data-ordlist-0.4.4: Set and bag operations on ordered lists

Portabilityportable
Stabilityexperimental
Maintainerleon@melding-monads.com

Data.List.Ordered

Contents

Description

This module implements bag and set operations on ordered lists. Except for variations of the sort and isSorted functions, every function assumes that any list arguments are sorted lists. Assuming this precondition is met, every resulting list is also sorted.

Note that these functions handle multisets, and are left-biased. Thus, even assuming the arguments are sorted, isect does not always return the same results as Data.List.intersection, due to multiplicity.

Synopsis

Predicates

member :: Ord a => a -> [a] -> BoolSource

The member function returns True if the element appears in the ordered list.

memberBy :: (a -> a -> Ordering) -> a -> [a] -> BoolSource

The memberBy function is the non-overloaded version of member.

has :: Ord a => [a] -> a -> BoolSource

The has function returns True if the element appears in the list; it is equivalent to member except the order of the arguments is reversed, making it a function from an ordered list to its characteristic function.

hasBy :: (a -> a -> Ordering) -> [a] -> a -> BoolSource

The hasBy function is the non-overloaded version of has.

subset :: Ord a => [a] -> [a] -> BoolSource

The subset function returns true if the first list is a sub-list of the second.

subsetBy :: (a -> a -> Ordering) -> [a] -> [a] -> BoolSource

The subsetBy function is the non-overloaded version of subset.

isSorted :: Ord a => [a] -> BoolSource

The isSorted predicate returns True if the elements of a list occur in non-descending order, equivalent to isSortedBy (<=).

isSortedBy :: (a -> a -> Bool) -> [a] -> BoolSource

The isSortedBy function returns True iff the predicate returns true for all adjacent pairs of elements in the list.

Insertion Functions

insertBag :: Ord a => a -> [a] -> [a]Source

The insertBag function inserts an element into a list. If the element is already there, then another copy of the element is inserted.

insertBagBy :: (a -> a -> Ordering) -> a -> [a] -> [a]Source

The insertBagBy function is the non-overloaded version of insertBag.

insertSet :: Ord a => a -> [a] -> [a]Source

The insertSet function inserts an element into an ordered list. If the element is already there, then the element replaces the existing element.

insertSetBy :: (a -> a -> Ordering) -> a -> [a] -> [a]Source

The insertSetBy function is the non-overloaded version of insertSet.

Set-like operations

isect :: Ord a => [a] -> [a] -> [a]Source

The isect function computes the intersection of two ordered lists. An element occurs in the output as many times as the minimum number of occurrences in either input. If either input is a set, then the output is a set.

 isect [ 1,2, 3,4 ] [ 3,4, 5,6 ]   == [ 3,4 ]
 isect [ 1, 2,2,2 ] [ 1,1,1, 2,2 ] == [ 1, 2,2 ]

isectBy :: (a -> a -> Ordering) -> [a] -> [a] -> [a]Source

The isectBy function is the non-overloaded version of isect.

union :: Ord a => [a] -> [a] -> [a]Source

The union function computes the union of two ordered lists. An element occurs in the output as many times as the maximum number of occurrences in either input. If both inputs are sets, then the output is a set.

 union [ 1,2, 3,4 ] [ 3,4, 5,6 ]   == [ 1,2, 3,4, 5,6 ]
 union [ 1, 2,2,2 ] [ 1,1,1, 2,2 ] == [ 1,1,1, 2,2,2 ]

unionBy :: (a -> a -> Ordering) -> [a] -> [a] -> [a]Source

The unionBy function is the non-overloaded version of union.

minus :: Ord a => [a] -> [a] -> [a]Source

The minus function computes the difference of two ordered lists. An element occurs in the output as many times as it occurs in the first input, minus the number of occurrences in the second input. If the first input is a set, then the output is a set.

 minus [ 1,2, 3,4 ] [ 3,4, 5,6 ]   == [ 1,2 ]
 minus [ 1, 2,2,2 ] [ 1,1,1, 2,2 ] == [ 2 ]

minusBy :: (a -> a -> Ordering) -> [a] -> [a] -> [a]Source

The minusBy function is the non-overloaded version of minus.

xunion :: Ord a => [a] -> [a] -> [a]Source

The xunion function computes the exclusive union of two ordered lists. An element occurs in the output as many times as the absolute difference between the number of occurrences in the inputs. If both inputs are sets, then the output is a set.

