{-# LANGUAGE Safe #-} ---------------------------------------------------------------------------- -- | -- Module : Algebra.PartialOrd -- Copyright : (C) 2010-2015 Maximilian Bolingbroke, 2015-2019 Oleg Grenrus -- License : BSD-3-Clause (see the file LICENSE) -- -- Maintainer : Oleg Grenrus <oleg.grenrus@iki.fi> -- ---------------------------------------------------------------------------- module Algebra.PartialOrd ( -- * Partial orderings PartialOrd(..), partialOrdEq, -- * Fixed points of chains in partial orders lfpFrom, unsafeLfpFrom, gfpFrom, unsafeGfpFrom ) where import Data.Foldable (Foldable (..)) import Data.Hashable (Hashable (..)) import qualified Data.HashMap.Lazy as HM import qualified Data.HashSet as HS import qualified Data.IntMap as IM import qualified Data.IntSet as IS import qualified Data.List.Compat as L import qualified Data.Map as Map import Data.Monoid (All (..), Any (..)) import qualified Data.Set as Set import Data.Void (Void) -- | A partial ordering on sets -- (<http://en.wikipedia.org/wiki/Partially_ordered_set>) is a set equipped -- with a binary relation, `leq`, that obeys the following laws -- -- @ -- Reflexive: a ``leq`` a -- Antisymmetric: a ``leq`` b && b ``leq`` a ==> a == b -- Transitive: a ``leq`` b && b ``leq`` c ==> a ``leq`` c -- @ -- -- Two elements of the set are said to be `comparable` when they are are -- ordered with respect to the `leq` relation. So -- -- @ -- `comparable` a b ==> a ``leq`` b || b ``leq`` a -- @ -- -- If `comparable` always returns true then the relation `leq` defines a -- total ordering (and an `Ord` instance may be defined). Any `Ord` instance is -- trivially an instance of `PartialOrd`. 'Algebra.Lattice.Ordered' provides a -- convenient wrapper to satisfy 'PartialOrd' given 'Ord'. -- -- As an example consider the partial ordering on sets induced by set -- inclusion. Then for sets `a` and `b`, -- -- @ -- a ``leq`` b -- @ -- -- is true when `a` is a subset of `b`. Two sets are `comparable` if one is a -- subset of the other. Concretely -- -- @ -- a = {1, 2, 3} -- b = {1, 3, 4} -- c = {1, 2} -- -- a ``leq`` a = `True` -- a ``leq`` b = `False` -- a ``leq`` c = `False` -- b ``leq`` a = `False` -- b ``leq`` b = `True` -- b ``leq`` c = `False` -- c ``leq`` a = `True` -- c ``leq`` b = `False` -- c ``leq`` c = `True` -- -- `comparable` a b = `False` -- `comparable` a c = `True` -- `comparable` b c = `False` -- @ class Eq a => PartialOrd a where -- | The relation that induces the partial ordering leq :: a -> a -> Bool -- | Whether two elements are ordered with respect to the relation. A -- default implementation is given by -- -- @ -- 'comparable' x y = 'leq' x y '||' 'leq' y x -- @ comparable :: a -> a -> Bool comparable x y = leq x y || leq y x -- | The equality relation induced by the partial-order structure. It satisfies -- the laws of an equivalence relation: -- @ -- Reflexive: a == a -- Symmetric: a == b ==> b == a -- Transitive: a == b && b == c ==> a == c -- @ partialOrdEq :: PartialOrd a => a -> a -> Bool partialOrdEq x y = leq x y && leq y x instance PartialOrd () where leq _ _ = True -- | @since 2 instance PartialOrd Bool where leq = (<=) instance PartialOrd Any where leq = (<=) instance PartialOrd All where leq = (<=) instance PartialOrd Void where leq _ _ = True -- | @'leq' = 'Data.List.isSequenceOf'@. instance Eq a => PartialOrd [a] where leq = L.isSubsequenceOf instance Ord a => PartialOrd (Set.Set a) where leq = Set.isSubsetOf instance PartialOrd IS.IntSet where leq = IS.isSubsetOf instance (Eq k, Hashable k) => PartialOrd (HS.HashSet k) where leq a b = HS.null (HS.difference a b) instance (Ord k, PartialOrd v) => PartialOrd (Map.Map k v) where leq = Map.isSubmapOfBy leq instance PartialOrd v => PartialOrd (IM.IntMap v) where leq = IM.isSubmapOfBy leq instance (Eq k, Hashable k, PartialOrd v) => PartialOrd (HM.HashMap k v) where x `leq` y = {- wish: HM.isSubmapOfBy leq -} HM.null (HM.difference x y) && getAll (fold $ HM.intersectionWith (\vx vy -> All (vx `leq` vy)) x y) instance (PartialOrd a, PartialOrd b) => PartialOrd (a, b) where -- NB: *not* a lexical ordering. This is because for some component partial orders, lexical -- ordering is incompatible with the transitivity axiom we require for the derived partial order (x1, y1) `leq` (x2, y2) = x1 `leq` x2 && y1 `leq` y2 comparable (x1, y1) (x2, y2) = comparable x1 x2 && comparable y1 y2 -- | @since 2.0.1 instance (PartialOrd a, PartialOrd b) => PartialOrd (Either a b) where Left x `leq` Left y = leq x y Right x `leq` Right y = leq x y leq _ _ = False comparable (Left x) (Left y) = comparable x y comparable (Right x) (Right y) = comparable x y comparable _ _ = False -- | Least point of a partially ordered monotone function. Checks that the function is monotone. lfpFrom :: PartialOrd a => a -> (a -> a) -> a lfpFrom = lfpFrom' leq -- | Least point of a partially ordered monotone function. Does not checks that the function is monotone. unsafeLfpFrom :: Eq a => a -> (a -> a) -> a unsafeLfpFrom = lfpFrom' (\_ _ -> True) {-# INLINE lfpFrom' #-} lfpFrom' :: Eq a => (a -> a -> Bool) -> a -> (a -> a) -> a lfpFrom' check init_x f = go init_x where go x | x' == x = x | x `check` x' = go x' | otherwise = error "lfpFrom: non-monotone function" where x' = f x -- | Greatest fixed point of a partially ordered antinone function. Checks that the function is antinone. {-# INLINE gfpFrom #-} gfpFrom :: PartialOrd a => a -> (a -> a) -> a gfpFrom = gfpFrom' leq -- | Greatest fixed point of a partially ordered antinone function. Does not check that the function is antinone. {-# INLINE unsafeGfpFrom #-} unsafeGfpFrom :: Eq a => a -> (a -> a) -> a unsafeGfpFrom = gfpFrom' (\_ _ -> True) {-# INLINE gfpFrom' #-} gfpFrom' :: Eq a => (a -> a -> Bool) -> a -> (a -> a) -> a gfpFrom' check init_x f = go init_x where go x | x' == x = x | x' `check` x = go x' | otherwise = error "gfpFrom: non-antinone function" where x' = f x