Copyright | (C) 2012-13 Edward Kmett |
---|---|

License | BSD-style (see the file LICENSE) |

Maintainer | Edward Kmett <ekmett@gmail.com> |

Stability | experimental |

Portability | non-portable |

Safe Haskell | None |

Language | Haskell2010 |

This module provides a `Zipper`

with fairly strong type checking guarantees.

The code here is inspired by Brandon Simmons' `zippo`

package, but uses
a different approach to represent the `Zipper`

that makes the whole thing
look like his breadcrumb trail, and can move side-to-side through
traversals.

Some examples types:

`Top`

`:>>`

a- represents a trivial
`Zipper`

with its focus at the root. `Top`

`:>>`

`Tree`

a`:>>`

a- represents a
`Zipper`

that starts with a`Tree`

and descends in a single step to values of type`a`

. `Top`

`:>>`

`Tree`

a`:>>`

`Tree`

a`:>>`

`Tree`

a- represents a
`Zipper`

into a`Tree`

with an intermediate bookmarked`Tree`

, focusing in yet another`Tree`

.

Since individual levels of a `Zipper`

are managed by an arbitrary
`IndexedTraversal`

, you can move left and right through
the `IndexedTraversal`

selecting neighboring elements.

`>>>`

("Jelly","world")`zipper ("hello","world") & downward _1 & fromWithin traverse & focus .~ 'J' & rightmost & focus .~ 'y' & rezip`

This is particularly powerful when compiled with `plate`

,
`uniplate`

or `biplate`

for walking down into
self-similar children in syntax trees and other structures.

Given keys in ascending order you can jump directly to a given key with
`moveTo`

. When used with traversals for balanced
tree-like structures such as an `IntMap`

or `Map`

,
searching for a key with `moveTo`

can be done in logarithmic time.

- data Top
- type family h :> p
- type (:>>) h a = Zipper h Int a
- data a :@ i
- data Zipper h i a
- zipper :: a -> Top :>> a
- focus :: IndexedLens' i (Zipper h i a) a
- focusedContext :: (Indexable i p, Zipping h a) => (h :> (a :@ i)) -> Pretext p a a (Zipped h a)
- upward :: Ord j => ((h :> (s :@ j)) :> (a :@ i)) -> h :> (s :@ j)
- downward :: forall j h s a. ALens' s a -> (h :> (s :@ j)) -> (h :> (s :@ j)) :>> a
- idownward :: forall i j h s a. Ord i => AnIndexedLens' i s a -> (h :> (s :@ j)) -> (h :> (s :@ j)) :> (a :@ i)
- within :: MonadPlus m => LensLike' (Indexing (Bazaar' (Indexed Int) a)) s a -> (h :> (s :@ j)) -> m ((h :> (s :@ j)) :>> a)
- iwithin :: (MonadPlus m, Ord i) => AnIndexedTraversal' i s a -> (h :> (s :@ j)) -> m ((h :> (s :@ j)) :> (a :@ i))
- withins :: MonadPlus m => LensLike' (Indexing (Bazaar' (Indexed Int) a)) s a -> (h :> (s :@ j)) -> m ((h :> (s :@ j)) :>> a)
- iwithins :: (MonadPlus m, Ord i) => AnIndexedTraversal' i s a -> (h :> (s :@ j)) -> m ((h :> (s :@ j)) :> (a :@ i))
- leftward :: MonadPlus m => (h :> (a :@ i)) -> m (h :> (a :@ i))
- rightward :: MonadPlus m => (h :> (a :@ i)) -> m (h :> (a :@ i))
- leftmost :: (a :> (b :@ i)) -> a :> (b :@ i)
- rightmost :: (a :> (b :@ i)) -> a :> (b :@ i)
- tug :: (a -> Maybe a) -> a -> a
- tugs :: (a -> Maybe a) -> Int -> a -> a
- jerks :: Monad m => (a -> m a) -> Int -> a -> m a
- farthest :: (a -> Maybe a) -> a -> a
- tooth :: Zipper h i a -> Int
- teeth :: (h :> (a :@ i)) -> Int
- jerkTo :: MonadPlus m => Int -> (h :> (a :@ i)) -> m (h :> (a :@ i))
- tugTo :: Int -> (h :> (a :@ i)) -> h :> (a :@ i)
- moveTo :: MonadPlus m => i -> (h :> (a :@ i)) -> m (h :> (a :@ i))
- moveToward :: i -> (h :> (a :@ i)) -> h :> (a :@ i)
- rezip :: Zipping h a => (h :> (a :@ i)) -> Zipped h a
- type family Zipped h a
- class Zipping h a
- data Tape h i a
- saveTape :: Zipper h i a -> Tape h i a
- restoreTape :: MonadPlus m => Tape h i a -> Zipped h a -> m (Zipper h i a)
- restoreNearTape :: MonadPlus m => Tape h i a -> Zipped h a -> m (Zipper h i a)
- fromWithin :: LensLike' (Indexing (Bazaar' (Indexed Int) a)) s a -> (h :> (s :@ j)) -> (h :> (s :@ j)) :>> a
- ifromWithin :: Ord i => AnIndexedTraversal' i s a -> (h :> (s :@ j)) -> (h :> (s :@ j)) :> (a :@ i)
- unsafelyRestoreTape :: Tape h i a -> Zipped h a -> Zipper h i a