 xunion [ 1,2, 3,4 ] [ 3,4, 5,6 ]   == [ 1,2, 5,6 ]
 xunion [ 1, 2,2,2 ] [ 1,1,1, 2,2 ] == [ 1,1, 2 ]

xunionBy :: (a -> a -> Ordering) -> [a] -> [a] -> [a]Source

The xunionBy function is the non-overloaded version of xunion.

merge :: Ord a => [a] -> [a] -> [a]Source

The merge function combines all elements of two ordered lists. An element occurs in the output as many times as the sum of the occurrences in the lists.

 merge [ 1,2, 3,4 ] [ 3,4, 5,6 ]   == [ 1,2,  3,3,4,4,  5,6 ]
 merge [ 1, 2,2,2 ] [ 1,1,1, 2,2 ] == [ 1,1,1,1,  2,2,2,2,2 ]

mergeBy :: (a -> a -> Ordering) -> [a] -> [a] -> [a]Source

The mergeBy function is the non-overloaded version of merge.

mergeAll :: Ord a => [[a]] -> [a]Source

The mergeAll function merges a (potentially) infinite number of ordered lists, under the assumption that the heads of the inner lists are sorted. An element is duplicated in the result as many times as the total number of occurrences in all inner lists.

The mergeAll function is closely related to foldr merge []. The former does not assume that the outer list is finite, whereas the latter makes no assumption about the heads of the inner lists. When both sets of assumptions are met, these two functions are equivalent.

This implementation of mergeAll uses a tree of comparisons, and is based on input from Dave Bayer, Heinrich Apfelmus, Omar Antolin Camarena, and Will Ness.

mergeAllBy :: (a -> a -> Ordering) -> [[a]] -> [a]Source

The mergeAllBy function is the non-overloaded variant of the mergeAll function.

unionAll :: Ord a => [[a]] -> [a]Source

The unionAll computes the union of a (potentially) infinite number of lists, under the assumption that the heads of the inner lists are sorted. The result will duplicate an element as many times as the maximum number of occurrences in any single list. Thus, the result is a set if and only if every inner list is a set.

Analogous to mergeAll, unionAll is closely related to foldr union []; The outer does not assume that the outer list is finite, whereas the right fold does not assume anything about the heads of the inner lists. When both sets of assumptions are met, the functions are equivalent.

This implementation is also based on implicit heaps, providing a tree of comparisons.

unionAllBy :: (a -> a -> Ordering) -> [[a]] -> [a]Source

The unionAllBy function is the non-overloaded variant of the unionAll function.

Lists to Ordered Lists

nub :: Ord a => [a] -> [a]Source

On ordered lists, nub is equivalent to Data.List.nub, except that it runs in linear time instead of quadratic. On unordered lists it also removes elements that are smaller than any preceding element.

 nub [1,1,1,2,2] == [1,2]
 nub [2,0,1,3,3] == [2,3]
 nub = nubBy (<)

nubBy :: (a -> a -> Bool) -> [a] -> [a]Source

The nubBy function is the greedy algorithm that returns a sublist of its input such that:

 isSortedBy pred (nubBy pred xs) == True

This is true for all lists, not just ordered lists, and all binary predicates, not just total orders. On infinite lists, this statement is true in a certain mathematical sense, but not a computational one.

sort :: Ord a => [a] -> [a]

The sort function implements a stable sorting algorithm. It is a special case of sortBy, which allows the programmer to supply their own comparison function.

sortBy :: (a -> a -> Ordering) -> [a] -> [a]

The sortBy function is the non-overloaded version of sort.

sortOn :: Ord b => (a -> b) -> [a] -> [a]Source

The sortOn function provides the decorate-sort-undecorate idiom, also known as the "Schwartzian transform".

sortOn' :: Ord b => (a -> b) -> [a] -> [a]Source

This variant of sortOn recomputes the sorting key every comparison. This can be better for functions that are cheap to compute. This is definitely better for projections, as the decorate-sort-undecorate saves nothing and adds two traversals of the list and extra memory allocation.

nubSort :: Ord a => [a] -> [a]Source

The nubSort function is equivalent to nub . sort, except somewhat more efficient as duplicates are removed as it sorts. It is essentially Data.List.sort, with merge replaced by union.

nubSortBy :: (a -> a -> Ordering) -> [a] -> [a]Source

The nubSortBy function is the non-overloaded version of nubSort.

nubSortOn :: Ord b => (a -> b) -> [a] -> [a]Source

The nubSortOn function provides decorate-sort-undecorate for nubSort.

nubSortOn' :: Ord b => (a -> b) -> [a] -> [a]Source

This variant of nubSortOn recomputes the sorting key for each comparison.