{-# LANGUAGE CPP #-}
{-# LANGUAGE TypeOperators #-}
{-# LANGUAGE KindSignatures #-}
{-# LANGUAGE ScopedTypeVariables #-}
{-# LANGUAGE GeneralizedNewtypeDeriving #-}
{-# LANGUAGE DefaultSignatures #-}
{-# LANGUAGE Rank2Types #-}
{-# LANGUAGE TypeFamilies #-}
{-# LANGUAGE EmptyDataDecls #-}
{-# LANGUAGE MultiParamTypeClasses, FlexibleContexts, FlexibleInstances, UndecidableInstances #-}
{-# LANGUAGE DeriveDataTypeable #-}
#if __GLASGOW_HASKELL__ >= 707
{-# LANGUAGE DataKinds #-}
{-# LANGUAGE PolyKinds #-}
#endif
#if __GLASGOW_HASKELL__ >= 707
{-# LANGUAGE RoleAnnotations #-}
#define USE_TYPE_LITS 1
#endif
{-# LANGUAGE Trustworthy #-}
{-# LANGUAGE DeriveGeneric #-}
#ifndef MIN_VERSION_hashable
#define MIN_VERSION_hashable(x,y,z) 1
#endif
#ifndef MIN_VERSION_reflection
#define MIN_VERSION_reflection(x,y,z) 1
#endif
#ifndef MIN_VERSION_transformers
#define MIN_VERSION_transformers(x,y,z) 1
#endif
#ifndef MIN_VERSION_base
#define MIN_VERSION_base(x,y,z) 1
#endif
module Linear.V
( V(V,toVector)
#ifdef MIN_VERSION_template_haskell
, int
#endif
, dim
, Dim(..)
, reifyDim
, reifyVector
#if (MIN_VERSION_reflection(2,0,0)) && __GLASGOW_HASKELL__ >= 708
, reifyDimNat
, reifyVectorNat
#endif
, fromVector
#if __GLASGOW_HASKELL__ >= 707
, Finite(..)
, _V, _V'
#endif
) where
import Control.Applicative
import Control.DeepSeq (NFData)
import Control.Monad
import Control.Monad.Fix
import Control.Monad.Trans.State
import Control.Monad.Zip
import Control.Lens as Lens
import Data.Binary as Binary
import Data.Bytes.Serial
#if __GLASGOW_HASKELL__ >= 707
import Data.Complex
#endif
import Data.Data
import Data.Distributive
import Data.Foldable as Foldable
import qualified Data.Foldable.WithIndex as WithIndex
import Data.Functor.Bind
import Data.Functor.Classes
import Data.Functor.Rep as Rep
import qualified Data.Functor.WithIndex as WithIndex
import Data.Hashable
#if (MIN_VERSION_hashable(1,2,5))
import Data.Hashable.Lifted
#endif
#if __GLASGOW_HASKELL__ < 708
import Data.Proxy
#endif
import Data.Reflection as R
import Data.Serialize as Cereal
#if __GLASGOW_HASKELL__ < 710
import Data.Traversable (sequenceA)
#endif
import qualified Data.Traversable.WithIndex as WithIndex
import qualified Data.Vector as V
import Data.Vector (Vector)
import qualified Data.Vector.Generic as G
import qualified Data.Vector.Unboxed as U
import qualified Data.Vector.Generic.Mutable as M
import Foreign.Ptr
import Foreign.Storable
#ifdef USE_TYPE_LITS
import GHC.TypeLits
#endif
#if __GLASGOW_HASKELL__ >= 702
import GHC.Generics (Generic)
#endif
#if __GLASGOW_HASKELL__ >= 707
import GHC.Generics (Generic1)
#endif
#if !(MIN_VERSION_reflection(1,3,0)) && defined(MIN_VERSION_template_haskell)
import Language.Haskell.TH
#endif
import Linear.Epsilon
import Linear.Metric
import Linear.Vector
#if (MIN_VERSION_transformers(0,5,0)) || !(MIN_VERSION_transformers(0,4,0))
import Prelude as P
#endif
#if !(MIN_VERSION_base(4,11,0))
import Data.Semigroup
#endif
import System.Random
class Dim n where
reflectDim :: p n -> Int
#if __GLASGOW_HASKELL__ >= 707
type role V nominal representational
class Finite v where
type Size (v :: * -> *) :: Nat
toV :: v a -> V (Size v) a
default toV :: Foldable v => v a -> V (Size v) a
toV = Vector a -> V (Size v) a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V (Size v) a)
-> (v a -> Vector a) -> v a -> V (Size v) a
forall b c a. (b -> c) -> (a -> b) -> a -> c
. [a] -> Vector a
forall a. [a] -> Vector a
V.fromList ([a] -> Vector a) -> (v a -> [a]) -> v a -> Vector a
forall b c a. (b -> c) -> (a -> b) -> a -> c
. v a -> [a]
forall (t :: * -> *) a. Foldable t => t a -> [a]
Foldable.toList
fromV :: V (Size v) a -> v a
instance Finite Complex where
type Size Complex = 2
toV :: Complex a -> V (Size Complex) a
toV (a
a :+ a
b) = Vector a -> V 2 a
forall k (n :: k) a. Vector a -> V n a
V (Int -> [a] -> Vector a
forall a. Int -> [a] -> Vector a
V.fromListN Int
2 [a
a, a
b])
fromV :: V (Size Complex) a -> Complex a
fromV (V Vector a
v) = (Vector a
v Vector a -> Int -> a
forall a. Vector a -> Int -> a
V.! Int
0) a -> a -> Complex a
forall a. a -> a -> Complex a
:+ (Vector a
v Vector a -> Int -> a
forall a. Vector a -> Int -> a
V.! Int
1)
_V :: (Finite u, Finite v) => Iso (V (Size u) a) (V (Size v) b) (u a) (v b)
_V :: Iso (V (Size u) a) (V (Size v) b) (u a) (v b)
_V = (V (Size u) a -> u a)
-> (v b -> V (Size v) b)
-> Iso (V (Size u) a) (V (Size v) b) (u a) (v b)
forall s a b t. (s -> a) -> (b -> t) -> Iso s t a b
iso V (Size u) a -> u a
forall (v :: * -> *) a. Finite v => V (Size v) a -> v a
fromV v b -> V (Size v) b
forall (v :: * -> *) a. Finite v => v a -> V (Size v) a
toV
_V' :: Finite v => Iso (V (Size v) a) (V (Size v) b) (v a) (v b)
_V' :: Iso (V (Size v) a) (V (Size v) b) (v a) (v b)
_V' = (V (Size v) a -> v a)
-> (v b -> V (Size v) b)
-> Iso (V (Size v) a) (V (Size v) b) (v a) (v b)
forall s a b t. (s -> a) -> (b -> t) -> Iso s t a b
iso V (Size v) a -> v a
forall (v :: * -> *) a. Finite v => V (Size v) a -> v a
fromV v b -> V (Size v) b
forall (v :: * -> *) a. Finite v => v a -> V (Size v) a
toV
instance Finite (V (n :: Nat)) where
type Size (V n) = n
toV :: V n a -> V (Size (V n)) a
toV = V n a -> V (Size (V n)) a
forall a. a -> a
id
fromV :: V (Size (V n)) a -> V n a
fromV = V (Size (V n)) a -> V n a
forall a. a -> a
id
#endif
newtype V n a = V { V n a -> Vector a
toVector :: V.Vector a } deriving (V n a -> V n a -> Bool
(V n a -> V n a -> Bool) -> (V n a -> V n a -> Bool) -> Eq (V n a)
forall a. (a -> a -> Bool) -> (a -> a -> Bool) -> Eq a
forall k (n :: k) a. Eq a => V n a -> V n a -> Bool
/= :: V n a -> V n a -> Bool
$c/= :: forall k (n :: k) a. Eq a => V n a -> V n a -> Bool
== :: V n a -> V n a -> Bool
$c== :: forall k (n :: k) a. Eq a => V n a -> V n a -> Bool
Eq,Eq (V n a)
Eq (V n a)
-> (V n a -> V n a -> Ordering)
-> (V n a -> V n a -> Bool)
-> (V n a -> V n a -> Bool)
-> (V n a -> V n a -> Bool)
-> (V n a -> V n a -> Bool)
-> (V n a -> V n a -> V n a)
-> (V n a -> V n a -> V n a)
-> Ord (V n a)
V n a -> V n a -> Bool
V n a -> V n a -> Ordering
V n a -> V n a -> V n a
forall a.
Eq a
-> (a -> a -> Ordering)
-> (a -> a -> Bool)
-> (a -> a -> Bool)
-> (a -> a -> Bool)
-> (a -> a -> Bool)
-> (a -> a -> a)
-> (a -> a -> a)
-> Ord a
forall k (n :: k) a. Ord a => Eq (V n a)
forall k (n :: k) a. Ord a => V n a -> V n a -> Bool
forall k (n :: k) a. Ord a => V n a -> V n a -> Ordering
forall k (n :: k) a. Ord a => V n a -> V n a -> V n a
min :: V n a -> V n a -> V n a
$cmin :: forall k (n :: k) a. Ord a => V n a -> V n a -> V n a
max :: V n a -> V n a -> V n a
$cmax :: forall k (n :: k) a. Ord a => V n a -> V n a -> V n a
>= :: V n a -> V n a -> Bool
$c>= :: forall k (n :: k) a. Ord a => V n a -> V n a -> Bool
> :: V n a -> V n a -> Bool
$c> :: forall k (n :: k) a. Ord a => V n a -> V n a -> Bool
<= :: V n a -> V n a -> Bool
$c<= :: forall k (n :: k) a. Ord a => V n a -> V n a -> Bool
< :: V n a -> V n a -> Bool
$c< :: forall k (n :: k) a. Ord a => V n a -> V n a -> Bool
compare :: V n a -> V n a -> Ordering
$ccompare :: forall k (n :: k) a. Ord a => V n a -> V n a -> Ordering
$cp1Ord :: forall k (n :: k) a. Ord a => Eq (V n a)
Ord,Int -> V n a -> ShowS
[V n a] -> ShowS
V n a -> String
(Int -> V n a -> ShowS)
-> (V n a -> String) -> ([V n a] -> ShowS) -> Show (V n a)
forall a.
