PureScript supports type classes via the class and instance keywords.
Types appearing in class instances must be of the form String, Number, Boolean, or C t1 ... tn where C is a type constructor (including -> and t_i are types of the same form).
Here is an example of the Show typeclass, with instances for String, Boolean and Array:
class Show a where
show :: a -> String
instance showString :: Show String where
show s = s
instance showBoolean :: Show Boolean where
show true = "true"
show false = "false"
instance showArray :: (Show a) => Show (Array a) where
show xs = "[" <> joinWith ", " (map show xs) <> "]"
example = show [true, false]Overlapping instances are no longer allowed in PureScript. To write overlapping instances, you should use Instance Chains.
PureScript implements a form of instance chains that work on groups of instances matching by parameters. This means that constraints are not considered when choosing instances. However, you can still write a chain of instances in consecutive order that will be matched top to bottom by using the else keyword.
Here is an example of a MyShow typeclass, with instances for String, Boolean, and any other type.
class MyShow a where
myShow :: a -> String
instance showString :: MyShow String where
myShow s = s
else instance showBoolean :: MyShow Boolean where
myShow true = "true"
myShow false = "false"
else instance showA :: MyShow a where
myShow _ = "Invalid"
data MysteryItem = MysteryItem
main = do
log $ myShow "hello" -- hello
log $ myShow true -- true
log $ myShow MysteryItem -- InvalidTODO. For now, see the section in PureScript by Example.
Superclass implications can be indicated in a class declaration with a backwards fat arrow <=:
class (Monad m) <= MonadFail m where
fail :: forall a. String -> m aThis code example defines a MonadFail class with a Monad superclass: any type which defines an instance of MonadFail will be required to define an instance of Monad too.
Superclass instances will be used when searching for an instance of a subclass. For example, in the code below, the Applicative constraint introduced by the pure function can be discharged since Applicative is a superclass of Monad, which is in turn a superclass of MonadFail:
assert :: forall m. (MonadFail m) => Boolean -> m Unit
assert true = pure unit
assert false = fail "Assertion failed"Type class instances which are defined outside of both the module which defined the class and the module which defined the type are called orphan instances. Some programming languages (including Haskell) allow orphan instances with a warning, but in PureScript, they are forbidden. Any attempt to define an orphan instance in PureScript will mean that your program does not pass type checking.
For example, the Semigroup type class is defined in the module Data.Semigroup, and the Int type is defined in the module Prim. If we attempt to define a Semigroup Int instance like this:
module MyModule where
import Prelude
instance semigroupInt :: Semigroup Int where
append = (+)This will fail, because semigroupInt is an orphan instance. You can use a newtype to get around this:
module MyModule where
import Prelude
newtype AddInt = AddInt Int
instance semigroupAddInt :: Semigroup AddInt where
append (AddInt x) (AddInt y) = AddInt (x + y)In fact, a type similar to this AddInt is provided in Data.Monoid.Additive, in the monoid package.
Orphan instances are banned because they can lead to incompatible duplicated instances for the same type and class. For example, suppose two separate modules define an orphan Semigroup Int instance, and one of them uses + for append, whereas the other uses *. Now suppose someone writes a third module which imports both of the first two, and that somewhere in that third module we have the expression 2 <> 3, which calls for a Semigroup Int instance. The compiler now has two instances to choose from. What should it do? It could report an error, or it could arbitrarily pick one of the instances. Neither option is particularly appealing:
- If it chooses to report an error, it means that any pair of modules which define the same orphan instance can never be used together.
- If it arbitrarily picks one, we won't be able to determine whether
2 <> 3will evaluate to 5 or 6. This can make it very difficult to ensure that your program will behave correctly!
Banning orphan instances also ensures global uniqueness of instances. Without global uniqueness, you risk operating on data with incompatible instances in different sections of code. For example, in Ord-based maps and sets, if it were possible to insert some values into a map using one Ord instance, and then try to retrieve them using a different Ord instance, you'd have keys disappear from your map. Another example is if you had a type class which defined serialization and deserialization operations, you'd be able to serialize something with one instance and then try to deserialize it with a different incompatible instance.
For multi-parameter type classes, the orphan instance check requires that the instance is either in the same module as the class, or the same module as at least one of the types occurring in the instance. (TODO: example)
Instances for type classes with multiple parameters generally only need a subset of the parameters to be concrete to match instances. Declarations on which parameters can determine others in instance heads are called Functional Dependencies. For example:
class TypeEquals a b | a -> b, b -> a where
to :: a -> b
from :: b -> a
instance refl :: TypeEquals a a where
to a = a
from a = aThe | symbol marks the beginning of functional dependencies, which are separated by a comma if there are more than one. In this case, the first parameter determines the type of the second, and the second determines the type of the first.
Functional dependencies are especially useful with the various Prim typeclasses, such as Prim.Row.Cons: https://pursuit.purescript.org/builtins/docs/Prim.Row#t:Cons
See also the section in PureScript by Example.
The compiler can derive type class instances to spare you the tedium of writing boilerplate. There are a few ways to do this depending on the specific type and class being derived.
Some classes have special built-in compiler support, and their instances can be derived from all types.
For example, if you you'd like to be able to remove duplicates from an array of an ADT using nub, you need an Eq and Ord instance. Rather than writing these manually, let the compiler do the work.
import Data.Array (nub)
data MyADT
= Some
| Arbitrary Int
| Contents Number String
derive instance eqMyADT :: Eq MyADT
derive instance ordMyADT :: Ord MyADT
nub [Some, Arbitrary 1, Some, Some] == [Some, Arbitrary 1]Currently, instances for the following classes can be derived by the compiler:
- Data.Generic.Rep (class Generic)
- Data.Eq (class Eq)
- Data.Ord (class Ord)
- Data.Functor (class Functor)
- Data.Newtype (class Newtype)
If you would like your newtype to defer to the instance that the underlying type uses for a given class, then you can use newtype deriving via the derive newtype keywords.
For example, let's say you want to add two Score values using the Semiring instance of the wrapped Int.
newtype Score = Score Int
derive newtype instance semiringScore :: Semiring Score
tenPoints :: Score
tenPoints = (Score 4) + (Score 6)That derive line replaced all this code:
-- No need to write this
instance semiringScore :: Semiring Score where
zero = Score 0
add (Score a) (Score b) = Score (a + b)
mul (Score a) (Score b) = Score (a * b)
one = Score 1Note that we can use either of these options to derive an Eq instance for a newtype, since Eq has built-in compiler support. They are equivalent in this case.
derive instance eqScore :: Eq Score
derive newtype instance eqScore :: Eq ScoreThe compiler's built-in support for Generic unlocks convenient deriving for many other classes not listed above. See the deriving guide for more information.
Some type classes can be automatically solved by the PureScript Compiler without requiring you place a PureScript statement, like derive instance, in your source code.
foo :: forall t. (Warn "Custom warning message") => t -> t
foo x = xAutomatically solved type classes are included in the Prim modules:
Symbol-related classes
Other classes