Safe Haskell | Safe-Inferred |
---|---|
Language | Haskell2010 |
Synopsis
- newtype Sem r a = Sem {}
- class Member (t :: Effect) (r :: EffectRow)
- type family Members es r :: Constraint where ...
- send :: Member e r => e (Sem r) a -> Sem r a
- sendUsing :: ElemOf e r -> e (Sem r) a -> Sem r a
- embed :: Member (Embed m) r => m a -> Sem r a
- run :: Sem '[] a -> a
- runM :: Monad m => Sem '[Embed m] a -> m a
- raise_ :: forall r r' a. Raise r r' => Sem r a -> Sem r' a
- class Raise (r :: EffectRow) (r' :: EffectRow) where
- raiseUnion :: Union r m a -> Union r' m a
- raise :: forall e r a. Sem r a -> Sem (e ': r) a
- raiseUnder :: forall e2 e1 r a. Sem (e1 ': r) a -> Sem (e1 ': (e2 ': r)) a
- raiseUnder2 :: forall e2 e3 e1 r a. Sem (e1 ': r) a -> Sem (e1 ': (e2 ': (e3 ': r))) a
- raiseUnder3 :: forall e2 e3 e4 e1 r a. Sem (e1 ': r) a -> Sem (e1 ': (e2 ': (e3 ': (e4 ': r)))) a
- raise2Under :: forall e3 e1 e2 r a. Sem (e1 ': (e2 ': r)) a -> Sem (e1 ': (e2 ': (e3 ': r))) a
- raise3Under :: forall e4 e1 e2 e3 r a. Sem (e1 ': (e2 ': (e3 ': r))) a -> Sem (e1 ': (e2 ': (e3 ': (e4 ': r)))) a
- subsume_ :: forall r r' a. Subsume r r' => Sem r a -> Sem r' a
- class Subsume (r :: EffectRow) (r' :: EffectRow) where
- subsumeUnion :: Union r m a -> Union r' m a
- subsume :: forall e r a. Member e r => Sem (e ': r) a -> Sem r a
- subsumeUsing :: forall e r a. ElemOf e r -> Sem (e ': r) a -> Sem r a
- insertAt :: forall index inserted head oldTail tail old full a. (ListOfLength index head, WhenStuck index InsertAtUnprovidedIndex, old ~ Append head oldTail, tail ~ Append inserted oldTail, full ~ Append head tail, InsertAtIndex index head tail oldTail full inserted) => Sem old a -> Sem full a
- newtype Embed m (z :: Type -> Type) a where
- usingSem :: Monad m => (forall x. Union r (Sem r) x -> m x) -> Sem r a -> m a
- liftSem :: Union r (Sem r) a -> Sem r a
- hoistSem :: (forall x. Union r (Sem r) x -> Union r' (Sem r') x) -> Sem r a -> Sem r' a
- restack :: (forall e. ElemOf e r -> ElemOf e r') -> Sem r a -> Sem r' a
- type family Append l r where ...
- type InterpreterFor e r = forall a. Sem (e ': r) a -> Sem r a
- type InterpretersFor es r = forall a. Sem (Append es r) a -> Sem r a
Documentation
The Sem
monad handles computations of arbitrary extensible effects.
A value of type Sem r
describes a program with the capabilities of
r
. For best results, r
should always be kept polymorphic, but you can
add capabilities via the Member
constraint.
The value of the Sem
monad is that it allows you to write programs
against a set of effects without a predefined meaning, and provide that
meaning later. For example, unlike with mtl, you can decide to interpret an
Error
effect traditionally as an Either
, or instead
as (a significantly faster) IO
Exception
. These
interpretations (and others that you might add) may be used interchangeably
without needing to write any newtypes or Monad
instances. The only
change needed to swap interpretations is to change a call from
runError
to errorToIOFinal
.
The effect stack r
can contain arbitrary other monads inside of it. These
monads are lifted into effects via the Embed
effect. Monadic values can be
lifted into a Sem
via embed
.
Higher-order actions of another monad can be lifted into higher-order actions
of Sem
via the Final
effect, which is more powerful
than Embed
, but also less flexible to interpret.
A Sem
can be interpreted as a pure value (via run
) or as any
traditional Monad
(via runM
or runFinal
).
Each effect E
comes equipped with some interpreters of the form:
runE ::Sem
(E ': r) a ->Sem
r a
which is responsible for removing the effect E
from the effect stack. It
is the order in which you call the interpreters that determines the
monomorphic representation of the r
parameter.
Order of interpreters can be important - it determines behaviour of effects that manipulate state or change control flow. For example, when interpreting this action:
>>>
:{
example :: Members '[State String, Error String] r => Sem r String example = do put "start" let throwing, catching :: Members '[State String, Error String] r => Sem r String throwing = do modify (++"-throw") throw "error" get catching = do modify (++"-catch") get catch @String throwing (\ _ -> catching) :}
when handling Error
first, state is preserved after error
occurs:
>>>
:{
example & runError & fmap (either id id) & evalState "" & runM & (print =<<) :} "start-throw-catch"
while handling State
first discards state in such cases:
>>>
:{
example & evalState "" & runError & fmap (either id id) & runM & (print =<<) :} "start-catch"
A good rule of thumb is to handle effects which should have "global" behaviour over other effects later in the chain.