(Int -> a -> ShowS) -> (a -> String) -> ([a] -> ShowS) -> Show a
forall k (n :: k) a. Show a => Int -> V n a -> ShowS
forall k (n :: k) a. Show a => [V n a] -> ShowS
forall k (n :: k) a. Show a => V n a -> String
showList :: [V n a] -> ShowS
$cshowList :: forall k (n :: k) a. Show a => [V n a] -> ShowS
show :: V n a -> String
$cshow :: forall k (n :: k) a. Show a => V n a -> String
showsPrec :: Int -> V n a -> ShowS
$cshowsPrec :: forall k (n :: k) a. Show a => Int -> V n a -> ShowS
Show,ReadPrec [V n a]
ReadPrec (V n a)
Int -> ReadS (V n a)
ReadS [V n a]
(Int -> ReadS (V n a))
-> ReadS [V n a]
-> ReadPrec (V n a)
-> ReadPrec [V n a]
-> Read (V n a)
forall a.
(Int -> ReadS a)
-> ReadS [a] -> ReadPrec a -> ReadPrec [a] -> Read a
forall k (n :: k) a. Read a => ReadPrec [V n a]
forall k (n :: k) a. Read a => ReadPrec (V n a)
forall k (n :: k) a. Read a => Int -> ReadS (V n a)
forall k (n :: k) a. Read a => ReadS [V n a]
readListPrec :: ReadPrec [V n a]
$creadListPrec :: forall k (n :: k) a. Read a => ReadPrec [V n a]
readPrec :: ReadPrec (V n a)
$creadPrec :: forall k (n :: k) a. Read a => ReadPrec (V n a)
readList :: ReadS [V n a]
$creadList :: forall k (n :: k) a. Read a => ReadS [V n a]
readsPrec :: Int -> ReadS (V n a)
$creadsPrec :: forall k (n :: k) a. Read a => Int -> ReadS (V n a)
Read,Typeable,V n a -> ()
(V n a -> ()) -> NFData (V n a)
forall a. (a -> ()) -> NFData a
forall k (n :: k) a. NFData a => V n a -> ()
rnf :: V n a -> ()
$crnf :: forall k (n :: k) a. NFData a => V n a -> ()
NFData
, (forall x. V n a -> Rep (V n a) x)
-> (forall x. Rep (V n a) x -> V n a) -> Generic (V n a)
forall x. Rep (V n a) x -> V n a
forall x. V n a -> Rep (V n a) x
forall a.
(forall x. a -> Rep a x) -> (forall x. Rep a x -> a) -> Generic a
forall k (n :: k) a x. Rep (V n a) x -> V n a
forall k (n :: k) a x. V n a -> Rep (V n a) x
$cto :: forall k (n :: k) a x. Rep (V n a) x -> V n a
$cfrom :: forall k (n :: k) a x. V n a -> Rep (V n a) x
Generic
#if __GLASGOW_HASKELL__ >= 707
,(forall a. V n a -> Rep1 (V n) a)
-> (forall a. Rep1 (V n) a -> V n a) -> Generic1 (V n)
forall a. Rep1 (V n) a -> V n a
forall a. V n a -> Rep1 (V n) a
forall k (n :: k) a. Rep1 (V n) a -> V n a
forall k (n :: k) a. V n a -> Rep1 (V n) a
forall k (f :: k -> *).
(forall (a :: k). f a -> Rep1 f a)
-> (forall (a :: k). Rep1 f a -> f a) -> Generic1 f
$cto1 :: forall k (n :: k) a. Rep1 (V n) a -> V n a
$cfrom1 :: forall k (n :: k) a. V n a -> Rep1 (V n) a
Generic1
#endif
)
dim :: forall n a. Dim n => V n a -> Int
dim :: V n a -> Int
dim V n a
_ = Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)
{-# INLINE dim #-}
#ifdef USE_TYPE_LITS
instance KnownNat n => Dim (n :: Nat) where
reflectDim :: p n -> Int
reflectDim = Integer -> Int
forall a. Num a => Integer -> a
fromInteger (Integer -> Int) -> (p n -> Integer) -> p n -> Int
forall b c a. (b -> c) -> (a -> b) -> a -> c
. p n -> Integer
forall (n :: Nat) (proxy :: Nat -> *).
KnownNat n =>
proxy n -> Integer
natVal
{-# INLINE reflectDim #-}
#endif
instance (Dim n, Random a) => Random (V n a) where
random :: g -> (V n a, g)
random = State g (V n a) -> g -> (V n a, g)
forall s a. State s a -> s -> (a, s)
runState (Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a)
-> StateT g Identity (Vector a) -> State g (V n a)
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
<$> Int -> StateT g Identity a -> StateT g Identity (Vector a)
forall (m :: * -> *) a. Monad m => Int -> m a -> m (Vector a)
V.replicateM (Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)) ((g -> (a, g)) -> StateT g Identity a
forall (m :: * -> *) s a. Monad m => (s -> (a, s)) -> StateT s m a
state g -> (a, g)
forall a g. (Random a, RandomGen g) => g -> (a, g)
random))
randomR :: (V n a, V n a) -> g -> (V n a, g)
randomR (V Vector a
ls,V Vector a
hs) = State g (V n a) -> g -> (V n a, g)
forall s a. State s a -> s -> (a, s)
runState (Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a)
-> StateT g Identity (Vector a) -> State g (V n a)
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
<$> (a -> a -> StateT g Identity a)
-> Vector a -> Vector a -> StateT g Identity (Vector a)
forall (m :: * -> *) a b c.
Monad m =>
(a -> b -> m c) -> Vector a -> Vector b -> m (Vector c)
V.zipWithM (\a
l a
h -> (g -> (a, g)) -> StateT g Identity a
forall (m :: * -> *) s a. Monad m => (s -> (a, s)) -> StateT s m a
state ((g -> (a, g)) -> StateT g Identity a)
-> (g -> (a, g)) -> StateT g Identity a
forall a b. (a -> b) -> a -> b
$ (a, a) -> g -> (a, g)
forall a g. (Random a, RandomGen g) => (a, a) -> g -> (a, g)
randomR (a
l,a
h)) Vector a
ls Vector a
hs)
data ReifiedDim (s :: *)
retagDim :: (Proxy s -> a) -> proxy (ReifiedDim s) -> a
retagDim :: (Proxy s -> a) -> proxy (ReifiedDim s) -> a
retagDim Proxy s -> a
f proxy (ReifiedDim s)
_ = Proxy s -> a
f Proxy s
forall k (t :: k). Proxy t
Proxy
{-# INLINE retagDim #-}
instance Reifies s Int => Dim (ReifiedDim s) where
reflectDim :: p (ReifiedDim s) -> Int
reflectDim = (Proxy s -> Int) -> p (ReifiedDim s) -> Int
forall s a (proxy :: * -> *).
(Proxy s -> a) -> proxy (ReifiedDim s) -> a
retagDim Proxy s -> Int
forall k (s :: k) a (proxy :: k -> *). Reifies s a => proxy s -> a
reflect
{-# INLINE reflectDim #-}
#if (MIN_VERSION_reflection(2,0,0)) && __GLASGOW_HASKELL__ >= 708
reifyDimNat :: Int -> (forall (n :: Nat). KnownNat n => Proxy n -> r) -> r
reifyDimNat :: Int -> (forall (n :: Nat). KnownNat n => Proxy n -> r) -> r
reifyDimNat Int
i forall (n :: Nat). KnownNat n => Proxy n -> r
f = Integer -> (forall (n :: Nat). KnownNat n => Proxy n -> r) -> r
forall r.
Integer -> (forall (n :: Nat). KnownNat n => Proxy n -> r) -> r
R.reifyNat (Int -> Integer
forall a b. (Integral a, Num b) => a -> b
fromIntegral Int
i) forall (n :: Nat). KnownNat n => Proxy n -> r
f
{-# INLINE reifyDimNat #-}
reifyVectorNat :: forall a r. Vector a -> (forall (n :: Nat). KnownNat n => V n a -> r) -> r
reifyVectorNat :: Vector a -> (forall (n :: Nat). KnownNat n => V n a -> r) -> r
reifyVectorNat Vector a
v forall (n :: Nat). KnownNat n => V n a -> r
f = Integer -> (forall (n :: Nat). KnownNat n => Proxy n -> r) -> r
forall r.
