uniplate-1.3: Help writing simple, consise and fast generic operations.

Data.Generics.Uniplate

Description

This is the main Uniplate module, which defines all the essential operations in a Haskell 98 compatible manner.

Most functions have an example of a possible use for the function. To illustate, I have used the Expr type as below:

data Expr = Val Int
| Neg Expr

Synopsis

# The Class

type UniplateType on = on -> ([on], [on] -> on)Source

The type of replacing all the children of a node

Taking a value, the function should return all the immediate children of the same type, and a function to replace them.

class Uniplate on whereSource

The standard Uniplate class, all operations require this

Methods

The underlying method in the class

uniplate (Add (Val 1) (Neg (Val 2))) = ([Val 1, Neg (Val 2)], \[a,b] -> Add a b)
uniplate (Val 1)                     = ([]                  , \[]    -> Val 1  )

# The Operations

## Queries

universe :: Uniplate on => on -> [on]Source

Get all the children of a node, including itself and all children.

universe (Add (Val 1) (Neg (Val 2))) =
[Add (Val 1) (Neg (Val 2)), Val 1, Neg (Val 2), Val 2]

This method is often combined with a list comprehension, for example:

vals x = [i | Val i <- universe x]

children :: Uniplate on => on -> [on]Source

Get the direct children of a node. Usually using universe is more appropriate.

children = fst . uniplate

## Transformations

transform :: Uniplate on => (on -> on) -> on -> onSource

Transform every element in the tree, in a bottom-up manner.

For example, replacing negative literals with literals:

negLits = transform f
where f (Neg (Lit i)) = Lit (negate i)
f x = x

transformM :: (Monad m, Uniplate on) => (on -> m on) -> on -> m onSource

rewrite :: Uniplate on => (on -> Maybe on) -> on -> onSource

Rewrite by applying a rule everywhere you can. Ensures that the rule cannot be applied anywhere in the result:

propRewrite r x = all (isNothing . r) (universe (rewrite r x))

Usually transform is more appropriate, but rewrite can give better compositionality. Given two single transformations f and g, you can construct f mplus g which performs both rewrites until a fixed point.

rewriteM :: (Monad m, Uniplate on) => (on -> m (Maybe on)) -> on -> m onSource

descend :: Uniplate on => (on -> on) -> on -> onSource

Perform a transformation on all the immediate children, then combine them back. This operation allows additional information to be passed downwards, and can be used to provide a top-down transformation.

descendM :: (Monad m, Uniplate on) => (on -> m on) -> on -> m onSource

## Others

contexts :: Uniplate on => on -> [(on, on -> on)]Source

Return all the contexts and holes.

propUniverse x = universe x == map fst (contexts x)
propId x = all (== x) [b a | (a,b) <- contexts x]

holes :: Uniplate on => on -> [(on, on -> on)]Source

The one depth version of contexts

propChildren x = children x == map fst (holes x)
propId x = all (== x) [b a | (a,b) <- holes x]

para :: Uniplate on => (on -> [r] -> r) -> on -> rSource

Perform a fold-like computation on each value, technically a paramorphism