Safe Haskell | Safe-Inferred |
---|---|
Language | Haskell2010 |
Synopsis
- type Program instr = ProgramT instr Identity
- singleton :: instr a -> ProgramT instr m a
- type ProgramView instr = ProgramViewT instr Identity
- view :: Program instr a -> ProgramView instr a
- interpretWithMonad :: forall instr m b. Monad m => (forall a. instr a -> m a) -> Program instr b -> m b
- data ProgramT instr m a
- data ProgramViewT instr m a where
- Return :: a -> ProgramViewT instr m a
- (:>>=) :: instr b -> (b -> ProgramT instr m a) -> ProgramViewT instr m a
- viewT :: Monad m => ProgramT instr m a -> m (ProgramViewT instr m a)
- liftProgram :: Monad m => Program instr a -> ProgramT instr m a
- mapInstr :: forall instr1 instr2 m a. Monad m => (forall x. instr1 x -> instr2 x) -> ProgramT instr1 m a -> ProgramT instr2 m a
- unviewT :: Monad m => ProgramViewT instr m a -> ProgramT instr m a
- interpretWithMonadT :: Monad m => (forall x. instr x -> m x) -> ProgramT instr m a -> m a
Synopsis
To write a monad, use the Program
type.
To write a monad transformer, use the ProgramT
type.
For easier interoperability,
the Program
type is actually a type synonym
and defined in terms of ProgramT
.
Overview
The basic idea for implementing monads with this libary is to think of monads as sequences of primitive instructions. For instance, imagine that you want to write a web application with a custom monad that features an instruction
askUserInput :: CustomMonad UserInput
which sends a form to the remote user and waits for the user to send back his input
To implement this monad, you decide that this instruction is a primitive, i.e. should not be implemented in terms of other, more basic instructions. Once you have chosen your primitives, collect them in a data type
data CustomMonadInstruction a where AskUserInput :: CustomMonadInstruction UserInput
Then, obtain your custom monad simply by applying the Program
type constructor
type CustomMonad a = Program CustomMonadInstruction a
The library makes sure that it is an instance of the Monad
class
and fulfills all the required laws.
Essentially, the monad you now obtained is just a
fancy list of primitive instructions.
In particular, you can pattern match on the first element of this "list".
This is how you implement an interpret
or run
function for your monad.
Note that pattern matching is done using the view
function
runCustomMonad :: CustomMonad a -> IO a runCustomMonad m = case view m of Return a -> return a -- done, return the result AskUserInput :>>= k -> do b <- waitForUserInput -- wait for external user input runCustomMonad (k b) -- proceed with next instruction
The point is that you can now proceed in any way you like:
you can wait for the user to return input as shown,
or you store the continuation k
and retrieve it when
your web application receives another HTTP request,
or you can keep a log of all user inputs on the client side and replay them,
and so on. Moreover, you can implement different run
functions
for one and the same custom monad, which is useful for testing.
Also note that the result type of the run
function does not need to
be a monad at all.
In essence, your custom monad allows you to express your web application as a simple imperative program, while the underlying implementation can freely map this to an event-drived model or some other control flow architecture of your choice.
The possibilities are endless. More usage examples can be found here: https://github.com/HeinrichApfelmus/operational/tree/master/doc/examples#readme
Monad
singleton :: instr a -> ProgramT instr m a Source #
Program made from a single primitive instruction.
type ProgramView instr = ProgramViewT instr Identity Source #
View type for inspecting the first instruction.
It has two constructors Return
and :>>=
.
(For technical reasons, they are documented at ProgramViewT
.)
view :: Program instr a -> ProgramView instr a Source #
View function for inspecting the first instruction.
Example usage
Stack machine from "The Operational Monad Tutorial".
data StackInstruction a where Push :: Int -> StackInstruction () Pop :: StackInstruction Int type StackProgram a = Program StackInstruction a type Stack b = [b] interpret :: StackProgram a -> (Stack Int -> a) interpret = eval . view where eval :: ProgramView StackInstruction a -> (Stack Int -> a) eval (Push a :>>= is) stack = interpret (is ()) (a:stack) eval (Pop :>>= is) (a:stack) = interpret (is a ) stack eval (Return a) stack = a
In this example, the type signature for the eval
helper function is optional.
interpretWithMonad :: forall instr m b. Monad m => (forall a. instr a -> m a) -> Program instr b -> m b Source #
Utility function that extends
a given interpretation of instructions as monadic actions
to an interpration of Program
s as monadic actions.