Integer -> (forall (n :: Nat). KnownNat n => Proxy n -> r) -> r
reifyNat (Int -> Integer
forall a b. (Integral a, Num b) => a -> b
fromIntegral (Int -> Integer) -> Int -> Integer
forall a b. (a -> b) -> a -> b
$ Vector a -> Int
forall a. Vector a -> Int
V.length Vector a
v) ((forall (n :: Nat). KnownNat n => Proxy n -> r) -> r)
-> (forall (n :: Nat). KnownNat n => Proxy n -> r) -> r
forall a b. (a -> b) -> a -> b
$ \(Proxy n
Proxy :: Proxy n) -> V n a -> r
forall (n :: Nat). KnownNat n => V n a -> r
f (Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V Vector a
v :: V n a)
{-# INLINE reifyVectorNat #-}
#endif
reifyDim :: Int -> (forall (n :: *). Dim n => Proxy n -> r) -> r
reifyDim :: Int -> (forall n. Dim n => Proxy n -> r) -> r
reifyDim Int
i forall n. Dim n => Proxy n -> r
f = Int -> (forall s. Reifies s Int => Proxy s -> r) -> r
forall a r. a -> (forall s. Reifies s a => Proxy s -> r) -> r
R.reify Int
i ((Proxy (ReifiedDim s) -> r) -> Proxy s -> r
forall n a (proxy :: * -> *).
(Proxy (ReifiedDim n) -> a) -> proxy n -> a
go Proxy (ReifiedDim s) -> r
forall n. Dim n => Proxy n -> r
f) where
go :: (Proxy (ReifiedDim n) -> a) -> proxy n -> a
go :: (Proxy (ReifiedDim n) -> a) -> proxy n -> a
go Proxy (ReifiedDim n) -> a
g proxy n
_ = Proxy (ReifiedDim n) -> a
g Proxy (ReifiedDim n)
forall k (t :: k). Proxy t
Proxy
{-# INLINE reifyDim #-}
reifyVector :: forall a r. Vector a -> (forall (n :: *). Dim n => V n a -> r) -> r
reifyVector :: Vector a -> (forall n. Dim n => V n a -> r) -> r
reifyVector Vector a
v forall n. Dim n => V n a -> r
f = Int -> (forall n. Dim n => Proxy n -> r) -> r
forall r. Int -> (forall n. Dim n => Proxy n -> r) -> r
reifyDim (Vector a -> Int
forall a. Vector a -> Int
V.length Vector a
v) ((forall n. Dim n => Proxy n -> r) -> r)
-> (forall n. Dim n => Proxy n -> r) -> r
forall a b. (a -> b) -> a -> b
$ \(Proxy n
Proxy :: Proxy n) -> V n a -> r
forall n. Dim n => V n a -> r
f (Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V Vector a
v :: V n a)
{-# INLINE reifyVector #-}
instance Dim n => Dim (V n a) where
reflectDim :: p (V n a) -> Int
reflectDim p (V n a)
_ = Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)
{-# INLINE reflectDim #-}
instance (Dim n, Semigroup a) => Semigroup (V n a) where
<> :: V n a -> V n a -> V n a
(<>) = (a -> a -> a) -> V n a -> V n a -> V n a
forall (f :: * -> *) a b c.
Applicative f =>
(a -> b -> c) -> f a -> f b -> f c
liftA2 a -> a -> a
forall a. Semigroup a => a -> a -> a
(<>)
instance (Dim n, Monoid a) => Monoid (V n a) where
mempty :: V n a
mempty = a -> V n a
forall (f :: * -> *) a. Applicative f => a -> f a
pure a
forall a. Monoid a => a
mempty
#if !(MIN_VERSION_base(4,11,0))
mappend = liftA2 mappend
#endif
instance Functor (V n) where
fmap :: (a -> b) -> V n a -> V n b
fmap a -> b
f (V Vector a
as) = Vector b -> V n b
forall k (n :: k) a. Vector a -> V n a
V ((a -> b) -> Vector a -> Vector b
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> b
f Vector a
as)
{-# INLINE fmap #-}
instance WithIndex.FunctorWithIndex Int (V n) where
imap :: (Int -> a -> b) -> V n a -> V n b
imap Int -> a -> b
f (V Vector a
as) = Vector b -> V n b
forall k (n :: k) a. Vector a -> V n a
V ((Int -> a -> b) -> Vector a -> Vector b
forall i (f :: * -> *) a b.
FunctorWithIndex i f =>
(i -> a -> b) -> f a -> f b
Lens.imap Int -> a -> b
f Vector a
as)
{-# INLINE imap #-}
instance Foldable (V n) where
fold :: V n m -> m
fold (V Vector m
as) = Vector m -> m
forall (t :: * -> *) m. (Foldable t, Monoid m) => t m -> m
fold Vector m
as
{-# INLINE fold #-}
foldMap :: (a -> m) -> V n a -> m
foldMap a -> m
f (V Vector a
as) = (a -> m) -> Vector a -> m
forall (t :: * -> *) m a.
(Foldable t, Monoid m) =>
(a -> m) -> t a -> m
Foldable.foldMap a -> m
f Vector a
as
{-# INLINE foldMap #-}
foldr :: (a -> b -> b) -> b -> V n a -> b
foldr a -> b -> b
f b
z (V Vector a
as) = (a -> b -> b) -> b -> Vector a -> b
forall a b. (a -> b -> b) -> b -> Vector a -> b
V.foldr a -> b -> b
f b
z Vector a
as
{-# INLINE foldr #-}
foldl :: (b -> a -> b) -> b -> V n a -> b
foldl b -> a -> b
f b
z (V Vector a
as) = (b -> a -> b) -> b -> Vector a -> b
forall a b. (a -> b -> a) -> a -> Vector b -> a
V.foldl b -> a -> b
f b
z Vector a
as
{-# INLINE foldl #-}
#if __GLASGOW_HASKELL__ >= 706
foldr' :: (a -> b -> b) -> b -> V n a -> b
foldr' a -> b -> b
f b
z (V Vector a
as) = (a -> b -> b) -> b -> Vector a -> b
forall a b. (a -> b -> b) -> b -> Vector a -> b
V.foldr' a -> b -> b
f b
z Vector a
as
{-# INLINE foldr' #-}
foldl' :: (b -> a -> b) -> b -> V n a -> b
foldl' b -> a -> b
f b
z (V Vector a
as) = (b -> a -> b) -> b -> Vector a -> b
forall a b. (a -> b -> a) -> a -> Vector b -> a
V.foldl' b -> a -> b
f b
z Vector a
as
{-# INLINE foldl' #-}
#endif
foldr1 :: (a -> a -> a) -> V n a -> a
foldr1 a -> a -> a
f (V Vector a
as) = (a -> a -> a) -> Vector a -> a
forall a. (a -> a -> a) -> Vector a -> a
V.foldr1 a -> a -> a
f Vector a
as
{-# INLINE foldr1 #-}
foldl1 :: (a -> a -> a) -> V n a -> a
foldl1 a -> a -> a
f (V Vector a
as) = (a -> a -> a) -> Vector a -> a
forall a. (a -> a -> a) -> Vector a -> a
V.foldl1 a -> a -> a
f Vector a
as
{-# INLINE foldl1 #-}
#if __GLASGOW_HASKELL__ >= 710
length :: V n a -> Int
length (V Vector a
as) = Vector a -> Int
forall a. Vector a -> Int
V.length Vector a
as
{-# INLINE length #-}
null :: V n a -> Bool
null (V Vector a
as) = Vector a -> Bool
forall a. Vector a -> Bool
V.null Vector a
as
{-# INLINE null #-}
toList :: V n a -> [a]
toList (V Vector a
as) = Vector a -> [a]
forall a. Vector a -> [a]
V.toList Vector a
as
{-# INLINE toList #-}
elem :: a -> V n a -> Bool
elem a
a (V Vector a
as) = a -> Vector a -> Bool
forall a. Eq a => a -> Vector a -> Bool
V.elem a
a Vector a
as
{-# INLINE elem #-}
maximum :: V n a -> a
maximum (V Vector a
as) = Vector a -> a
forall a. Ord a => Vector a -> a
V.maximum Vector a
as
{-# INLINE maximum #-}
minimum :: V n a -> a
minimum (V Vector a
as) = Vector a -> a
forall a. Ord a => Vector a -> a
V.minimum Vector a
as
{-# INLINE minimum #-}
sum :: V n a -> a
sum (V Vector a
as) = Vector a -> a
forall a. Num a => Vector a -> a
V.sum Vector a
as
{-# INLINE sum #-}
product :: V n a -> a
product (V Vector a
as) = Vector a -> a
forall a. Num a => Vector a -> a
V.product Vector a
as
{-# INLINE product #-}
#endif
instance WithIndex.FoldableWithIndex Int (V n) where
ifoldMap :: (Int -> a -> m) -> V n a -> m
ifoldMap Int -> a -> m
f (V Vector a
as) = (Int -> a -> m) -> Vector a -> m
forall i (f :: * -> *) m a.
(FoldableWithIndex i f, Monoid m) =>
(i -> a -> m) -> f a -> m
ifoldMap Int -> a -> m
f Vector a
as
{-# INLINE ifoldMap #-}
instance Traversable (V n) where
traverse :: (a -> f b) -> V n a -> f (V n b)
traverse a -> f b
f (V Vector a
as) = Vector b -> V n b
forall k (n :: k) a. Vector a -> V n a
V (Vector b -> V n b) -> f (Vector b) -> f (V n b)
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
<$> (a -> f b) -> Vector a -> f (Vector b)
forall (t :: * -> *) (f :: * -> *) a b.
(Traversable t, Applicative f) =>
(a -> f b) -> t a -> f (t b)
traverse a -> f b
f Vector a
as
{-# INLINE traverse #-}
instance WithIndex.TraversableWithIndex Int (V n) where
itraverse :: (Int -> a -> f b) -> V n a -> f (V n b)
itraverse Int -> a -> f b
f (V Vector a
as) = Vector b -> V n b
forall k (n :: k) a. Vector a -> V n a
V (Vector b -> V n b) -> f (Vector b) -> f (V n b)
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
<$> (Int -> a -> f b) -> Vector a -> f (Vector b)
forall i (t :: * -> *) (f :: * -> *) a b.
