Copyright | 2009-2015 Edward Kmett 2012 Elliott Hird 2004 Oleg Kiselyov and Chung-chieh Shan |
---|---|
License | BSD3 |
Maintainer | Edward Kmett <ekmett@gmail.com> |
Stability | experimental |
Portability | non-portable |
Safe Haskell | Trustworthy |
Language | Haskell98 |
Reifies arbitrary terms at the type level. Based on the Functional Pearl: Implicit Configurations paper by Oleg Kiselyov and Chung-chieh Shan.
http://okmij.org/ftp/Haskell/tr-15-04.pdf
The approach from the paper was modified to work with Data.Proxy and to cheat by using knowledge of GHC's internal representations by Edward Kmett and Elliott Hird.
Usage comes down to two combinators, reify
and reflect
.
>>>
reify 6 (\p -> reflect p + reflect p)
12
The argument passed along by reify is just a data
, so all of the information needed to reconstruct your value
has been moved to the type level. This enables it to be used when
constructing instances (see Proxy
t =
Proxyexamples/Monoid.hs
).
In addition, a simpler API is offered for working with singleton values such as a system configuration, etc.
Synopsis
- class Reifies s a | s -> a where
- reflect :: proxy s -> a
- reify :: forall a r. a -> (forall (s :: *). Reifies s a => Proxy s -> r) -> r
- reifyNat :: forall r. Integer -> (forall (n :: Nat). KnownNat n => Proxy n -> r) -> r
- reifySymbol :: forall r. String -> (forall (n :: Symbol). KnownSymbol n => Proxy n -> r) -> r
- reifyTypeable :: Typeable a => a -> (forall (s :: *). (Typeable s, Reifies s a) => Proxy s -> r) -> r
- class Given a where
- given :: a
- give :: forall a r. a -> (Given a => r) -> r
- int :: Int -> TypeQ
- nat :: Int -> TypeQ
- data Z
- data D (n :: *)
- data SD (n :: *)
- data PD (n :: *)
- data ReifiedMonoid a = ReifiedMonoid {
- reifiedMappend :: a -> a -> a
- reifiedMempty :: a
- newtype ReflectedMonoid a s = ReflectedMonoid a
- reifyMonoid :: (a -> a -> a) -> a -> (forall (s :: *). Reifies s (ReifiedMonoid a) => t -> ReflectedMonoid a s) -> t -> a
- foldMapBy :: Foldable t => (r -> r -> r) -> r -> (a -> r) -> t a -> r
- foldBy :: Foldable t => (a -> a -> a) -> a -> t a -> a
- data ReifiedApplicative f = ReifiedApplicative {
- reifiedPure :: forall a. a -> f a
- reifiedAp :: forall a b. f (a -> b) -> f a -> f b
- newtype ReflectedApplicative f s a = ReflectedApplicative (f a)
- reifyApplicative :: (forall x. x -> f x) -> (forall x y. f (x -> y) -> f x -> f y) -> (forall (s :: *). Reifies s (ReifiedApplicative f) => t -> ReflectedApplicative f s a) -> t -> f a
- traverseBy :: Traversable t => (forall x. x -> f x) -> (forall x y. f (x -> y) -> f x -> f y) -> (a -> f b) -> t a -> f (t b)
- sequenceBy :: Traversable t => (forall x. x -> f x) -> (forall x y. f (x -> y) -> f x -> f y) -> t (f a) -> f (t a)
Reflection
class Reifies s a | s -> a where Source #
reflect :: proxy s -> a Source #
Recover a value inside a reify
context, given a proxy for its
reified type.
Instances
KnownNat n => Reifies (n :: Nat) Integer Source # | |
Defined in Data.Reflection | |
KnownSymbol n => Reifies (n :: Symbol) String Source # | |
Defined in Data.Reflection | |
Reifies Z Int Source # | |
Reifies n Int => Reifies (D n :: Type) Int Source # | |
Reifies n Int => Reifies (PD n :: Type) Int Source # | |
Reifies n Int => Reifies (SD n :: Type) Int Source # | |
reify :: forall a r. a -> (forall (s :: *). Reifies s a => Proxy s -> r) -> r Source #
Reify a value at the type level, to be recovered with reflect
.
reifySymbol :: forall r. String -> (forall (n :: Symbol). KnownSymbol n => Proxy n -> r) -> r Source #
This upgraded version of reify
can be used to generate a KnownSymbol
suitable for use with other APIs.
