module Numeric.Additive.Class
(
Additive(..)
, sum1
, Abelian
, Idempotent
, sinnum1pIdempotent
, Partitionable(..)
) where
import Data.Int
import Data.Word
import Data.Foldable hiding (concat)
import Data.Semigroup.Foldable
import Numeric.Natural
import Prelude ((),Bool(..),($),id,(>>=),fromIntegral,(*),otherwise,quot,maybe,error,even,Maybe(..),(==),(.),($!),Integer,(||),pred)
import qualified Prelude
import Data.List.NonEmpty (NonEmpty(..), fromList)
infixl 6 +
class Additive r where
(+) :: r -> r -> r
sinnum1p :: Natural -> r -> r
sinnum1p y0 x0 = f x0 (1 Prelude.+ y0)
where
f x y
| even y = f (x + x) (y `quot` 2)
| y == 1 = x
| otherwise = g (x + x) (pred y `quot` 2) x
g x y z
| even y = g (x + x) (y `quot` 2) z
| y == 1 = x + z
| otherwise = g (x + x) (pred y `quot` 2) (x + z)
sumWith1 :: Foldable1 f => (a -> r) -> f a -> r
sumWith1 f = maybe (error "Numeric.Additive.Semigroup.sumWith1: empty structure") id . foldl' mf Nothing
where mf Nothing y = Just $! f y
mf (Just x) y = Just $! x + f y
sum1 :: (Foldable1 f, Additive r) => f r -> r
sum1 = sumWith1 id
instance Additive r => Additive (b -> r) where
f + g = \e -> f e + g e
sinnum1p n f e = sinnum1p n (f e)
sumWith1 f xs e = sumWith1 (`f` e) xs
instance Additive Bool where
(+) = (||)
sinnum1p _ a = a
instance Additive Natural where
(+) = (Prelude.+)
sinnum1p n r = (1 Prelude.+ fromIntegral n) * r
instance Additive Integer where
(+) = (Prelude.+)
sinnum1p n r = (1 Prelude.+ fromIntegral n) * r
instance Additive Int where
(+) = (Prelude.+)
sinnum1p n r = fromIntegral (1 Prelude.+ n) * r
instance Additive Int8 where
(+) = (Prelude.+)
sinnum1p n r = fromIntegral (1 Prelude.+ n) * r
instance Additive Int16 where
(+) = (Prelude.+)
sinnum1p n r = fromIntegral (1 Prelude.+ n) * r
instance Additive Int32 where
(+) = (Prelude.+)
sinnum1p n r = fromIntegral (1 Prelude.+ n) * r
instance Additive Int64 where
(+) = (Prelude.+)
sinnum1p n r = fromIntegral (1 Prelude.+ n) * r
instance Additive Word where
(+) = (Prelude.+)
sinnum1p n r = fromIntegral (1 Prelude.+ n) * r
instance Additive Word8 where
(+) = (Prelude.+)
sinnum1p n r = fromIntegral (1 Prelude.+ n) * r
instance Additive Word16 where
(+) = (Prelude.+)
sinnum1p n r = fromIntegral (1 Prelude.+ n) * r
instance Additive Word32 where
(+) = (Prelude.+)
sinnum1p n r = fromIntegral (1 Prelude.+ n) * r
instance Additive Word64 where
(+) = (Prelude.+)
sinnum1p n r = fromIntegral (1 Prelude.+ n) * r
instance Additive () where
_ + _ = ()
sinnum1p _ _ = ()
sumWith1 _ _ = ()
instance (Additive a, Additive b) => Additive (a,b) where
(a,b) + (i,j) = (a + i, b + j)
sinnum1p n (a,b) = (sinnum1p n a, sinnum1p n b)
instance (Additive a, Additive b, Additive c) => Additive (a,b,c) where
(a,b,c) + (i,j,k) = (a + i, b + j, c + k)
sinnum1p n (a,b,c) = (sinnum1p n a, sinnum1p n b, sinnum1p n c)
instance (Additive a, Additive b, Additive c, Additive d) => Additive (a,b,c,d) where
(a,b,c,d) + (i,j,k,l) = (a + i, b + j, c + k, d + l)
sinnum1p n (a,b,c,d) = (sinnum1p n a, sinnum1p n b, sinnum1p n c, sinnum1p n d)