(TraversableWithIndex i t, Applicative f) =>
(i -> a -> f b) -> t a -> f (t b)
itraverse Int -> a -> f b
f Vector a
as
{-# INLINE itraverse #-}
#if !MIN_VERSION_lens(5,0,0)
instance Lens.FunctorWithIndex Int (V n) where imap = WithIndex.imap
instance Lens.FoldableWithIndex Int (V n) where ifoldMap = WithIndex.ifoldMap
instance Lens.TraversableWithIndex Int (V n) where itraverse = WithIndex.itraverse
#endif
instance Apply (V n) where
V Vector (a -> b)
as <.> :: V n (a -> b) -> V n a -> V n b
<.> V Vector a
bs = Vector b -> V n b
forall k (n :: k) a. Vector a -> V n a
V (((a -> b) -> a -> b) -> Vector (a -> b) -> Vector a -> Vector b
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith (a -> b) -> a -> b
forall a. a -> a
id Vector (a -> b)
as Vector a
bs)
{-# INLINE (<.>) #-}
instance Dim n => Applicative (V n) where
pure :: a -> V n a
pure = Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a) -> (a -> Vector a) -> a -> V n a
forall b c a. (b -> c) -> (a -> b) -> a -> c
. Int -> a -> Vector a
forall a. Int -> a -> Vector a
V.replicate (Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n))
{-# INLINE pure #-}
V Vector (a -> b)
as <*> :: V n (a -> b) -> V n a -> V n b
<*> V Vector a
bs = Vector b -> V n b
forall k (n :: k) a. Vector a -> V n a
V (((a -> b) -> a -> b) -> Vector (a -> b) -> Vector a -> Vector b
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith (a -> b) -> a -> b
forall a. a -> a
id Vector (a -> b)
as Vector a
bs)
{-# INLINE (<*>) #-}
instance Bind (V n) where
V Vector a
as >>- :: V n a -> (a -> V n b) -> V n b
>>- a -> V n b
f = Vector b -> V n b
forall k (n :: k) a. Vector a -> V n a
V (Vector b -> V n b) -> Vector b -> V n b
forall a b. (a -> b) -> a -> b
$ Int -> (Int -> b) -> Vector b
forall a. Int -> (Int -> a) -> Vector a
V.generate (Vector a -> Int
forall a. Vector a -> Int
V.length Vector a
as) ((Int -> b) -> Vector b) -> (Int -> b) -> Vector b
forall a b. (a -> b) -> a -> b
$ \Int
i ->
V n b -> Vector b
forall k (n :: k) a. V n a -> Vector a
toVector (a -> V n b
f (Vector a
as Vector a -> Int -> a
forall a. Vector a -> Int -> a
`V.unsafeIndex` Int
i)) Vector b -> Int -> b
forall a. Vector a -> Int -> a
`V.unsafeIndex` Int
i
{-# INLINE (>>-) #-}
instance Dim n => Monad (V n) where
return :: a -> V n a
return = Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a) -> (a -> Vector a) -> a -> V n a
forall b c a. (b -> c) -> (a -> b) -> a -> c
. Int -> a -> Vector a
forall a. Int -> a -> Vector a
V.replicate (Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n))
{-# INLINE return #-}
V Vector a
as >>= :: V n a -> (a -> V n b) -> V n b
>>= a -> V n b
f = Vector b -> V n b
forall k (n :: k) a. Vector a -> V n a
V (Vector b -> V n b) -> Vector b -> V n b
forall a b. (a -> b) -> a -> b
$ Int -> (Int -> b) -> Vector b
forall a. Int -> (Int -> a) -> Vector a
V.generate (Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)) ((Int -> b) -> Vector b) -> (Int -> b) -> Vector b
forall a b. (a -> b) -> a -> b
$ \Int
i ->
V n b -> Vector b
forall k (n :: k) a. V n a -> Vector a
toVector (a -> V n b
f (Vector a
as Vector a -> Int -> a
forall a. Vector a -> Int -> a
`V.unsafeIndex` Int
i)) Vector b -> Int -> b
forall a. Vector a -> Int -> a
`V.unsafeIndex` Int
i
{-# INLINE (>>=) #-}
instance Dim n => Additive (V n) where
zero :: V n a
zero = a -> V n a
forall (f :: * -> *) a. Applicative f => a -> f a
pure a
0
{-# INLINE zero #-}
liftU2 :: (a -> a -> a) -> V n a -> V n a -> V n a
liftU2 a -> a -> a
f (V Vector a
as) (V Vector a
bs) = Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V ((a -> a -> a) -> Vector a -> Vector a -> Vector a
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith a -> a -> a
f Vector a
as Vector a
bs)
{-# INLINE liftU2 #-}
liftI2 :: (a -> b -> c) -> V n a -> V n b -> V n c
liftI2 a -> b -> c
f (V Vector a
as) (V Vector b
bs) = Vector c -> V n c
forall k (n :: k) a. Vector a -> V n a
V ((a -> b -> c) -> Vector a -> Vector b -> Vector c
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith a -> b -> c
f Vector a
as Vector b
bs)
{-# INLINE liftI2 #-}
instance (Dim n, Num a) => Num (V n a) where
V Vector a
as + :: V n a -> V n a -> V n a
+ V Vector a
bs = Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a) -> Vector a -> V n a
forall a b. (a -> b) -> a -> b
$ (a -> a -> a) -> Vector a -> Vector a -> Vector a
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith a -> a -> a
forall a. Num a => a -> a -> a
(+) Vector a
as Vector a
bs
{-# INLINE (+) #-}
V Vector a
as - :: V n a -> V n a -> V n a
- V Vector a
bs = Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a) -> Vector a -> V n a
forall a b. (a -> b) -> a -> b
$ (a -> a -> a) -> Vector a -> Vector a -> Vector a
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith (-) Vector a
as Vector a
bs
{-# INLINE (-) #-}
V Vector a
as * :: V n a -> V n a -> V n a
* V Vector a
bs = Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a) -> Vector a -> V n a
forall a b. (a -> b) -> a -> b
$ (a -> a -> a) -> Vector a -> Vector a -> Vector a
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith a -> a -> a
forall a. Num a => a -> a -> a
(*) Vector a
as Vector a
bs
{-# INLINE (*) #-}
negate :: V n a -> V n a
negate = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Num a => a -> a
negate
{-# INLINE negate #-}
abs :: V n a -> V n a
abs = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Num a => a -> a
abs
{-# INLINE abs #-}
signum :: V n a -> V n a
signum = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Num a => a -> a
signum
{-# INLINE signum #-}
fromInteger :: Integer -> V n a
fromInteger = a -> V n a
forall (f :: * -> *) a. Applicative f => a -> f a
pure (a -> V n a) -> (Integer -> a) -> Integer -> V n a
forall b c a. (b -> c) -> (a -> b) -> a -> c
. Integer -> a
forall a. Num a => Integer -> a
fromInteger
{-# INLINE fromInteger #-}
instance (Dim n, Fractional a) => Fractional (V n a) where
recip :: V n a -> V n a
recip = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Fractional a => a -> a
recip
{-# INLINE recip #-}
V Vector a
as / :: V n a -> V n a -> V n a
/ V Vector a
bs = Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a) -> Vector a -> V n a
forall a b. (a -> b) -> a -> b
$ (a -> a -> a) -> Vector a -> Vector a -> Vector a
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith a -> a -> a
forall a. Fractional a => a -> a -> a
(/) Vector a
as Vector a
bs
{-# INLINE (/) #-}
fromRational :: Rational -> V n a
fromRational = a -> V n a
forall (f :: * -> *) a. Applicative f => a -> f a
pure (a -> V n a) -> (Rational -> a) -> Rational -> V n a
forall b c a. (b -> c) -> (a -> b) -> a -> c
. Rational -> a
forall a. Fractional a => Rational -> a
fromRational
{-# INLINE fromRational #-}
instance (Dim n, Floating a) => Floating (V n a) where
pi :: V n a
pi = a -> V n a
forall (f :: * -> *) a. Applicative f => a -> f a
pure a
forall a. Floating a => a
pi
{-# INLINE pi #-}
exp :: V n a -> V n a
exp = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
exp
{-# INLINE exp #-}
sqrt :: V n a -> V n a
sqrt = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
sqrt
{-# INLINE sqrt #-}
log :: V n a -> V n a
log = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
log
{-# INLINE log #-}
V Vector a
as ** :: V n a -> V n a -> V n a
** V Vector a
bs = Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a) -> Vector a -> V n a
forall a b. (a -> b) -> a -> b
$ (a -> a -> a) -> Vector a -> Vector a -> Vector a
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith a -> a -> a
forall a. Floating a => a -> a -> a
(**) Vector a