# Zippers

type (:>>) h a = Zipper h Int a infixl 8 Source #

Many zippers are indexed by Int keys. This type alias is convenient for reducing syntactic noise for talking about these boring indices.

This is the type of a `Zipper`

. It visually resembles a "breadcrumb trail" as
used in website navigation. Each breadcrumb in the trail represents a level you
can move up to.

This type operator associates to the left, so you can use a type like

`Top`

`:>>`

(`String`

,`Double`

)`:>>`

`String`

`:>>`

`Char`

to represent a `Zipper`

from `(`

down to `String`

,`Double`

)`Char`

that has an intermediate
crumb for the `String`

containing the `Char`

.

You can construct a `Zipper`

into *any* data structure with `zipper`

.

You can repackage up the contents of a `Zipper`

with `rezip`

.

`>>>`

42`rezip $ zipper 42`

The combinators in this module provide lot of things you can do to the
`Zipper`

while you have it open.

Note that a value of type `h `

doesn't actually contain a value
of type `:>`

s `:>`

a`h `

-- as we descend into a level, the previous level is
unpacked and stored in `:>`

s`Coil`

form. Only one value of type `_ `

exists
at any particular time for any particular `:>`

_`Zipper`

.

## Focusing

focusedContext :: (Indexable i p, Zipping h a) => (h :> (a :@ i)) -> Pretext p a a (Zipped h a) Source #

## Vertical Movement

idownward :: forall i j h s a. Ord i => AnIndexedLens' i s a -> (h :> (s :@ j)) -> (h :> (s :@ j)) :> (a :@ i) Source #

Step down into a `IndexedLens`

. This is a constrained form of `ifromWithin`

for when you know
there is precisely one target that can never fail.

`idownward`

::`IndexedLens'`

i s a -> (h`:>`

s:@j) -> h`:>`

s:@j`:>`

a:@i

within :: MonadPlus m => LensLike' (Indexing (Bazaar' (Indexed Int) a)) s a -> (h :> (s :@ j)) -> m ((h :> (s :@ j)) :>> a) Source #

Step down into the `leftmost`

entry of a `Traversal`

.

`within`

::`Traversal'`

s a -> (h`:>`

s:@j) ->`Maybe`

(h`:>`

s:@j`:>>`

a)`within`

::`Prism'`

s a -> (h`:>`

s:@j) ->`Maybe`

(h`:>`

s:@j`:>>`

a)`within`

::`Lens'`

s a -> (h`:>`

s:@j) ->`Maybe`

(h`:>`

s:@j`:>>`

a)`within`

::`Iso'`

s a -> (h`:>`

s:@j) ->`Maybe`

(h`:>`

s:@j`:>>`

a)

`within`

::`MonadPlus`

m =>`ATraversal'`

s a -> (h`:>`

s:@j) -> m (h`:>`

s:@j`:>>`

a)

iwithin :: (MonadPlus m, Ord i) => AnIndexedTraversal' i s a -> (h :> (s :@ j)) -> m ((h :> (s :@ j)) :> (a :@ i)) Source #

Step down into the `leftmost`

entry of an `IndexedTraversal`

.

*Note:* The index is assumed to be ordered and must increase monotonically or else you cannot (safely) `moveTo`

or `moveToward`

or use tapes.

`iwithin`

::`IndexedTraversal'`

i s a -> (h`:>`

s:@j) ->`Maybe`

(h`:>`

s:@j`:>`

a:@i)`iwithin`

::`IndexedLens'`

i s a -> (h`:>`

s:@j) ->`Maybe`

(h`:>`

s:@j`:>`

a:@i)

`iwithin`

::`MonadPlus`

m =>`ATraversal'`

s a -> (h`:>`

s:@j) -> m (h`:>`

s:@j`:>>`

a)

withins :: MonadPlus m => LensLike' (Indexing (Bazaar' (Indexed Int) a)) s a -> (h :> (s :@ j)) -> m ((h :> (s :@ j)) :>> a) Source #

Step down into every entry of a `Traversal`

simultaneously.