After all of your effects are handled, you'll be left with either
a
, a Sem
'[] a
, or a Sem
'[ Embed
m ] a
value, which can be consumed respectively by Sem
'[ Final
m ] arun
, runM
, and
runFinal
.
Examples
As an example of keeping r
polymorphic, we can consider the type
Member
(State
String) r =>Sem
r ()
to be a program with access to
get
::Sem
r Stringput
:: String ->Sem
r ()
methods.
By also adding a
Member
(Error
Bool) r
constraint on r
, we gain access to the
throw
:: Bool ->Sem
r acatch
::Sem
r a -> (Bool ->Sem
r a) ->Sem
r a
functions as well.
In this sense, a
constraint is
analogous to mtl's Member
(State
s) r
and should
be thought of as such. However, unlike mtl, a MonadState
s mSem
monad may have
an arbitrary number of the same effect.
For example, we can write a Sem
program which can output either
Int
s or Bool
s:
foo :: (Member
(Output
Int) r ,Member
(Output
Bool) r ) =>Sem
r () foo = dooutput
@Int 5output
True
Notice that we must use -XTypeApplications
to specify that we'd like to
use the (Output
Int
) effect.
Since: 0.1.2.0
Instances
Member (Fail :: (Type -> Type) -> Type -> Type) r => MonadFail (Sem r) Source # | Since: 1.1.0.0 |
Defined in Polysemy.Internal | |
Member Fixpoint r => MonadFix (Sem r) Source # | |
Defined in Polysemy.Internal | |
Member (Embed IO) r => MonadIO (Sem r) Source # | This instance will only lift |
Defined in Polysemy.Internal | |
Member NonDet r => Alternative (Sem r) Source # | |
Applicative (Sem f) Source # | |
Functor (Sem f) Source # | |
Monad (Sem f) Source # | |
Member NonDet r => MonadPlus (Sem r) Source # | Since: 0.2.1.0 |
Monoid a => Monoid (Sem f a) Source # | Since: 1.6.0.0 |
Semigroup a => Semigroup (Sem f a) Source # | Since: 1.6.0.0 |
class Member (t :: Effect) (r :: EffectRow) Source #
membership'
Instances
Member t z => Member t (_1 ': z) Source # | |
Defined in Polysemy.Internal.Union membership' :: ElemOf t (_1 ': z) | |
Member t (t ': z) Source # | |
Defined in Polysemy.Internal.Union membership' :: ElemOf t (t ': z) |
type family Members es r :: Constraint where ... Source #
Makes constraints of functions that use multiple effects shorter by
translating single list of effects into multiple Member
constraints:
foo ::Members
'[Output
Int ,Output
Bool ,State
String ] r =>Sem
r ()
translates into:
foo :: (Member
(Output
Int) r ,Member
(Output
Bool) r ,Member
(State
String) r ) =>Sem
r ()
Since: 0.1.2.0
send :: Member e r => e (Sem r) a -> Sem r a Source #
Execute an action of an effect.
This is primarily used to create methods for actions of effects:
data FooBar m a where Foo :: String -> m a -> FooBar m a Bar :: FooBar m Int foo :: Member FooBar r => String -> Sem r a -> Sem r a foo s m = send (Foo s m) bar :: Member FooBar r => Sem r Int bar = send Bar
makeSem
allows you to eliminate this boilerplate.
@since TODO
sendUsing :: ElemOf e r -> e (Sem r) a -> Sem r a Source #
Embed an effect into a Sem
, given an explicit proof
that the effect exists in r
.
This is useful in conjunction with tryMembership
,
in order to conditionally make use of effects.
embed :: Member (Embed m) r => m a -> Sem r a Source #
Embed a monadic action m
in Sem
.
Since: 1.0.0.0
raise_ :: forall r r' a. Raise r r' => Sem r a -> Sem r' a Source #
Introduce an arbitrary number of effects on top of the effect stack. This
function is highly polymorphic, so it may be good idea to use its more
concrete versions (like raise
) or type annotations to avoid vague errors
in ambiguous contexts.
Since: 1.4.0.0
class Raise (r :: EffectRow) (r' :: EffectRow) where Source #
See raise'
.
Since: 1.4.0.0
raiseUnion :: Union r m a -> Union r' m a Source #
Instances
raiseUnder :: forall e2 e1 r a. Sem (e1 ': r) a -> Sem (e1 ': (e2 ': r)) a Source #
Like raise
, but introduces a new effect underneath the head of the
list. See raiseUnder2
or raiseUnder3
for introducing more effects. If
you need to introduce even more of them, check out subsume_
.
raiseUnder
can be used in order to turn transformative interpreters
into reinterpreters. This is especially useful if you're writing an
interpreter which introduces an intermediary effect, and then want to use
an existing interpreter on that effect.