as Vector a
bs
{-# INLINE (**) #-}
logBase :: V n a -> V n a -> V n a
logBase (V Vector a
as) (V Vector a
bs) = Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a) -> Vector a -> V n a
forall a b. (a -> b) -> a -> b
$ (a -> a -> a) -> Vector a -> Vector a -> Vector a
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith a -> a -> a
forall a. Floating a => a -> a -> a
logBase Vector a
as Vector a
bs
{-# INLINE logBase #-}
sin :: V n a -> V n a
sin = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
sin
{-# INLINE sin #-}
tan :: V n a -> V n a
tan = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
tan
{-# INLINE tan #-}
cos :: V n a -> V n a
cos = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
cos
{-# INLINE cos #-}
asin :: V n a -> V n a
asin = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
asin
{-# INLINE asin #-}
atan :: V n a -> V n a
atan = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
atan
{-# INLINE atan #-}
acos :: V n a -> V n a
acos = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
acos
{-# INLINE acos #-}
sinh :: V n a -> V n a
sinh = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
sinh
{-# INLINE sinh #-}
tanh :: V n a -> V n a
tanh = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
tanh
{-# INLINE tanh #-}
cosh :: V n a -> V n a
cosh = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
cosh
{-# INLINE cosh #-}
asinh :: V n a -> V n a
asinh = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
asinh
{-# INLINE asinh #-}
atanh :: V n a -> V n a
atanh = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
atanh
{-# INLINE atanh #-}
acosh :: V n a -> V n a
acosh = (a -> a) -> V n a -> V n a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap a -> a
forall a. Floating a => a -> a
acosh
{-# INLINE acosh #-}
instance Dim n => Distributive (V n) where
distribute :: f (V n a) -> V n (f a)
distribute f (V n a)
f = Vector (f a) -> V n (f a)
forall k (n :: k) a. Vector a -> V n a
V (Vector (f a) -> V n (f a)) -> Vector (f a) -> V n (f a)
forall a b. (a -> b) -> a -> b
$ Int -> (Int -> f a) -> Vector (f a)
forall a. Int -> (Int -> a) -> Vector a
V.generate (Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)) ((Int -> f a) -> Vector (f a)) -> (Int -> f a) -> Vector (f a)
forall a b. (a -> b) -> a -> b
$ \Int
i -> (V n a -> a) -> f (V n a) -> f a
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
fmap (\(V Vector a
v) -> Vector a -> Int -> a
forall a. Vector a -> Int -> a
V.unsafeIndex Vector a
v Int
i) f (V n a)
f
{-# INLINE distribute #-}
instance Hashable a => Hashable (V n a) where
hashWithSalt :: Int -> V n a -> Int
hashWithSalt Int
s0 (V Vector a
v) =
(Int -> a -> Int) -> Int -> Vector a -> Int
forall a b. (a -> b -> a) -> a -> Vector b -> a
V.foldl' (\Int
s a
a -> Int
s Int -> a -> Int
forall a. Hashable a => Int -> a -> Int
`hashWithSalt` a
a) Int
s0 Vector a
v
Int -> Int -> Int
forall a. Hashable a => Int -> a -> Int
`hashWithSalt` Vector a -> Int
forall a. Vector a -> Int
V.length Vector a
v
#if (MIN_VERSION_hashable(1,2,5))
instance Dim n => Hashable1 (V n) where
liftHashWithSalt :: (Int -> a -> Int) -> Int -> V n a -> Int
liftHashWithSalt Int -> a -> Int
h Int
s0 (V Vector a
v) =
(Int -> a -> Int) -> Int -> Vector a -> Int
forall a b. (a -> b -> a) -> a -> Vector b -> a
V.foldl' (\Int
s a
a -> Int -> a -> Int
h Int
s a
a) Int
s0 Vector a
v
Int -> Int -> Int
forall a. Hashable a => Int -> a -> Int
`hashWithSalt` Vector a -> Int
forall a. Vector a -> Int
V.length Vector a
v
{-# INLINE liftHashWithSalt #-}
#endif
instance (Dim n, Storable a) => Storable (V n a) where
sizeOf :: V n a -> Int
sizeOf V n a
_ = Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n) Int -> Int -> Int
forall a. Num a => a -> a -> a
* a -> Int
forall a. Storable a => a -> Int
sizeOf (a
forall a. HasCallStack => a
undefined:: a)
{-# INLINE sizeOf #-}
alignment :: V n a -> Int
alignment V n a
_ = a -> Int
forall a. Storable a => a -> Int
alignment (a
forall a. HasCallStack => a
undefined :: a)
{-# INLINE alignment #-}
poke :: Ptr (V n a) -> V n a -> IO ()
poke Ptr (V n a)
ptr (V Vector a
xs) = [Int] -> (Int -> IO ()) -> IO ()
forall (t :: * -> *) (m :: * -> *) a b.
(Foldable t, Monad m) =>
t a -> (a -> m b) -> m ()
Foldable.forM_ [Int
0..Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)Int -> Int -> Int
forall a. Num a => a -> a -> a
-Int
1] ((Int -> IO ()) -> IO ()) -> (Int -> IO ()) -> IO ()
forall a b. (a -> b) -> a -> b
$ \Int
i ->
Ptr a -> Int -> a -> IO ()
forall a. Storable a => Ptr a -> Int -> a -> IO ()
pokeElemOff Ptr a
ptr' Int
i (Vector a -> Int -> a
forall a. Vector a -> Int -> a
V.unsafeIndex Vector a
xs Int
i)
where ptr' :: Ptr a
ptr' = Ptr (V n a) -> Ptr a
forall a b. Ptr a -> Ptr b
castPtr Ptr (V n a)
ptr
{-# INLINE poke #-}
peek :: Ptr (V n a) -> IO (V n a)
peek Ptr (V n a)
ptr = Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a) -> IO (Vector a) -> IO (V n a)
forall (f :: * -> *) a b. Functor f => (a -> b) -> f a -> f b
<$> Int -> (Int -> IO a) -> IO (Vector a)
forall (m :: * -> *) a.
Monad m =>
Int -> (Int -> m a) -> m (Vector a)
V.generateM (Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)) (Ptr a -> Int -> IO a
forall a. Storable a => Ptr a -> Int -> IO a
peekElemOff Ptr a
ptr')
where ptr' :: Ptr a
ptr' = Ptr (V n a) -> Ptr a
forall a b. Ptr a -> Ptr b
castPtr Ptr (V n a)
ptr
{-# INLINE peek #-}
instance (Dim n, Epsilon a) => Epsilon (V n a) where
nearZero :: V n a -> Bool
nearZero = a -> Bool
forall a. Epsilon a => a -> Bool
nearZero (a -> Bool) -> (V n a -> a) -> V n a -> Bool
forall b c a. (b -> c) -> (a -> b) -> a -> c
. V n a -> a
forall (f :: * -> *) a. (Metric f, Num a) => f a -> a
quadrance
{-# INLINE nearZero #-}
instance Dim n => Metric (V n) where
dot :: V n a -> V n a -> a
dot (V Vector a
a) (V Vector a
b) = Vector a -> a
forall a. Num a => Vector a -> a
V.sum (Vector a -> a) -> Vector a -> a
forall a b. (a -> b) -> a -> b
$ (a -> a -> a) -> Vector a -> Vector a -> Vector a
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith a -> a -> a
forall a. Num a => a -> a -> a
(*) Vector a
a Vector a
b
{-# INLINE dot #-}
fromVector :: forall n a. Dim n => Vector a -> Maybe (V n a)
fromVector :: Vector a -> Maybe (V n a)
fromVector Vector a
v
| Vector a -> Int
forall a. Vector a -> Int
V.length Vector a
v Int -> Int -> Bool
forall a. Eq a => a -> a -> Bool
== Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n) = V n a -> Maybe (V n a)
forall a. a -> Maybe a
Just (Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V Vector a
v)
| Bool
otherwise = Maybe (V n a)
forall a. Maybe a
Nothing
#if !(MIN_VERSION_reflection(1,3,0)) && defined(MIN_VERSION_template_haskell)
data Z
data D (n :: *)
data SD (n :: *)
data PD (n :: *)
instance Reifies Z Int where
reflect _ = 0
{-# INLINE reflect #-}
retagD :: (Proxy n -> a) -> proxy (D n) -> a
retagD f _ = f Proxy
{-# INLINE retagD #-}
retagSD :: (Proxy n -> a) -> proxy (SD n) -> a
retagSD f _ = f Proxy
{-# INLINE retagSD #-}
retagPD :: (Proxy n -> a) -> proxy (PD n) -> a
retagPD f _ = f Proxy
{-# INLINE retagPD #-}
instance Reifies n Int => Reifies (D n) Int where
reflect = (\n -> n+n) <$> retagD reflect
{-# INLINE reflect #-}
instance Reifies n Int => Reifies (SD n) Int where
reflect = (\n -> n+n+1) <$> retagSD reflect
{-# INLINE reflect #-}
instance Reifies n Int => Reifies (PD n) Int where
reflect = (\n -> n+n-1) <$> retagPD reflect
{-# INLINE reflect #-}
int :: Int -> TypeQ
int n = case quotRem n 2 of
(0, 0) -> conT ''Z
(q,-1) -> conT ''PD `appT` int q
(q, 0) -> conT ''D `appT` int q
(q, 1) -> conT ''SD `appT` int q