instance (Additive a, Additive b, Additive c, Additive d, Additive e) => Additive (a,b,c,d,e) where
(a,b,c,d,e) + (i,j,k,l,m) = (a + i, b + j, c + k, d + l, e + m)
sinnum1p n (a,b,c,d,e) = (sinnum1p n a, sinnum1p n b, sinnum1p n c, sinnum1p n d, sinnum1p n e)
concat :: NonEmpty (NonEmpty a) -> NonEmpty a
concat m = m >>= id
class Additive m => Partitionable m where
partitionWith :: (m -> m -> r) -> m -> NonEmpty r
instance Partitionable Bool where
partitionWith f False = f False False :| []
partitionWith f True = f False True :| [f True False, f True True]
instance Partitionable Natural where
partitionWith f n = fromList [ f k (n k) | k <- [0..n] ]
instance Partitionable () where
partitionWith f () = f () () :| []
instance (Partitionable a, Partitionable b) => Partitionable (a,b) where
partitionWith f (a,b) = concat $ partitionWith (\ax ay ->
partitionWith (\bx by -> f (ax,bx) (ay,by)) b) a
instance (Partitionable a, Partitionable b, Partitionable c) => Partitionable (a,b,c) where
partitionWith f (a,b,c) = concat $ partitionWith (\ax ay ->
concat $ partitionWith (\bx by ->
partitionWith (\cx cy -> f (ax,bx,cx) (ay,by,cy)) c) b) a
instance (Partitionable a, Partitionable b, Partitionable c,Partitionable d ) => Partitionable (a,b,c,d) where
partitionWith f (a,b,c,d) = concat $ partitionWith (\ax ay ->
concat $ partitionWith (\bx by ->
concat $ partitionWith (\cx cy ->
partitionWith (\dx dy -> f (ax,bx,cx,dx) (ay,by,cy,dy)) d) c) b) a
instance (Partitionable a, Partitionable b, Partitionable c,Partitionable d, Partitionable e) => Partitionable (a,b,c,d,e) where
partitionWith f (a,b,c,d,e) = concat $ partitionWith (\ax ay ->
concat $ partitionWith (\bx by ->
concat $ partitionWith (\cx cy ->
concat $ partitionWith (\dx dy ->
partitionWith (\ex ey -> f (ax,bx,cx,dx,ex) (ay,by,cy,dy,ey)) e) d) c) b) a
class Additive r => Abelian r
instance Abelian r => Abelian (e -> r)
instance Abelian ()
instance Abelian Bool
instance Abelian Integer
instance Abelian Natural
instance Abelian Int
instance Abelian Int8
instance Abelian Int16
instance Abelian Int32
instance Abelian Int64
instance Abelian Word
instance Abelian Word8
instance Abelian Word16
instance Abelian Word32
instance Abelian Word64
instance (Abelian a, Abelian b) => Abelian (a,b)
instance (Abelian a, Abelian b, Abelian c) => Abelian (a,b,c)
instance (Abelian a, Abelian b, Abelian c, Abelian d) => Abelian (a,b,c,d)
instance (Abelian a, Abelian b, Abelian c, Abelian d, Abelian e) => Abelian (a,b,c,d,e)
class Additive r => Idempotent r
sinnum1pIdempotent :: Natural -> r -> r
sinnum1pIdempotent _ r = r
instance Idempotent ()
instance Idempotent Bool
instance Idempotent r => Idempotent (e -> r)
instance (Idempotent a, Idempotent b) => Idempotent (a,b)
instance (Idempotent a, Idempotent b, Idempotent c) => Idempotent (a,b,c)
instance (Idempotent a, Idempotent b, Idempotent c, Idempotent d) => Idempotent (a,b,c,d)
instance (Idempotent a, Idempotent b, Idempotent c, Idempotent d, Idempotent e) => Idempotent (a,b,c,d,e)