I know this is an old thread, but i thought I'd answer it anyway just in case
what [...] is a so-called "Freer Monad"
according to the original paper Freer Monads, More Extensible Effects a "Freer Monad" is essentially a Free Monad without the necessary Functor constraint of a Free Monad.
A free monad is basically the essence of the monadic structure; the "smallest" thing that is still a monad. A very nice practial explanation approach can be found in this article. This article also shows that the "normal" free monad needs a Functor constraint.
However, it is often quite tedious adding the functor constraint in every function (and sometimes maybe even weird to implement), and as it turns out, by "moving the functor functionality" to an argument for the
Impure constructor so that the implementing side can alter the type of the output itself (so without a general functor), it is possible to get rid of this constraint. This is done by using
GADTs: (example from the
Freer Monads paper)
data Free f a = Pure a
| Impure (f (Free f a))
instance Functor f => Monad (Free f) where
data FFree f a where
Pure :: a → FFree f a
Impure :: f x → (x → FFree f a) → FFree f a
instance Monad (FFree f) where
Impure fx k’ >>= k = Impure fx (k’ >>> k)
This basically lets the later implementation choose how to perform the
fmap operation fixed [pun not intended] to the appropriate "output/wrapped type".
So the fundamental difference is essentially usability and generality.
As there was some confusion:
FFree is the Freer monad and corresponds to
Eff in the package
good usecases for them
Freer monads, just as well as Free monads lend themselves for constructing DSLs.
consider for example a type
data Lang r where
LReturn :: Var -> Lang Int
LPrint :: IntExpr -> Lang ()
LAssign :: Var -> IntExpr -> Lang ()
LRead :: Var -> Lang Int
this tells me that there are a couple of operations to be performed in
assign x y
We use GADTs here so that we can also specify what output the individual actions are going to have. This comes in quite handy if we write functions in our DSL, because their output can be tpechecked.
adding some convenience functions (that can acutally be derived):
lReturn :: Member Lang effs
=> Var -> Eff effs Int
lReturn = send . LReturn
lPrint :: Member Lang effs
=> IntExpr -> Eff effs ()
lPrint = send . LPrint
lAssign :: Member Lang effs
=> Var -> IntExpr -> Eff effs ()
lAssign v i = send $ LAssign v i
lRead :: Member Lang effs
=> Var -> Eff effs Int
lRead = send . LRead
(this is already written using
now we can use them like this: (assuming that IntExpr contains Variables and Ints)
someFunctionPrintingAnInt = do
lAssign (Var "a") (IE_Int 12)
lPrint (IE_Var $ Var "a")
these functions now enable you to have a DSL that can be interpreted in different ways. All needed for this is an interpreter with a specific type for
effs (which is ~~ a type level list of freer monad "instances)
freer takes the idea of the freer monads and packs it into an effect system.
this interpreter could look something like this:
runLangPure :: Eff '[Lang] Int -> Either () Int -- [StateMap]
runLangPure program = fst . fst $
run (runWriter (runState empty (runError (reinterpret3 go program))))
go :: Lang v -> Eff '[Error (), State StateMap, Writer [String]] v
go (LReturn var) = get >>= go (Eval stmt) >>= tell . 
go (LPrint expr) = do
store <- get
value <- evalM expr
tell [show value]
go (LAssign var expr) = do
value <- evalM expr
--modify state (change var)
go (LRead var) = do
strValue <- getLine
get >>= insert var (stringToInt strValue)
run... part specifies the initial "state" of the monads. the
go part is the interpreter itself, interpreting the different possible actions.
Note that one can use the functions
tell in the same do block even though they are part of different monads, which brings us to
I also wonder what advantages do they provide over free monads and classic mtl stacks.
the implementation allows to use monadic actions of different parts of the "monad stack" without
About the implementation:
To understand this, we look at it from a high level of abstraction:
the auxiliary functions of our DSL are
Eff effs where it is required that
Member Lang effs.
Member constraint is just a way of declaing that
Lang is in the type-level list
Member Lang effs. (basically typelevel
Eff monad has the functionality to "ask" the
Members of the type level list of monads whether they can handle the current value (remeber, the operations are just values that are intrepreted subsequently). if so their intrepretation is executed, if not, the question is handed off to the next monad in the list.
This becomes more intuitive and understandable when spending some time in the
freer-simple code base.