_ -> error "ghc is bad at math"
#endif
instance Dim n => Representable (V n) where
type Rep (V n) = Int
tabulate :: (Rep (V n) -> a) -> V n a
tabulate = Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a)
-> ((Int -> a) -> Vector a) -> (Int -> a) -> V n a
forall b c a. (b -> c) -> (a -> b) -> a -> c
. Int -> (Int -> a) -> Vector a
forall a. Int -> (Int -> a) -> Vector a
V.generate (Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n))
{-# INLINE tabulate #-}
index :: V n a -> Rep (V n) -> a
index (V Vector a
xs) Rep (V n)
i = Vector a
xs Vector a -> Int -> a
forall a. Vector a -> Int -> a
V.! Int
Rep (V n)
i
{-# INLINE index #-}
type instance Index (V n a) = Int
type instance IxValue (V n a) = a
instance Ixed (V n a) where
ix :: Index (V n a) -> Traversal' (V n a) (IxValue (V n a))
ix Index (V n a)
i IxValue (V n a) -> f (IxValue (V n a))
f v :: V n a
v@(V Vector a
as)
| Int
Index (V n a)
i Int -> Int -> Bool
forall a. Ord a => a -> a -> Bool
< Int
0 Bool -> Bool -> Bool
|| Int
Index (V n a)
i Int -> Int -> Bool
forall a. Ord a => a -> a -> Bool
>= Vector a -> Int
forall a. Vector a -> Int
V.length Vector a
as = V n a -> f (V n a)
forall (f :: * -> *) a. Applicative f => a -> f a
pure V n a
v
| Bool
otherwise = Int -> (a -> f a) -> V n a -> f (V n a)
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
Index (V n a)
i a -> f a
IxValue (V n a) -> f (IxValue (V n a))
f V n a
v
{-# INLINE ix #-}
instance Dim n => MonadZip (V n) where
mzip :: V n a -> V n b -> V n (a, b)
mzip (V Vector a
as) (V Vector b
bs) = Vector (a, b) -> V n (a, b)
forall k (n :: k) a. Vector a -> V n a
V (Vector (a, b) -> V n (a, b)) -> Vector (a, b) -> V n (a, b)
forall a b. (a -> b) -> a -> b
$ Vector a -> Vector b -> Vector (a, b)
forall a b. Vector a -> Vector b -> Vector (a, b)
V.zip Vector a
as Vector b
bs
mzipWith :: (a -> b -> c) -> V n a -> V n b -> V n c
mzipWith a -> b -> c
f (V Vector a
as) (V Vector b
bs) = Vector c -> V n c
forall k (n :: k) a. Vector a -> V n a
V (Vector c -> V n c) -> Vector c -> V n c
forall a b. (a -> b) -> a -> b
$ (a -> b -> c) -> Vector a -> Vector b -> Vector c
forall a b c. (a -> b -> c) -> Vector a -> Vector b -> Vector c
V.zipWith a -> b -> c
f Vector a
as Vector b
bs
instance Dim n => MonadFix (V n) where
mfix :: (a -> V n a) -> V n a
mfix a -> V n a
f = (Rep (V n) -> a) -> V n a
forall (f :: * -> *) a. Representable f => (Rep f -> a) -> f a
tabulate ((Rep (V n) -> a) -> V n a) -> (Rep (V n) -> a) -> V n a
forall a b. (a -> b) -> a -> b
$ \Rep (V n)
r -> let a :: a
a = V n a -> Rep (V n) -> a
forall (f :: * -> *) a. Representable f => f a -> Rep f -> a
Rep.index (a -> V n a
f a
a) Rep (V n)
r in a
a
instance Each (V n a) (V n b) a b where
each :: (a -> f b) -> V n a -> f (V n b)
each = (a -> f b) -> V n a -> f (V n b)
forall (t :: * -> *) (f :: * -> *) a b.
(Traversable t, Applicative f) =>
(a -> f b) -> t a -> f (t b)
traverse
{-# INLINE each #-}
instance (Bounded a, Dim n) => Bounded (V n a) where
minBound :: V n a
minBound = a -> V n a
forall (f :: * -> *) a. Applicative f => a -> f a
pure a
forall a. Bounded a => a
minBound
{-# INLINE minBound #-}
maxBound :: V n a
maxBound = a -> V n a
forall (f :: * -> *) a. Applicative f => a -> f a
pure a
forall a. Bounded a => a
maxBound
{-# INLINE maxBound #-}
vConstr :: Constr
vConstr :: Constr
vConstr = DataType -> String -> [String] -> Fixity -> Constr
mkConstr DataType
vDataType String
"variadic" [] Fixity
Prefix
{-# NOINLINE vConstr #-}
vDataType :: DataType
vDataType :: DataType
vDataType = String -> [Constr] -> DataType
mkDataType String
"Linear.V.V" [Constr
vConstr]
{-# NOINLINE vDataType #-}
#if __GLASGOW_HASKELL__ >= 708
#define Typeable1 Typeable
#endif
instance (Typeable1 (V n), Typeable (V n a), Dim n, Data a) => Data (V n a) where
gfoldl :: (forall d b. Data d => c (d -> b) -> d -> c b)
-> (forall g. g -> c g) -> V n a -> c (V n a)
gfoldl forall d b. Data d => c (d -> b) -> d -> c b
f forall g. g -> c g
z (V Vector a
as) = ([a] -> V n a) -> c ([a] -> V n a)
forall g. g -> c g
z (Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a) -> ([a] -> Vector a) -> [a] -> V n a
forall b c a. (b -> c) -> (a -> b) -> a -> c
. [a] -> Vector a
forall a. [a] -> Vector a
V.fromList) c ([a] -> V n a) -> [a] -> c (V n a)
forall d b. Data d => c (d -> b) -> d -> c b
`f` Vector a -> [a]
forall a. Vector a -> [a]
V.toList Vector a
as
toConstr :: V n a -> Constr
toConstr V n a
_ = Constr
vConstr
gunfold :: (forall b r. Data b => c (b -> r) -> c r)
-> (forall r. r -> c r) -> Constr -> c (V n a)
gunfold forall b r. Data b => c (b -> r) -> c r
k forall r. r -> c r
z Constr
c = case Constr -> Int
constrIndex Constr
c of
Int
1 -> c ([a] -> V n a) -> c (V n a)
forall b r. Data b => c (b -> r) -> c r
k (([a] -> V n a) -> c ([a] -> V n a)
forall r. r -> c r
z (Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a -> V n a) -> ([a] -> Vector a) -> [a] -> V n a
forall b c a. (b -> c) -> (a -> b) -> a -> c
. [a] -> Vector a
forall a. [a] -> Vector a
V.fromList))
Int
_ -> String -> c (V n a)
forall a. HasCallStack => String -> a
error String
"gunfold"
dataTypeOf :: V n a -> DataType
dataTypeOf V n a
_ = DataType
vDataType
dataCast1 :: (forall d. Data d => c (t d)) -> Maybe (c (V n a))
dataCast1 forall d. Data d => c (t d)
f = c (t a) -> Maybe (c (V n a))
forall k1 k2 (c :: k1 -> *) (t :: k2 -> k1) (t' :: k2 -> k1)
(a :: k2).
(Typeable t, Typeable t') =>
c (t a) -> Maybe (c (t' a))
gcast1 c (t a)
forall d. Data d => c (t d)
f
instance Dim n => Serial1 (V n) where
serializeWith :: (a -> m ()) -> V n a -> m ()
serializeWith = (a -> m ()) -> V n a -> m ()
forall (t :: * -> *) (f :: * -> *) a b.
(Foldable t, Applicative f) =>
(a -> f b) -> t a -> f ()
traverse_
deserializeWith :: m a -> m (V n a)
deserializeWith m a
f = V n (m a) -> m (V n a)
forall (t :: * -> *) (f :: * -> *) a.
(Traversable t, Applicative f) =>
t (f a) -> f (t a)
sequenceA (V n (m a) -> m (V n a)) -> V n (m a) -> m (V n a)
forall a b. (a -> b) -> a -> b
$ m a -> V n (m a)
forall (f :: * -> *) a. Applicative f => a -> f a
pure m a
f
instance (Dim n, Serial a) => Serial (V n a) where
serialize :: V n a -> m ()
serialize = (a -> m ()) -> V n a -> m ()
forall (t :: * -> *) (f :: * -> *) a b.
(Foldable t, Applicative f) =>
(a -> f b) -> t a -> f ()
traverse_ a -> m ()
forall a (m :: * -> *). (Serial a, MonadPut m) => a -> m ()
serialize
deserialize :: m (V n a)
deserialize = V n (m a) -> m (V n a)
forall (t :: * -> *) (f :: * -> *) a.
(Traversable t, Applicative f) =>
t (f a) -> f (t a)
sequenceA (V n (m a) -> m (V n a)) -> V n (m a) -> m (V n a)
forall a b. (a -> b) -> a -> b
$ m a -> V n (m a)
forall (f :: * -> *) a. Applicative f => a -> f a
pure m a
forall a (m :: * -> *). (Serial a, MonadGet m) => m a
deserialize
instance (Dim n, Binary a) => Binary (V n a) where
put :: V n a -> Put
put = (a -> Put) -> V n a -> Put
forall (f :: * -> *) (m :: * -> *) a.
(Serial1 f, MonadPut m) =>
(a -> m ()) -> f a -> m ()
serializeWith a -> Put
forall t. Binary t => t -> Put
Binary.put
get :: Get (V n a)
get = Get a -> Get (V n a)
forall (f :: * -> *) (m :: * -> *) a.
(Serial1 f, MonadGet m) =>
m a -> m (f a)
deserializeWith Get a
forall t. Binary t => Get t
Binary.get
instance (Dim n, Serialize a) => Serialize (V n a) where
put :: Putter (V n a)
put = (a -> PutM ()) -> Putter (V n a)
forall (f :: * -> *) (m :: * -> *) a.
(Serial1 f, MonadPut m) =>
(a -> m ()) -> f a -> m ()
serializeWith a -> PutM ()
forall t. Serialize t => Putter t
Cereal.put
get :: Get (V n a)
get = Get a -> Get (V n a)
forall (f :: * -> *) (m :: * -> *) a.