Available only on GHC 7.8+
>>>
import GHC.TypeLits
>>>
reifySymbol "hello" symbolVal
"hello"
>>>
reifySymbol "hello" reflect
"hello"
reifyTypeable :: Typeable a => a -> (forall (s :: *). (Typeable s, Reifies s a) => Proxy s -> r) -> r Source #
Given
Template Haskell reflection
This can be used to generate a template haskell splice for a type level version of a given int
.
This does not use GHC TypeLits, instead it generates a numeric type by hand similar to the ones used in the "Functional Pearl: Implicit Configurations" paper by Oleg Kiselyov and Chung-Chieh Shan.
instance Num (Q Exp)
provided in this package allows writing $(3)
instead of $(int 3)
.
This is a restricted version of int
that can only generate natural numbers. Attempting to generate
a negative number results in a compile time error. Also the resulting sequence will consist entirely of
Z, D, and SD constructors representing the number in zeroless binary.
Useful compile time naturals
0
2n
2n + 1
2n - 1
Reified Monoids
data ReifiedMonoid a Source #
ReifiedMonoid | |
|
newtype ReflectedMonoid a s Source #
Instances
Reifies s (ReifiedMonoid a) => Monoid (ReflectedMonoid a s) Source # | |
Defined in Data.Reflection mempty :: ReflectedMonoid a s # mappend :: ReflectedMonoid a s -> ReflectedMonoid a s -> ReflectedMonoid a s # mconcat :: [ReflectedMonoid a s] -> ReflectedMonoid a s # | |
Reifies s (ReifiedMonoid a) => Semigroup (ReflectedMonoid a s) Source # | |
Defined in Data.Reflection (<>) :: ReflectedMonoid a s -> ReflectedMonoid a s -> ReflectedMonoid a s # sconcat :: NonEmpty (ReflectedMonoid a s) -> ReflectedMonoid a s # stimes :: Integral b => b -> ReflectedMonoid a s -> ReflectedMonoid a s # |
reifyMonoid :: (a -> a -> a) -> a -> (forall (s :: *). Reifies s (ReifiedMonoid a) => t -> ReflectedMonoid a s) -> t -> a Source #
Reified Applicatives
data ReifiedApplicative f Source #
ReifiedApplicative | |
|
newtype ReflectedApplicative f s a Source #
ReflectedApplicative (f a) |
Instances
Reifies s (ReifiedApplicative f) => Applicative (ReflectedApplicative f s) Source # | |
Defined in Data.Reflection pure :: a -> ReflectedApplicative f s a # (<*>) :: ReflectedApplicative f s (a -> b) -> ReflectedApplicative f s a -> ReflectedApplicative f s b # liftA2 :: (a -> b -> c) -> ReflectedApplicative f s a -> ReflectedApplicative f s b -> ReflectedApplicative f s c # (*>) :: ReflectedApplicative f s a -> ReflectedApplicative f s b -> ReflectedApplicative f s b # (<*) :: ReflectedApplicative f s a -> ReflectedApplicative f s b -> ReflectedApplicative f s a # | |
Reifies s (ReifiedApplicative f) => Functor (ReflectedApplicative f s) Source # | |
Defined in Data.Reflection fmap :: (a -> b) -> ReflectedApplicative f s a -> ReflectedApplicative f s b # (<$) :: a -> ReflectedApplicative f s b -> ReflectedApplicative f s a # |
reifyApplicative :: (forall x. x -> f x) -> (forall x y. f (x -> y) -> f x -> f y) -> (forall (s :: *). Reifies s (ReifiedApplicative f) => t -> ReflectedApplicative f s a) -> t -> f a Source #
traverseBy :: Traversable t => (forall x. x -> f x) -> (forall x y. f (x -> y) -> f x -> f y) -> (a -> f b) -> t a -> f (t b) Source #
Traverse a container using its Traversable
instance using
explicitly provided Applicative
operations. This is like traverse
where the Applicative
instance can be manually specified.
sequenceBy :: Traversable t => (forall x. x -> f x) -> (forall x y. f (x -> y) -> f x -> f y) -> t (f a) -> f (t a) Source #
Sequence a container using its Traversable
instance using
explicitly provided Applicative
operations. This is like sequence
where the Applicative
instance can be manually specified.