`>>>`

[("hEllo","world"),("heLlo","world"),("helLo","world"),("hellO","world")]`zipper ("hello","world") & withins both >>= leftward >>= withins traverse >>= rightward <&> focus %~ toUpper <&> rezip :: [(String,String)]`

`withins`

::`Traversal'`

s a -> (h`:>`

s:@j) -> [h`:>`

s:@j`:>>`

a]`withins`

::`Lens'`

s a -> (h`:>`

s:@j) -> [h`:>`

s:@j`:>>`

a]`withins`

::`Iso'`

s a -> (h`:>`

s:@j) -> [h`:>`

s:@j`:>>`

a]

iwithins :: (MonadPlus m, Ord i) => AnIndexedTraversal' i s a -> (h :> (s :@ j)) -> m ((h :> (s :@ j)) :> (a :@ i)) Source #

Step down into every entry of an `IndexedTraversal`

simultaneously.

*Note:* The index is assumed to be ordered and must increase monotonically or else you cannot (safely) `moveTo`

or `moveToward`

or use tapes.

`iwithins`

::`IndexedTraversal'`

i s a -> (h`:>`

s:@j) -> [h`:>`

s:@j`:>`

a:@i]`iwithins`

::`IndexedLens'`

i s a -> (h`:>`

s:@j) -> [h`:>`

s:@j`:>`

a:@i]

## Lateral Movement

rightward :: MonadPlus m => (h :> (a :@ i)) -> m (h :> (a :@ i)) Source #

Jerk the `Zipper`

one `tooth`

to the `rightward`

within the current `Lens`

or `Traversal`

.

Attempts to move past the start of the current `Traversal`

(or trivially, the current `Lens`

)
will return `mzero`

.

`>>>`

True`isNothing $ zipper "hello" & rightward`

`>>>`

'e'`zipper "hello" & fromWithin traverse & rightward <&> view focus`

`>>>`

"hullo"`zipper "hello" & fromWithin traverse & rightward <&> focus .~ 'u' <&> rezip`

`>>>`

(1,3)`rezip $ zipper (1,2) & fromWithin both & tug rightward & focus .~ 3`

## Movement Combinators

tug :: (a -> Maybe a) -> a -> a Source #

This allows you to safely `tug`

`leftward`

or `tug`

`rightward`

on a
`Zipper`

. This will attempt the move, and stay where it was if it fails.

The more general signature allows its use in other circumstances, however.

`tug`

f x ≡`fromMaybe`

a (f a)

`>>>`

"jello"`fmap rezip $ zipper "hello" & within traverse <&> tug leftward <&> focus .~ 'j'`

`>>>`

"hullo"`fmap rezip $ zipper "hello" & within traverse <&> tug rightward <&> focus .~ 'u'`

tugs :: (a -> Maybe a) -> Int -> a -> a Source #

This allows you to safely

or `tug`

`leftward`

multiple times on a `tug`

`rightward`

`Zipper`

, moving multiple steps in a given direction
and stopping at the last place you couldn't move from. This lets you safely
move a `Zipper`

, because it will stop at either end.

`>>>`

"style"`fmap rezip $ zipper "stale" & within traverse <&> tugs rightward 2 <&> focus .~ 'y'`

`>>>`

"cart"`rezip $ zipper "want" & fromWithin traverse & tugs rightward 2 & focus .~ 'r' & tugs leftward 100 & focus .~ 'c'`

jerks :: Monad m => (a -> m a) -> Int -> a -> m a Source #

This allows for you to repeatedly pull a `Zipper`

in a given direction, failing if it falls off the end.

`>>>`

True`isNothing $ zipper "hello" & within traverse >>= jerks rightward 10`

`>>>`

"silky"`fmap rezip $ zipper "silly" & within traverse >>= jerks rightward 3 <&> focus .~ 'k'`

farthest :: (a -> Maybe a) -> a -> a Source #

Move in a direction as far as you can go, then stop there.

This repeatedly applies a function until it returns `Nothing`

, and then returns the last answer.

`>>>`

("hella","world")`fmap rezip $ zipper ("hello","world") & downward _1 & within traverse <&> rightmost <&> focus .~ 'a'`

`>>>`

("hello","therm")`rezip $ zipper ("hello","there") & fromWithin (both.traverse) & rightmost & focus .~ 'm'`

## Absolute Positioning

tooth :: Zipper h i a -> Int Source #

Return the index into the current `Traversal`

within the current level of the `Zipper`

.

`jerkTo`

(`tooth`

l) l =`Just`

Mnemonically, zippers have a number of `teeth`

within each level. This is which `tooth`

you are currently at.