(Serial1 f, MonadGet m) =>
m a -> m (f a)
deserializeWith Get a
forall t. Serialize t => Get t
Cereal.get
#if (MIN_VERSION_transformers(0,5,0)) || !(MIN_VERSION_transformers(0,4,0))
instance Eq1 (V n) where
liftEq :: (a -> b -> Bool) -> V n a -> V n b -> Bool
liftEq a -> b -> Bool
f0 (V Vector a
as0) (V Vector b
bs0) = (a -> b -> Bool) -> [a] -> [b] -> Bool
forall t t. (t -> t -> Bool) -> [t] -> [t] -> Bool
go a -> b -> Bool
f0 (Vector a -> [a]
forall a. Vector a -> [a]
V.toList Vector a
as0) (Vector b -> [b]
forall a. Vector a -> [a]
V.toList Vector b
bs0) where
go :: (t -> t -> Bool) -> [t] -> [t] -> Bool
go t -> t -> Bool
_ [] [] = Bool
True
go t -> t -> Bool
f (t
a:[t]
as) (t
b:[t]
bs) = t -> t -> Bool
f t
a t
b Bool -> Bool -> Bool
&& (t -> t -> Bool) -> [t] -> [t] -> Bool
go t -> t -> Bool
f [t]
as [t]
bs
go t -> t -> Bool
_ [t]
_ [t]
_ = Bool
False
instance Ord1 (V n) where
liftCompare :: (a -> b -> Ordering) -> V n a -> V n b -> Ordering
liftCompare a -> b -> Ordering
f0 (V Vector a
as0) (V Vector b
bs0) = (a -> b -> Ordering) -> [a] -> [b] -> Ordering
forall t t. (t -> t -> Ordering) -> [t] -> [t] -> Ordering
go a -> b -> Ordering
f0 (Vector a -> [a]
forall a. Vector a -> [a]
V.toList Vector a
as0) (Vector b -> [b]
forall a. Vector a -> [a]
V.toList Vector b
bs0) where
go :: (t -> t -> Ordering) -> [t] -> [t] -> Ordering
go t -> t -> Ordering
f (t
a:[t]
as) (t
b:[t]
bs) = t -> t -> Ordering
f t
a t
b Ordering -> Ordering -> Ordering
forall a. Monoid a => a -> a -> a
`mappend` (t -> t -> Ordering) -> [t] -> [t] -> Ordering
go t -> t -> Ordering
f [t]
as [t]
bs
go t -> t -> Ordering
_ [] [] = Ordering
EQ
go t -> t -> Ordering
_ [t]
_ [] = Ordering
GT
go t -> t -> Ordering
_ [] [t]
_ = Ordering
LT
instance Show1 (V n) where
liftShowsPrec :: (Int -> a -> ShowS) -> ([a] -> ShowS) -> Int -> V n a -> ShowS
liftShowsPrec Int -> a -> ShowS
_ [a] -> ShowS
g Int
d (V Vector a
as) = Bool -> ShowS -> ShowS
showParen (Int
d Int -> Int -> Bool
forall a. Ord a => a -> a -> Bool
> Int
10) (ShowS -> ShowS) -> ShowS -> ShowS
forall a b. (a -> b) -> a -> b
$ String -> ShowS
showString String
"V " ShowS -> ShowS -> ShowS
forall b c a. (b -> c) -> (a -> b) -> a -> c
. [a] -> ShowS
g (Vector a -> [a]
forall a. Vector a -> [a]
V.toList Vector a
as)
instance Dim n => Read1 (V n) where
liftReadsPrec :: (Int -> ReadS a) -> ReadS [a] -> Int -> ReadS (V n a)
liftReadsPrec Int -> ReadS a
_ ReadS [a]
g Int
d = Bool -> ReadS (V n a) -> ReadS (V n a)
forall a. Bool -> ReadS a -> ReadS a
readParen (Int
d Int -> Int -> Bool
forall a. Ord a => a -> a -> Bool
> Int
10) (ReadS (V n a) -> ReadS (V n a)) -> ReadS (V n a) -> ReadS (V n a)
forall a b. (a -> b) -> a -> b
$ \String
r ->
[ (Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V ([a] -> Vector a
forall a. [a] -> Vector a
V.fromList [a]
as), String
r2)
| (String
"V",String
r1) <- ReadS String
lex String
r
, ([a]
as, String
r2) <- ReadS [a]
g String
r1
, [a] -> Int
forall (t :: * -> *) a. Foldable t => t a -> Int
P.length [a]
as Int -> Int -> Bool
forall a. Eq a => a -> a -> Bool
== Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)
]
#else
instance Dim n => Eq1 (V n) where eq1 = (==)
instance Dim n => Ord1 (V n) where compare1 = compare
instance Dim n => Show1 (V n) where showsPrec1 = showsPrec
instance Dim n => Read1 (V n) where readsPrec1 = readsPrec
#endif
data instance U.Vector (V n a) = V_VN {-# UNPACK #-} !Int !(U.Vector a)
data instance U.MVector s (V n a) = MV_VN {-# UNPACK #-} !Int !(U.MVector s a)
instance (Dim n, U.Unbox a) => U.Unbox (V n a)
instance (Dim n, U.Unbox a) => M.MVector U.MVector (V n a) where
{-# INLINE basicLength #-}
{-# INLINE basicUnsafeSlice #-}
{-# INLINE basicOverlaps #-}
{-# INLINE basicUnsafeNew #-}
{-# INLINE basicUnsafeRead #-}
{-# INLINE basicUnsafeWrite #-}
basicLength :: MVector s (V n a) -> Int
basicLength (MV_VN n _) = Int
n
basicUnsafeSlice :: Int -> Int -> MVector s (V n a) -> MVector s (V n a)
basicUnsafeSlice Int
m Int
n (MV_VN _ v) = Int -> MVector s a -> MVector s (V n a)
forall k s (n :: k) a. Int -> MVector s a -> MVector s (V n a)
MV_VN Int
n (Int -> Int -> MVector s a -> MVector s a
forall (v :: * -> * -> *) a s.
MVector v a =>
Int -> Int -> v s a -> v s a
M.basicUnsafeSlice (Int
dInt -> Int -> Int
forall a. Num a => a -> a -> a
*Int
m) (Int
dInt -> Int -> Int
forall a. Num a => a -> a -> a
*Int
n) MVector s a
v)
where d :: Int
d = Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)
basicOverlaps :: MVector s (V n a) -> MVector s (V n a) -> Bool
basicOverlaps (MV_VN _ v) (MV_VN _ u) = MVector s a -> MVector s a -> Bool
forall (v :: * -> * -> *) a s.
MVector v a =>
v s a -> v s a -> Bool
M.basicOverlaps MVector s a
v MVector s a
u
basicUnsafeNew :: Int -> m (MVector (PrimState m) (V n a))
basicUnsafeNew Int
n = (MVector (PrimState m) a -> MVector (PrimState m) (V n a))
-> m (MVector (PrimState m) a) -> m (MVector (PrimState m) (V n a))
forall (m :: * -> *) a1 r. Monad m => (a1 -> r) -> m a1 -> m r
liftM (Int -> MVector (PrimState m) a -> MVector (PrimState m) (V n a)
forall k s (n :: k) a. Int -> MVector s a -> MVector s (V n a)
MV_VN Int
n) (Int -> m (MVector (PrimState m) a)
forall (v :: * -> * -> *) a (m :: * -> *).
(MVector v a, PrimMonad m) =>
Int -> m (v (PrimState m) a)
M.basicUnsafeNew (Int
dInt -> Int -> Int
forall a. Num a => a -> a -> a
*Int
n))
where d :: Int
d = Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)
basicUnsafeRead :: MVector (PrimState m) (V n a) -> Int -> m (V n a)
basicUnsafeRead (MV_VN _ v) Int
i =
(Vector a -> V n a) -> m (Vector a) -> m (V n a)
forall (m :: * -> *) a1 r. Monad m => (a1 -> r) -> m a1 -> m r
liftM Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (m (Vector a) -> m (V n a)) -> m (Vector a) -> m (V n a)
forall a b. (a -> b) -> a -> b
$ Int -> (Int -> m a) -> m (Vector a)
forall (m :: * -> *) a.
Monad m =>
Int -> (Int -> m a) -> m (Vector a)
V.generateM Int
d (\Int
j -> MVector (PrimState m) a -> Int -> m a
forall (v :: * -> * -> *) a (m :: * -> *).
(MVector v a, PrimMonad m) =>
v (PrimState m) a -> Int -> m a
M.basicUnsafeRead MVector (PrimState m) a
v (Int
dInt -> Int -> Int
forall a. Num a => a -> a -> a
*Int
iInt -> Int -> Int
forall a. Num a => a -> a -> a
+Int
j))
where d :: Int
d = Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)
basicUnsafeWrite :: MVector (PrimState m) (V n a) -> Int -> V n a -> m ()
basicUnsafeWrite (MV_VN _ v0) Int
i (V Vector a
vn0) = let d0 :: Int
d0 = Vector a -> Int
forall a. Vector a -> Int
V.length Vector a
vn0 in MVector (PrimState m) a -> Vector a -> Int -> Int -> Int -> m ()
forall (m :: * -> *) (v :: * -> *) a (v :: * -> * -> *).
