{-# LANGUAGE Trustworthy #-}
{-# LANGUAGE DeriveDataTypeable #-}
{-# LANGUAGE StandaloneDeriving #-}

-----------------------------------------------------------------------------
-- |
-- Module      :  Data.Complex
-- Copyright   :  (c) The University of Glasgow 2001
-- License     :  BSD-style (see the file libraries/base/LICENSE)
-- 
-- Maintainer  :  libraries@haskell.org
-- Stability   :  provisional
-- Portability :  portable
--
-- Complex numbers.
--
-----------------------------------------------------------------------------

module Data.Complex
        (
        -- * Rectangular form
          Complex((:+))

        , realPart
        , imagPart
        -- * Polar form
        , mkPolar
        , cis
        , polar
        , magnitude
        , phase
        -- * Conjugate
        , conjugate

        )  where

import Prelude

import Data.Typeable
import Data.Data (Data)

infix  6  :+

-- -----------------------------------------------------------------------------
-- The Complex type

-- | Complex numbers are an algebraic type.
--
-- For a complex number @z@, @'abs' z@ is a number with the magnitude of @z@,
-- but oriented in the positive real direction, whereas @'signum' z@
-- has the phase of @z@, but unit magnitude.
data Complex a
  = !a :+ !a    -- ^ forms a complex number from its real and imaginary
                -- rectangular components.
        deriving (Eq, Show, Read, Data, Typeable)

-- -----------------------------------------------------------------------------
-- Functions over Complex

-- | Extracts the real part of a complex number.
realPart :: (RealFloat a) => Complex a -> a
realPart (x :+ _) =  x

-- | Extracts the imaginary part of a complex number.
imagPart :: (RealFloat a) => Complex a -> a
imagPart (_ :+ y) =  y

-- | The conjugate of a complex number.
{-# SPECIALISE conjugate :: Complex Double -> Complex Double #-}
conjugate        :: (RealFloat a) => Complex a -> Complex a
conjugate (x:+y) =  x :+ (-y)

-- | Form a complex number from polar components of magnitude and phase.
{-# SPECIALISE mkPolar :: Double -> Double -> Complex Double #-}
mkPolar          :: (RealFloat a) => a -> a -> Complex a
mkPolar r theta  =  r * cos theta :+ r * sin theta

-- | @'cis' t@ is a complex value with magnitude @1@
-- and phase @t@ (modulo @2*'pi'@).
{-# SPECIALISE cis :: Double -> Complex Double #-}
cis              :: (RealFloat a) => a -> Complex a
cis theta        =  cos theta :+ sin theta

-- | The function 'polar' takes a complex number and
-- returns a (magnitude, phase) pair in canonical form:
-- the magnitude is nonnegative, and the phase in the range @(-'pi', 'pi']@;
-- if the magnitude is zero, then so is the phase.
{-# SPECIALISE polar :: Complex Double -> (Double,Double) #-}
polar            :: (RealFloat a) => Complex a -> (a,a)
polar z          =  (magnitude z, phase z)

-- | The nonnegative magnitude of a complex number.
{-# SPECIALISE magnitude :: Complex Double -> Double #-}
magnitude :: (RealFloat a) => Complex a -> a
magnitude (x:+y) =  scaleFloat k
                     (sqrt (sqr (scaleFloat mk x) + sqr (scaleFloat mk y)))
                    where k  = max (exponent x) (exponent y)
                          mk = - k
                          sqr z = z * z

-- | The phase of a complex number, in the range @(-'pi', 'pi']@.
-- If the magnitude is zero, then so is the phase.
{-# SPECIALISE phase :: Complex Double -> Double #-}
phase :: (RealFloat a) => Complex a -> a
phase (0 :+ 0)   = 0            -- SLPJ July 97 from John Peterson
phase (x:+y)     = atan2 y x


-- -----------------------------------------------------------------------------
-- Instances of Complex

instance  (RealFloat a) => Num (Complex a)  where
    {-# SPECIALISE instance Num (Complex Float) #-}
    {-# SPECIALISE instance Num (Complex Double) #-}
    (x:+y) + (x':+y')   =  (x+x') :+ (y+y')
    (x:+y) - (x':+y')   =  (x-x') :+ (y-y')
    (x:+y) * (x':+y')   =  (x*x'-y*y') :+ (x*y'+y*x')
    negate (x:+y)       =  negate x :+ negate y
    abs z               =  magnitude z :+ 0
    signum (0:+0)       =  0
    signum z@(x:+y)     =  x/r :+ y/r  where r = magnitude z
    fromInteger n       =  fromInteger n :+ 0

instance  (RealFloat a) => Fractional (Complex a)  where
    {-# SPECIALISE instance Fractional (Complex Float) #-}
    {-# SPECIALISE instance Fractional (Complex Double) #-}
    (x:+y) / (x':+y')   =  (x*x''+y*y'') / d :+ (y*x''-x*y'') / d
                           where x'' = scaleFloat k x'
                                 y'' = scaleFloat k y'
                                 k   = - max (exponent x') (exponent y')
                                 d   = x'*x'' + y'*y''

    fromRational a      =  fromRational a :+ 0

instance  (RealFloat a) => Floating (Complex a) where
    {-# SPECIALISE instance Floating (Complex Float) #-}
    {-# SPECIALISE instance Floating (Complex Double) #-}
    pi             =  pi :+ 0
    exp (x:+y)     =  expx * cos y :+ expx * sin y
                      where expx = exp x
    log z          =  log (magnitude z) :+ phase z

    sqrt (0:+0)    =  0
    sqrt z@(x:+y)  =  u :+ (if y < 0 then -v else v)
                      where (u,v) = if x < 0 then (v',u') else (u',v')
                            v'    = abs y / (u'*2)
                            u'    = sqrt ((magnitude z + abs x) / 2)

    sin (x:+y)     =  sin x * cosh y :+ cos x * sinh y
    cos (x:+y)     =  cos x * cosh y :+ (- sin x * sinh y)
    tan (x:+y)     =  (sinx*coshy:+cosx*sinhy)/(cosx*coshy:+(-sinx*sinhy))
                      where sinx  = sin x
                            cosx  = cos x
                            sinhy = sinh y
                            coshy = cosh y

    sinh (x:+y)    =  cos y * sinh x :+ sin  y * cosh x
    cosh (x:+y)    =  cos y * cosh x :+ sin y * sinh x
    tanh (x:+y)    =  (cosy*sinhx:+siny*coshx)/(cosy*coshx:+siny*sinhx)
                      where siny  = sin y
                            cosy  = cos y
                            sinhx = sinh x
                            coshx = cosh x

    asin z@(x:+y)  =  y':+(-x')
                      where  (x':+y') = log (((-y):+x) + sqrt (1 - z*z))
    acos z         =  y'':+(-x'')
                      where (x'':+y'') = log (z + ((-y'):+x'))
                            (x':+y')   = sqrt (1 - z*z)
    atan z@(x:+y)  =  y':+(-x')
                      where (x':+y') = log (((1-y):+x) / sqrt (1+z*z))

    asinh z        =  log (z + sqrt (1+z*z))
    acosh z        =  log (z + (z+1) * sqrt ((z-1)/(z+1)))
    atanh z        =  0.5 * log ((1.0+z) / (1.0-z))