This function can be useful if you are mainly interested in
mapping a Program
to different standard monads, like the state monad.
For implementing a truly custom monad,
you should write your interpreter directly with view
instead.
Monad transformer
data ProgramT instr m a Source #
The abstract data type
represents programs
over a base monad ProgramT
instr m am
,
i.e. sequences of primitive instructions and actions from the base monad.
- The primitive instructions are given by the type constructor
instr :: * -> *
. m
is the base monad, embedded withlift
.a
is the return type of a program.
is a monad transformer and
automatically obeys both the monad and the lifting laws.ProgramT
instr m
Instances
MonadReader r m => MonadReader r (ProgramT instr m) Source # | |
MonadState s m => MonadState s (ProgramT instr m) Source # | |
MonadTrans (ProgramT instr) Source # | |
Defined in Control.Monad.Operational | |
MonadIO m => MonadIO (ProgramT instr m) Source # | |
Defined in Control.Monad.Operational | |
Monad m => Applicative (ProgramT instr m) Source # | |
Defined in Control.Monad.Operational pure :: a -> ProgramT instr m a # (<*>) :: ProgramT instr m (a -> b) -> ProgramT instr m a -> ProgramT instr m b # liftA2 :: (a -> b -> c) -> ProgramT instr m a -> ProgramT instr m b -> ProgramT instr m c # (*>) :: ProgramT instr m a -> ProgramT instr m b -> ProgramT instr m b # (<*) :: ProgramT instr m a -> ProgramT instr m b -> ProgramT instr m a # | |
Monad m => Functor (ProgramT instr m) Source # | |
Monad m => Monad (ProgramT instr m) Source # | |
data ProgramViewT instr m a where Source #
View type for inspecting the first instruction. This is very similar to pattern matching on lists.
- The case
(Return a)
means that the program contains no instructions and just returns the resulta
. - The case
(someInstruction :>>= k)
means that the first instruction issomeInstruction
and the remaining program is given by the functionk
.
Return :: a -> ProgramViewT instr m a | |
(:>>=) :: instr b -> (b -> ProgramT instr m a) -> ProgramViewT instr m a |
Instances
viewT :: Monad m => ProgramT instr m a -> m (ProgramViewT instr m a) Source #
View function for inspecting the first instruction.
Example usage
List monad transformer.
data PlusI m a where Zero :: PlusI m a Plus :: ListT m a -> ListT m a -> PlusI m a type ListT m a = ProgramT (PlusI m) m a runList :: Monad m => ListT m a -> m [a] runList = eval <=< viewT where eval :: Monad m => ProgramViewT (PlusI m) m a -> m [a] eval (Return x) = return [x] eval (Zero :>>= k) = return [] eval (Plus m n :>>= k) = liftM2 (++) (runList (m >>= k)) (runList (n >>= k))
In this example, the type signature for the eval
helper function is optional.
liftProgram :: Monad m => Program instr a -> ProgramT instr m a Source #
Lift a plain sequence of instructions to a sequence
of instructions over a monad m
.
This is the counterpart of the lift
function from MonadTrans
.
It can be defined as follows:
liftProgram = eval . view where eval :: ProgramView instr a -> ProgramT instr m a eval (Return a) = return a eval (i :>>= k) = singleton i >>= liftProgram . k
mapInstr :: forall instr1 instr2 m a. Monad m => (forall x. instr1 x -> instr2 x) -> ProgramT instr1 m a -> ProgramT instr2 m a Source #
Extend a mapping of instructions to a mapping of ProgramT
.
unviewT :: Monad m => ProgramViewT instr m a -> ProgramT instr m a Source #
Utilitiy function for mapping a ProgramViewT
back into a ProgramT
.
Semantically, the function unviewT
is an inverse of viewT
,
e.g. we have
viewT (singleton i) >>= unviewT = return (singleton i)
interpretWithMonadT :: Monad m => (forall x. instr x -> m x) -> ProgramT instr m a -> m a Source #
Utility function that extends
a given interpretation of instructions as monadic actions
to an interpration of ProgramT
s as monadic actions.
Ideally, you would not use another monad,
but write a custom interpreter directly with viewT
.
See the remark at interpretWithMonad
.