{-# LANGUAGE FlexibleContexts #-} {-# LANGUAGE FlexibleInstances #-} {-# LANGUAGE MultiParamTypeClasses #-} {-# LANGUAGE TypeFamilies #-} {-# LANGUAGE Rank2Types #-} -- | -- Implementation of fixed-vectors module Data.Vector.Fixed.Internal where import Control.Applicative (Applicative) import Control.Monad (liftM) import Data.Monoid (Monoid(..)) import qualified Data.Foldable as T import qualified Data.Traversable as T import Data.Vector.Fixed.Cont (Vector(..),Dim,S,Z,Arity,vector) import qualified Data.Vector.Fixed.Cont as C import Data.Vector.Fixed.Cont (ContVec,Index) import qualified Prelude as P import Prelude hiding ( replicate,map,zipWith,maximum,minimum,and,or,all,any , foldl,foldr,foldl1,length,sum,reverse , head,tail,mapM,mapM_,sequence,sequence_ ) ---------------------------------------------------------------- -- Constructors ---------------------------------------------------------------- -- | Variadic vector constructor. Resulting vector should be converted -- from 'ContVec' using 'vector' function. For example: -- -- >>> vector $ mkN 'a' 'b' 'c' :: (Char,Char,Char) -- ('a','b','c') mkN :: Make (S Z) a r => a -> r mkN = unGo $ make id {-# INLINE mkN #-} -- | Type class for variadic vector constructors. class Make n a r where make :: (ContVec Z a -> ContVec n a) -> r instance (a'~a, Make (S n) a r) => Make n a' (a -> r) where make f a = make (C.cons a . f) {-# INLINE make #-} instance Arity n => Make n a (ContVec n a) where make f = C.reverse $ f C.empty {-# INLINE make #-} newtype Go r = Go { unGo :: r } instance Make Z a r => Make Z a (Go r) where make f = Go $ make f {-# INLINE make #-} -- | Cons value to continuation based vector. (<|) :: a -> ContVec n a -> ContVec (S n) a (<|) = C.cons {-# INLINE (<|) #-} infixr 1 <| mk0 :: (Vector v a, Dim v ~ C.Z) => v a mk0 = vector $ C.empty {-# INLINE mk0 #-} mk1 :: (Vector v a, Dim v ~ C.N1) => a -> v a mk1 a1 = vector $ C.mk1 a1 {-# INLINE mk1 #-} mk2 :: (Vector v a, Dim v ~ C.N2) => a -> a -> v a mk2 a1 a2 = vector $ C.mk2 a1 a2 {-# INLINE mk2 #-} mk3 :: (Vector v a, Dim v ~ C.N3) => a -> a -> a -> v a mk3 a1 a2 a3 = vector $ C.mk3 a1 a2 a3 {-# INLINE mk3 #-} mk4 :: (Vector v a, Dim v ~ C.N4) => a -> a -> a -> a -> v a mk4 a1 a2 a3 a4 = vector $ C.mk4 a1 a2 a3 a4 {-# INLINE mk4 #-} mk5 :: (Vector v a, Dim v ~ C.N5) => a -> a -> a -> a -> a -> v a mk5 a1 a2 a3 a4 a5 = vector $ C.mk5 a1 a2 a3 a4 a5 {-# INLINE mk5 #-} ---------------------------------------------------------------- -- Generic functions ---------------------------------------------------------------- -- | Replicate value /n/ times. -- -- Examples: -- -- >>> import Data.Vector.Fixed.Boxed (Vec2) -- >>> replicate 1 :: Vec2 Int -- fromList [1,1] -- -- >>> replicate 2 :: (Double,Double,Double) -- (2.0,2.0,2.0) -- -- >>> import Data.Vector.Fixed.Boxed (Vec4) -- >>> replicate "foo" :: Vec4 String -- fromList ["foo","foo","foo","foo"] replicate :: Vector v a => a -> v a {-# INLINE replicate #-} replicate = vector . C.replicate -- | Execute monadic action for every element of vector. -- -- Examples: -- -- >>> import Data.Vector.Fixed.Boxed (Vec2,Vec3) -- >>> replicateM (Just 3) :: Maybe (Vec3 Int) -- Just fromList [3,3,3] -- >>> replicateM (putStrLn "Hi!") :: IO (Vec2 ()) -- Hi! -- Hi! -- fromList [(),()] replicateM :: (Vector v a, Monad m) => m a -> m (v a) {-# INLINE replicateM #-} replicateM = liftM vector . C.replicateM -- | Unit vector along Nth axis. If index is larger than vector -- dimensions returns zero vector. -- -- Examples: -- -- >>> import Data.Vector.Fixed.Boxed (Vec3) -- >>> basis 0 :: Vec3 Int -- fromList [1,0,0] -- >>> basis 