{-# LANGUAGE MagicHash, CPP #-} {-| Module : Data.Number.MPFR Description : Pure interface to the MPFR library. Copyright : (c) Aleš Bizjak License : BSD3 Maintainer : mikkonecny@gmail.com Stability : experimental Portability : non-portable This module exports a pure interface to the MPFR library functions. Functions return new 'MPFR' structures instead of modifying existing ones and so all functions which produce a new MPFR structure take one more parameter than their original @C@ counterparts. This parameter, 'Precision', is the precision of the resulting 'MPFR'. This is naturally slower than modifying in-place, especially when dealing with lower precisions, so a \"mutable\" interface is provided in "Data.Number.MPFR.Mutable" module. /Naming conventions/ - functions ending with _ (underscore) usually return a pair @('MPFR', 'Int')@, where 'Int' is a return value of a corresponding @mpfr_@ function. See the MPFR manual for a description of return values. - the same functions without the _ return just the 'MPFR'. - @mpfr_@ prefix in functions is removed - @_ui@ and @ui_@ in function becomes @w@ (stands for 'Word'). For example @mpfr_sub_ui@ becomes @'subw'@ and @mpfr_ui_sub@ becomes 'wsub'. - @si_@ and @_si@ in functions becomes @i@ (stands for 'Int'). For example @mpfr_sub_si@ becomes @'subi'@ and @mpfr_si_sub@ becomes 'isub'. - comparison functions which have @_p@ appended loose it. For example @mpfr_less_p@ becomes @'less'@. /Instances/ [@'Eq'@] - NaN \/= NaN, - Infinity = Infinity, - \-Infinity = -Infinity - otherwise normal comparison [@'Ord'@] - compare NaN _ = 'GT' - compare _ NaN = 'GT' - infinity < _ = 'False' - \-infinity > _ = 'False' - NaN [\<,\>,\>=,<=] _ = 'False' This mimics the behaviour of built in Haskell 'Float' and 'Double'. If you need instances of numeric typeclasses import one of the Data.Number.MPFR.Instances.* modules. -} module Data.Number.MPFR ( RoundMode (Near, Up, Down, Zero), MPFR, Precision(), Exp, MpSize, -- * Assignment functions -- | See <http://www.mpfr.org/mpfr-current/mpfr.html#Assignment-Functions> -- documentation on particular functions. module Data.Number.MPFR.Assignment, -- * Conversion functions -- | See <http://www.mpfr.org/mpfr-current/mpfr.html#Conversion-Functions> -- documentation on particular functions. module Data.Number.MPFR.Conversion, -- * Basic arithmetic functions -- | For documentation on particular functions see -- <http://www.mpfr.org/mpfr-current/mpfr.html#Basic-Arithmetic-Functions>. module Data.Number.MPFR.Arithmetic, -- * Comparison functions -- | For documentation on particular functions see -- <http://www.mpfr.org/mpfr-current/mpfr.html#Comparison-Functions> module Data.Number.MPFR.Comparison, -- * Special functions -- | For documentation on particular functions see -- <http://www.mpfr.org/mpfr-current/mpfr.html#Special-Functions>. module Data.Number.MPFR.Special, -- * Integer related functions -- | For documentation on particular functions see -- <http://www.mpfr.org/mpfr-chttp://www.mpfr.org/mpfr-current/mpfr.html#Integer-Related-Functions> module Data.Number.MPFR.Integer, -- * Miscellaneous functions -- |For documentation on particular functions see -- <http://www.mpfr.org/mpfr-current/mpfr.html#Miscellaneous-Functions>. module Data.Number.MPFR.Misc ) where import Data.Number.MPFR.Assignment import Data.Number.MPFR.Conversion import Data.Number.MPFR.Arithmetic import Data.Number.MPFR.Comparison import Data.Number.MPFR.Special import Data.Number.MPFR.Integer import Data.Number.MPFR.Misc import Data.Number.MPFR.Internal {- #if __GLASGOW_HASKELL__ >= 610 import GHC.Integer.Internals #endif import GHC.Exts instance Num MPFR where d + d' = add Zero (addPrec d d') d d' d - d' = sub Zero (addPrec d d') d d' d * d' = mul Zero (getPrec d + getPrec d') d d' negate d = neg Zero (getPrec d) d abs d = absD Zero (getPrec d) d signum = fromInt Zero minPrec . fromMaybe (-1) . sgn fromInteger (S# i) = fromInt Zero minPrec (I# i) fromInteger i@(J# n _) = fromIntegerA Zero (fromIntegral . abs $ I# n * bitsPerIntegerLimb) i addPrec :: MPFR -> MPFR -> Precision addPrec d1 d2 = fromIntegral (max (p1 + e1 - e3) (p2 + e2 - e3)) + 1 where e1 = if d1 == 0 then 0 else getExp d1 e2 = if d2 == 0 then 0 else getExp d2 p1 = fromIntegral $ getPrec d1 p2 = fromIntegral $ getPrec d2 e3 = min e1 e2 instance Real MPFR where toRational d = n % 2 ^ e where (n', e') = decompose d (n, e) = if e' >= 0 then ((n' * 2 ^ e'), 0) else (n', - e') -}