This is based on ordinal position regardless of the underlying index type. It may be excessively expensive for a list.

`focalPoint`

may be much cheaper if you have a `Traversal`

indexed by ordinal position!

teeth :: (h :> (a :@ i)) -> Int Source #

Returns the number of siblings at the current level in the `Zipper`

.

`teeth`

z`>=`

1

*NB:* If the current `Traversal`

targets an infinite number of elements then this may not terminate.

This is also a particularly expensive operation to perform on an unbalanced tree.

`>>>`

1`zipper ("hello","world") & teeth`

`>>>`

2`zipper ("hello","world") & fromWithin both & teeth`

`>>>`

1`zipper ("hello","world") & downward _1 & teeth`

`>>>`

5`zipper ("hello","world") & downward _1 & fromWithin traverse & teeth`

`>>>`

5`zipper ("hello","world") & fromWithin (_1.traverse) & teeth`

`>>>`

10`zipper ("hello","world") & fromWithin (both.traverse) & teeth`

jerkTo :: MonadPlus m => Int -> (h :> (a :@ i)) -> m (h :> (a :@ i)) Source #

Move the `Zipper`

horizontally to the element in the `n`

th position in the
current level, absolutely indexed, starting with the `farthest`

`leftward`

as `0`

.

This returns `mzero`

if the target element doesn't exist.

`jerkTo`

n ≡`jerks`

`rightward`

n`.`

`farthest`

`leftward`

`>>>`

True`isNothing $ zipper "not working." & jerkTo 20`

tugTo :: Int -> (h :> (a :@ i)) -> h :> (a :@ i) Source #

Move the `Zipper`

horizontally to the element in the `n`

th position of the
current level, absolutely indexed, starting with the `farthest`

`leftward`

as `0`

.

If the element at that position doesn't exist, then this will clamp to the range `0 `

.`<=`

n `<`

`teeth`

`tugTo`

n ≡`tugs`

`rightward`

n`.`

`farthest`

`leftward`

`>>>`

"nut working!"`rezip $ zipper "not working." & fromWithin traverse & tugTo 100 & focus .~ '!' & tugTo 1 & focus .~ 'u'`

moveToward :: i -> (h :> (a :@ i)) -> h :> (a :@ i) Source #

Move towards a particular index in the current `Traversal`

.

## Closing the zipper

rezip :: Zipping h a => (h :> (a :@ i)) -> Zipped h a Source #

Close something back up that you opened as a `Zipper`

.

## Recording

saveTape :: Zipper h i a -> Tape h i a Source #

Save the current path as as a `Tape`

we can play back later.

restoreTape :: MonadPlus m => Tape h i a -> Zipped h a -> m (Zipper h i a) Source #

Restore ourselves to a previously recorded position precisely.

If the position does not exist, then fail.

## Unsafe Movement

fromWithin :: LensLike' (Indexing (Bazaar' (Indexed Int) a)) s a -> (h :> (s :@ j)) -> (h :> (s :@ j)) :>> a Source #

Unsafely step down into a `Traversal`

that is *assumed* to be non-empty.

If this invariant is not met then this will usually result in an error!

`fromWithin`

::`Traversal'`

s a -> (h`:>`

s:@j) -> h`:>`

s:@j`:>>`

a`fromWithin`

::`Lens'`

s a -> (h`:>`

s:@j) -> h`:>`

s:@j`:>>`

a`fromWithin`

::`Iso'`

s a -> (h`:>`

s:@j) -> h`:>`

s:@j`:>>`

a

You can reason about this function as if the definition was:

`fromWithin`

l ≡`fromJust`

`.`

`within`

l

ifromWithin :: Ord i => AnIndexedTraversal' i s a -> (h :> (s :@ j)) -> (h :> (s :@ j)) :> (a :@ i) Source #

Unsafey step down into an `IndexedTraversal`

that is *assumed* to be non-empty

If this invariant is not met then this will usually result in an error!

`ifromWithin`

::`IndexedTraversal'`

i s a -> (h`:>`

s:@j) -> h`:>`

s:@j`:>`

a:@i`ifromWithin`

::`IndexedLens'`

i s a -> (h`:>`

s:@j) -> h`:>`

s:@j`:>`

a:@i

You can reason about this function as if the definition was:

`fromWithin`

l ≡`fromJust`

`.`

`within`

l

unsafelyRestoreTape :: Tape h i a -> Zipped h a -> Zipper h i a Source #

Restore ourselves to a previously recorded position.

This *assumes* that nothing has been done in the meantime to affect the existence of anything on the entire path.

Motions `leftward`

or `rightward`

are clamped, but all traversals included on the `Tape`

are assumed to be non-empty.

Violate these assumptions at your own risk!