1 :: Vec3 Int -- fromList [0,1,0] -- >>> basis 3 :: Vec3 Int -- fromList [0,0,0] basis :: (Vector v a, Num a) => Int -> v a {-# INLINE basis #-} basis = vector . C.basis -- | Unfold vector. unfoldr :: (Vector v a) => (b -> (a,b)) -> b -> v a {-# INLINE unfoldr #-} unfoldr f = vector . C.unfoldr f -- | Generate vector from function which maps element's index to its -- value. -- -- Examples: -- -- >>> import Data.Vector.Fixed.Unboxed (Vec4) -- >>> generate (^2) :: Vec4 Int -- fromList [0,1,4,9] generate :: (Vector v a) => (Int -> a) -> v a {-# INLINE generate #-} generate = vector . C.generate -- | Generate vector from monadic function which maps element's index -- to its value. generateM :: (Monad m, Vector v a) => (Int -> m a) -> m (v a) {-# INLINE generateM #-} generateM = liftM vector . C.generateM ---------------------------------------------------------------- -- | First element of vector. -- -- Examples: -- -- >>> import Data.Vector.Fixed.Boxed (Vec3) -- >>> let x = mk3 1 2 3 :: Vec3 Int -- >>> head x -- 1 head :: (Vector v a, Dim v ~ S n) => v a -> a {-# INLINE head #-} head = C.head . C.cvec -- | Tail of vector. -- -- Examples: -- -- >>> import Data.Complex -- >>> tail (1,2,3) :: Complex Double -- 2.0 :+ 3.0 tail :: (Vector v a, Vector w a, Dim v ~ S (Dim w)) => v a -> w a {-# INLINE tail #-} tail = vector . C.tail . C.cvec -- | Cons element to the vector cons :: (Vector v a, Vector w a, S (Dim v) ~ Dim w) => a -> v a -> w a {-# INLINE cons #-} cons a = vector . C.cons a . C.cvec -- | Append element to the vector snoc :: (Vector v a, Vector w a, S (Dim v) ~ Dim w) => a -> v a -> w a {-# INLINE snoc #-} snoc a = vector . C.snoc a . C.cvec -- | Reverse order of elements in the vector reverse :: Vector v a => v a -> v a reverse = vector . C.reverse . C.cvec {-# INLINE reverse #-} -- | Retrieve vector's element at index. Generic implementation is -- /O(n)/ but more efficient one is used when possible. (!) :: (Vector v a) => v a -> Int -> a {-# INLINE (!) #-} v ! n = runIndex n (C.cvec v) -- Used in rewriting of index function. runIndex :: Arity n => Int -> C.ContVec n r -> r runIndex = C.index {-# INLINE[0] runIndex #-} -- | Get element from vector at statically known index index :: (Vector v a, C.Index k (Dim v)) => v a -> k -> a {-# INLINE index #-} index v k = C.runContVec (C.getF k) $ C.cvec v -- | Twan van Laarhoven's lens for element of vector element :: (Vector v a, Functor f) => Int -> (a -> f a) -> (v a -> f (v a)) {-# INLINE element #-} element i f v = vector `fmap` C.element i f (C.cvec v) -- | Twan van Laarhoven's lens for element of vector with statically -- known index. elementTy :: (Vector v a, Index k (Dim v), Functor f) => k -> (a -> f a) -> (v a -> f (v a)) {-# INLINE elementTy #-} elementTy k f v = vector `fmap` C.elementTy k f (C.cvec v) -- | Left fold over vector foldl :: Vector v a => (b -> a -> b) -> b -> v a -> b {-# INLINE foldl #-} foldl f x = C.foldl f x . C.cvec -- | Right fold over vector foldr :: Vector v a => (a -> b -> b) -> b -> v a -> b {-# INLINE foldr #-} foldr f x = C.foldr f x . C.cvec -- | Left fold over vector foldl1 :: (Vector v a, Dim v ~ S n) => (a -> a -> a) -> v a -> a {-# INLINE foldl1 #-} foldl1 f = C.foldl1 f . C.cvec -- | Combine the elements of a structure using a monoid. Similar to -- 'T.fold' fold :: (Vector v m, Monoid m) => v m -> m {-# INLINE fold #-} fold = T.fold . C.cvec -- | Map each element of the structure to a monoid, -- and combine the results. Similar to 'T.foldMap' foldMap :: (Vector v a, Monoid m) => (a -> m) -> v a -> m {-# INLINE foldMap #-} foldMap f = T.foldMap f . C.cvec -- | Left fold over vector ifoldr :: Vector v a => (Int -> a -> b -> b) -> b -> v a -> b {-# INLINE ifoldr #-} ifoldr f x = C.ifoldr f x . C.cvec -- | Left fold over vector. Function is applied to each element and -- its index. ifoldl :: Vector v a => (b -> Int -> a -> b) -> b -> v a -> b {-# INLINE ifoldl #-} ifoldl f z = C.ifoldl f z . C.cvec -- | Monadic fold over vector. foldM :: (Vector v a, Monad m) => (b -> a -> m b) -> b -> v a -> m b {-# INLINE foldM #-} foldM f x = C.foldM f x . C.cvec -- | Left monadic fold over vector. Function is applied to each element and -- its index. ifoldM :: (Vector v a, Monad m) => (b -> Int -> a -> m b) -> b -> v a -> m b {-# INLINE ifoldM #-} ifoldM f x = C.ifoldM f x . C.cvec ---------------------------------------------------------------- -- | Sum all elements in the vector. sum :: (Vector v a, Num a) => v a -> a sum = C.sum . C.cvec {-# INLINE sum #-} -- | Maximal element of vector. -- -- Examples: -- -- >>> import Data.Vector.Fixed.Boxed (Vec3) -- >>> let x = mk3 1 2 3 :: Vec3 Int -- >>> maximum x -- 3 maximum :: (Vector v a, Dim v ~ S n, Ord a) => v a -> a maximum = C.maximum . C.cvec {-# INLINE maximum #-} -- | Minimal element of vector. -- -- Examples: -- -- >>> import Data.Vector.Fixed.Boxed (Vec3) -- >>> let x = mk3 1 2 3 :: Vec3 Int -- >>> minimum x -- 1 minimum :: (Vector v a, Dim v ~ S n, Ord a) => v a -> a minimum = C.minimum . C.cvec {-# INLINE minimum #-} -- | Conjunction of all elements of a vector. and :: (Vector v Bool) => v Bool -> Bool and = C.and . C.cvec {-# INLINE and #-} -- | Disjunction of all elements of a vector. or :: (Vector v Bool) => v Bool -> Bool or = C.or . C.cvec {-# INLINE or #-} -- | Determines whether all elements of vector satisfy predicate. all :: (Vector v a) => (a -> Bool) -> v a -> Bool all f = (C.all f) . C.cvec {-# INLINE all #-} -- | Determines whether any of element of vector satisfy predicate. any :: (Vector v a) => (a -> Bool) -> v a -> Bool any f = (C.any f) . C.cvec {-# INLINE any #-} ---------------------------------------------------------------- -- | Test two vectors for equality. -- -- Examples: -- -- >>> import Data.Vector.Fixed.Boxed (Vec2) -- >>> let v0 = basis 0 :: Vec2 Int -- >>> let v1 = basis 1 :: Vec2 Int -- >>> v0 `eq` v0 -- True -- >>> v0 `eq` v1 -- False eq :: (Vector v a, Eq a) => v a -> v a -> Bool {-# INLINE eq #-} eq v w = C.and $ C.zipWith (==) (C.cvec v) (C.cvec w) -- | Lexicographic ordering of two vectors. ord :: (Vector v a, Ord a) => v a -> v a -> Ordering {-# INLINE ord #-} ord v w = C.foldl mappend mempty $ C.zipWith compare (C.cvec v) (C.cvec w) ---------------------------------------------------------------- -- | Map over vector map :: (Vector v a, Vector v b) => (a -> b) -> v a -> v b {-# INLINE map #-} map f = vector . C.map f . C.cvec -- | Evaluate every action in the vector from left to right. sequence :: (Vector v a, Vector v (m a), Monad m) => v (m a) -> m (v a) {-# INLINE sequence #-} sequence = mapM id -- | Evaluate every action in the vector from left to right and ignore result sequence_ :: (Vector v (m a), Monad m) => v (m a) -> m () {-# INLINE sequence_ #-} sequence_ = mapM_ id -- | Monadic map over vector. mapM :: (Vector v a, Vector v b, Monad m) => (a -> m b) -> v a -> m (v b) {-# INLINE mapM #-} mapM f = liftM vector . C.mapM f . C.cvec -- | Apply monadic action to each element of vector and ignore result. mapM_ :: (Vector v a, Monad m) => (a -> m b) -> v a -> m () {-# INLINE mapM_ #-} mapM_ f = foldl (\m a -> m >> f a >> return ()) (return ()) -- | Apply function to every element of the vector and its index. imap :: (Vector v a, Vector v b) => (Int -> a -> b) -> v a -> v b {-# INLINE imap #-} imap f = vector . C.imap f . C.cvec -- | Apply monadic function to every element of the vector and its index. imapM :: (Vector v a, Vector v b, Monad m) => (Int -> a -> m b) -> v a -> m (v b) {-# INLINE imapM #-} imapM f = liftM vector . C.imapM f . C.cvec -- | Apply monadic function to every element of the vector and its -- index and discard result. imapM_ :: (Vector v a, Monad m) => (Int -> a -> m b) -> v a -> m () {-# INLINE imapM_ #-} imapM_ f = ifoldl (\m i a -> m >> f i a >> return ()) (return ()) -- | Analog of 'T.sequenceA' from 'T.Traversable'. sequenceA :: (Vector v a, Vector v (f a), Applicative f) => v (f a) -> f (v a) {-# INLINE sequenceA #-} sequenceA = fmap vector . T.sequenceA . C.cvec -- | Analog of 'T.traverse' from 'T.Traversable'. traverse :: (Vector v a, Vector v b, Applicative f) => (a -> f b) -> v a -> f (v b) {-# INLINE traverse #-} traverse f = fmap vector . T.traverse f . C.cvec ---------------------------------------------------------------- -- | Zip two vector together using function. -- -- Examples: -- -- >>> import Data.Vector.Fixed.Boxed (Vec3) -- >>> let b0 = basis 0 :: Vec3 Int -- >>> let b1 = basis 1 :: Vec3 Int -- >>> let b2 = basis 2 :: Vec3 Int -- >>> let vplus x y = zipWith (+) x y -- >>> vplus b0 b1 -- fromList [1,1,0] -- >>> vplus b0 b2 -- fromList [1,0,1] -- >>> vplus b1 b2 -- fromList [0,1,1] zipWith :: (Vector v a, Vector v b, Vector v c) => (a -> b -> c) -> v a -> v b -> v c {-# INLINE zipWith #-} zipWith f v u = vector $ C.zipWith f (C.cvec v) (C.cvec u) -- | Zip two vector together using monadic function. zipWithM :: (Vector v a, Vector v b, Vector v c, Monad m) => (a -> b -> m c) -> v a -> v b -> m (v c) {-# INLINE zipWithM #-} zipWithM f v u = liftM vector $ C.zipWithM f (C.cvec v) (C.cvec u) -- | Zip two vector together using function which takes element index -- as well. izipWith :: (Vector v a, Vector v b, Vector v c) => (Int -> a -> b -> c) -> v a -> v b -> v c {-# INLINE izipWith #-} izipWith f v u = vector $ C.izipWith f (C.cvec v) (C.cvec u) -- | Zip two vector together using monadic function which takes element -- index as well.. izipWithM :: (Vector v a, Vector v b, Vector v c, Monad m) => (Int -> a -> b -> m c) -> v a -> v b -> m (v c) {-# INLINE izipWithM #-} izipWithM f v u = liftM vector $ C.izipWithM f (C.cvec v) (C.cvec u) ---------------------------------------------------------------- -- | Convert between different vector types convert :: (Vector v a, Vector w a, Dim v ~ Dim w) => v a -> w a {-# INLINE convert #-} convert = vector . C.cvec -- | Convert vector to the list toList :: (Vector v a) => v a -> [a] toList = foldr (:) [] {-# INLINE toList #-} -- | Create vector form list. Will throw error if list is shorter than -- resulting vector. fromList :: (Vector v a) => [a] -> v a {-# INLINE fromList #-} fromList = vector . C.fromList -- | Create vector form list. Will throw error if list has different -- length from resulting vector. fromList' :: (Vector v a) => [a] -> v a {-# INLINE fromList' #-} fromList' = vector . C.fromList' -- | Create vector form list. Will return @Nothing@ if list has different -- length from resulting vector. fromListM :: (Vector v a) => [a] -> Maybe (v a) {-# INLINE fromListM #-} fromListM = liftM vector . C.fromListM -- | Create vector from 'Foldable' data type. Will return @Nothing@ if -- data type different number of elements that resulting vector. fromFoldable :: (Vector v a, T.Foldable f) => f a -> Maybe (v a) {-# INLINE fromFoldable #-} fromFoldable = fromListM . T.toList