(Vector v a, PrimMonad m, MVector v a) =>
v (PrimState m) a -> v a -> Int -> Int -> Int -> m ()
go MVector (PrimState m) a
v0 Vector a
vn0 Int
d0 (Int
d0Int -> Int -> Int
forall a. Num a => a -> a -> a
*Int
i) Int
0
where
go :: v (PrimState m) a -> v a -> Int -> Int -> Int -> m ()
go v (PrimState m) a
v v a
vn Int
d Int
o Int
j
| Int
j Int -> Int -> Bool
forall a. Ord a => a -> a -> Bool
>= Int
d = () -> m ()
forall (m :: * -> *) a. Monad m => a -> m a
return ()
| Bool
otherwise = do
a
a <- v a -> Int -> m a
forall (v :: * -> *) a (m :: * -> *).
(Vector v a, Monad m) =>
v a -> Int -> m a
G.basicUnsafeIndexM v a
vn Int
j
v (PrimState m) a -> Int -> a -> m ()
forall (v :: * -> * -> *) a (m :: * -> *).
(MVector v a, PrimMonad m) =>
v (PrimState m) a -> Int -> a -> m ()
M.basicUnsafeWrite v (PrimState m) a
v Int
o a
a
v (PrimState m) a -> v a -> Int -> Int -> Int -> m ()
go v (PrimState m) a
v v a
vn Int
d (Int
oInt -> Int -> Int
forall a. Num a => a -> a -> a
+Int
1) (Int
jInt -> Int -> Int
forall a. Num a => a -> a -> a
+Int
1)
#if MIN_VERSION_vector(0,11,0)
basicInitialize :: MVector (PrimState m) (V n a) -> m ()
basicInitialize (MV_VN _ v) = MVector (PrimState m) a -> m ()
forall (v :: * -> * -> *) a (m :: * -> *).
(MVector v a, PrimMonad m) =>
v (PrimState m) a -> m ()
M.basicInitialize MVector (PrimState m) a
v
{-# INLINE basicInitialize #-}
#endif
instance (Dim n, U.Unbox a) => G.Vector U.Vector (V n a) where
{-# INLINE basicUnsafeFreeze #-}
{-# INLINE basicUnsafeThaw #-}
{-# INLINE basicLength #-}
{-# INLINE basicUnsafeSlice #-}
{-# INLINE basicUnsafeIndexM #-}
basicUnsafeFreeze :: Mutable Vector (PrimState m) (V n a) -> m (Vector (V n a))
basicUnsafeFreeze (MV_VN n v) = (Vector a -> Vector (V n a)) -> m (Vector a) -> m (Vector (V n a))
forall (m :: * -> *) a1 r. Monad m => (a1 -> r) -> m a1 -> m r
liftM ( Int -> Vector a -> Vector (V n a)
forall k (n :: k) a. Int -> Vector a -> Vector (V n a)
V_VN Int
n) (Mutable Vector (PrimState m) a -> m (Vector a)
forall (v :: * -> *) a (m :: * -> *).
(Vector v a, PrimMonad m) =>
Mutable v (PrimState m) a -> m (v a)
G.basicUnsafeFreeze MVector (PrimState m) a
Mutable Vector (PrimState m) a
v)
basicUnsafeThaw :: Vector (V n a) -> m (Mutable Vector (PrimState m) (V n a))
basicUnsafeThaw ( V_VN n v) = (MVector (PrimState m) a -> MVector (PrimState m) (V n a))
-> m (MVector (PrimState m) a) -> m (MVector (PrimState m) (V n a))
forall (m :: * -> *) a1 r. Monad m => (a1 -> r) -> m a1 -> m r
liftM (Int -> MVector (PrimState m) a -> MVector (PrimState m) (V n a)
forall k s (n :: k) a. Int -> MVector s a -> MVector s (V n a)
MV_VN Int
n) (Vector a -> m (Mutable Vector (PrimState m) a)
forall (v :: * -> *) a (m :: * -> *).
(Vector v a, PrimMonad m) =>
v a -> m (Mutable v (PrimState m) a)
G.basicUnsafeThaw Vector a
v)
basicLength :: Vector (V n a) -> Int
basicLength ( V_VN n _) = Int
n
basicUnsafeSlice :: Int -> Int -> Vector (V n a) -> Vector (V n a)
basicUnsafeSlice Int
m Int
n (V_VN _ v) = Int -> Vector a -> Vector (V n a)
forall k (n :: k) a. Int -> Vector a -> Vector (V n a)
V_VN Int
n (Int -> Int -> Vector a -> Vector a
forall (v :: * -> *) a. Vector v a => Int -> Int -> v a -> v a
G.basicUnsafeSlice (Int
dInt -> Int -> Int
forall a. Num a => a -> a -> a
*Int
m) (Int
dInt -> Int -> Int
forall a. Num a => a -> a -> a
*Int
n) Vector a
v)
where d :: Int
d = Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)
basicUnsafeIndexM :: Vector (V n a) -> Int -> m (V n a)
basicUnsafeIndexM (V_VN _ v) Int
i =
(Vector a -> V n a) -> m (Vector a) -> m (V n a)
forall (m :: * -> *) a1 r. Monad m => (a1 -> r) -> m a1 -> m r
liftM Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (m (Vector a) -> m (V n a)) -> m (Vector a) -> m (V n a)
forall a b. (a -> b) -> a -> b
$ Int -> (Int -> m a) -> m (Vector a)
forall (m :: * -> *) a.
Monad m =>
Int -> (Int -> m a) -> m (Vector a)
V.generateM Int
d (\Int
j -> Vector a -> Int -> m a
forall (v :: * -> *) a (m :: * -> *).
(Vector v a, Monad m) =>
v a -> Int -> m a
G.basicUnsafeIndexM Vector a
v (Int
dInt -> Int -> Int
forall a. Num a => a -> a -> a
*Int
iInt -> Int -> Int
forall a. Num a => a -> a -> a
+Int
j))
where d :: Int
d = Proxy n -> Int
forall k (n :: k) (p :: k -> *). Dim n => p n -> Int
reflectDim (Proxy n
forall k (t :: k). Proxy t
Proxy :: Proxy n)
vLens :: Int -> Lens' (V n a) a
vLens :: Int -> Lens' (V n a) a
vLens Int
i = \a -> f a
f (V Vector a
v) -> a -> f a
f (Vector a
v Vector a -> Int -> a
forall a. Vector a -> Int -> a
V.! Int
i) f a -> (a -> V n a) -> f (V n a)
forall (f :: * -> *) a b. Functor f => f a -> (a -> b) -> f b
<&> \a
a -> Vector a -> V n a
forall k (n :: k) a. Vector a -> V n a
V (Vector a
v Vector a -> [(Int, a)] -> Vector a
forall a. Vector a -> [(Int, a)] -> Vector a
V.// [(Int
i, a
a)])
{-# INLINE vLens #-}
#ifdef USE_TYPE_LITS
instance ( 1 <= n) => Field1 (V n a) (V n a) a a where _1 :: (a -> f a) -> V n a -> f (V n a)
_1 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
0
instance ( 2 <= n) => Field2 (V n a) (V n a) a a where _2 :: (a -> f a) -> V n a -> f (V n a)
_2 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
1
instance ( 3 <= n) => Field3 (V n a) (V n a) a a where _3 :: (a -> f a) -> V n a -> f (V n a)
_3 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
2
instance ( 4 <= n) => Field4 (V n a) (V n a) a a where _4 :: (a -> f a) -> V n a -> f (V n a)
_4 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
3
instance ( 5 <= n) => Field5 (V n a) (V n a) a a where _5 :: (a -> f a) -> V n a -> f (V n a)
_5 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
4
instance ( 6 <= n) => Field6 (V n a) (V n a) a a where _6 :: (a -> f a) -> V n a -> f (V n a)
_6 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
5
instance ( 7 <= n) => Field7 (V n a) (V n a) a a where _7 :: (a -> f a) -> V n a -> f (V n a)
_7 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
6
instance ( 8 <= n) => Field8 (V n a) (V n a) a a where _8 :: (a -> f a) -> V n a -> f (V n a)
_8 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
7
instance ( 9 <= n) => Field9 (V n a) (V n a) a a where _9 :: (a -> f a) -> V n a -> f (V n a)
_9 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
8
instance (10 <= n) => Field10 (V n a) (V n a) a a where _10 :: (a -> f a) -> V n a -> f (V n a)
_10 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
9
instance (11 <= n) => Field11 (V n a) (V n a) a a where _11 :: (a -> f a) -> V n a -> f (V n a)
_11 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
10
instance (12 <= n) => Field12 (V n a) (V n a) a a where _12 :: (a -> f a) -> V n a -> f (V n a)
_12 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
11
instance (13 <= n) => Field13 (V n a) (V n a) a a where _13 :: (a -> f a) -> V n a -> f (V n a)
_13 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
12
instance (14 <= n) => Field14 (V n a) (V n a) a a where _14 :: (a -> f a) -> V n a -> f (V n a)
_14 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
13
instance (15 <= n) => Field15 (V n a) (V n a) a a where _15 :: (a -> f a) -> V n a -> f (V n a)
_15 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
14
instance (16 <= n) => Field16 (V n a) (V n a) a a where _16 :: (a -> f a) -> V n a -> f (V n a)
_16 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
15
instance (17 <= n) => Field17 (V n a) (V n a) a a where _17 :: (a -> f a) -> V n a -> f (V n a)
_17 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
16
instance (18 <= n) => Field18 (V n a) (V n a) a a where _18 :: (a -> f a) -> V n a -> f (V n a)
_18 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
17
instance (19 <= n) => Field19 (V n a) (V n a) a a where _19 :: (a -> f a) -> V n a -> f (V n a)
_19 = Int -> Lens (V n a) (V n a) a a
forall k (n :: k) a. Int -> Lens' (V n a) a
vLens Int
18
#endif