.st := fun s => OK s s (S.st_refl s).
Definition set (s: S.st) (i: forall s', S.st_prop s' s) : mon unit :=
fun s' => OK tt s (i s').
Definition run_mon {A: Type} (s: S.st) (m: mon A): Errors.res A :=
match m s with
| OK a s' i => Errors.OK a
| Error err => Errors.Error err
end.
End Statemonad.
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