For example, given:
fooToBar ::Member
Bar r =>Sem
(Foo ': r) a ->Sem
r a runBar ::Sem
(Bar ': r) a ->Sem
r a
You can write:
runFoo ::Sem
(Foo ': r) a ->Sem
r a runFoo = runBar -- Consume Bar . fooToBar -- Interpret Foo in terms of the new Bar .raiseUnder
-- Introduces Bar under Foo
Since: 1.2.0.0
raiseUnder2 :: forall e2 e3 e1 r a. Sem (e1 ': r) a -> Sem (e1 ': (e2 ': (e3 ': r))) a Source #
Like raise
, but introduces two new effects underneath the head of the
list.
Since: 1.2.0.0
raiseUnder3 :: forall e2 e3 e4 e1 r a. Sem (e1 ': r) a -> Sem (e1 ': (e2 ': (e3 ': (e4 ': r)))) a Source #
Like raise
, but introduces three new effects underneath the head of the
list.
Since: 1.2.0.0
raise2Under :: forall e3 e1 e2 r a. Sem (e1 ': (e2 ': r)) a -> Sem (e1 ': (e2 ': (e3 ': r))) a Source #
Like raise
, but introduces an effect two levels underneath the head of
the list.
Since: 1.4.0.0
raise3Under :: forall e4 e1 e2 e3 r a. Sem (e1 ': (e2 ': (e3 ': r))) a -> Sem (e1 ': (e2 ': (e3 ': (e4 ': r)))) a Source #
Like raise
, but introduces an effect three levels underneath the head
of the list.
Since: 1.4.0.0
subsume_ :: forall r r' a. Subsume r r' => Sem r a -> Sem r' a Source #
Allows reordering and adding known effects on top of the effect stack, as
long as the polymorphic "tail" of new stack is a raise
-d version of the
original one. This function is highly polymorphic, so it may be a good idea
to use its more concrete version (subsume
), fitting functions from the
raise
family or type annotations to avoid vague errors in ambiguous
contexts.
Since: 1.4.0.0
class Subsume (r :: EffectRow) (r' :: EffectRow) where Source #
See subsume_
.
Since: 1.4.0.0
subsumeUnion :: Union r m a -> Union r' m a Source #
subsume :: forall e r a. Member e r => Sem (e ': r) a -> Sem r a Source #
Interprets an effect in terms of another identical effect.
This is useful for defining interpreters that use reinterpretH
without immediately consuming the newly introduced effect.
Using such an interpreter recursively may result in duplicate effects,
which may then be eliminated using subsume
.
For a version that can introduce an arbitrary number of new effects and
reorder existing ones, see subsume_
.
Since: 1.2.0.0
subsumeUsing :: forall e r a. ElemOf e r -> Sem (e ': r) a -> Sem r a Source #
Interprets an effect in terms of another identical effect, given an
explicit proof that the effect exists in r
.
This is useful in conjunction with tryMembership
in order to conditionally make use of effects. For example:
tryListen ::KnownRow
r =>Sem
r a -> Maybe (Sem
r ([Int], a)) tryListen m = casetryMembership
@(Writer
[Int]) of Just pr -> Just $subsumeUsing
pr (listen
(raise
m)) _ -> Nothing
Since: 1.3.0.0
insertAt :: forall index inserted head oldTail tail old full a. (ListOfLength index head, WhenStuck index InsertAtUnprovidedIndex, old ~ Append head oldTail, tail ~ Append inserted oldTail, full ~ Append head tail, InsertAtIndex index head tail oldTail full inserted) => Sem old a -> Sem full a Source #
Introduce a set of effects into Sem
at the index i
, before the effect
that previously occupied that position. This is intended to be used with a
type application:
let sem1 :: Sem [e1, e2, e3, e4, e5] a sem1 = insertAt @2 (sem0 :: Sem [e1, e2, e5] a)
Since: 1.6.0.0
newtype Embed m (z :: Type -> Type) a where Source #
An effect which allows a regular Monad
m
into the Sem
ecosystem. Monadic actions in m
can be lifted into Sem
via
embed
.
For example, you can use this effect to lift IO
actions directly into
Sem
:
embed
(putStrLn "hello") ::Member
(Embed
IO) r =>Sem
r ()
That being said, you lose out on a significant amount of the benefits of
Sem
by using embed
directly in application code; doing
so will tie your application code directly to the underlying monad, and
prevent you from interpreting it differently. For best results, only use
Embed
in your effect interpreters.
Consider using trace
and traceToIO
as
a substitute for using putStrLn
directly.
Since: 1.0.0.0
usingSem :: Monad m => (forall x. Union r (Sem r) x -> m x) -> Sem r a -> m a Source #
Like runSem
but flipped for better ergonomics sometimes.
type InterpreterFor e r = forall a. Sem (e ': r) a -> Sem r a Source #
Type synonym for interpreters that consume an effect without changing the return value. Offered for user convenience.
r
Is kept polymorphic so it's possible to place constraints upon it:
teletypeToIO ::Member
(Embed IO) r =>InterpreterFor
Teletype r
type InterpretersFor es r = forall a. Sem (Append es r) a -> Sem r a Source #
Variant of InterpreterFor
that takes a list of effects.
@since 1.5.0.0