{-# OPTIONS_GHC -fno-warn-orphans #-} {- The orphan instance could be fixed by making this module mutually recursive with ToRational.hs, but that's not worth the complication. -} module Algebra.ToInteger where import qualified Number.Ratio as Ratio import qualified Algebra.ToRational as ToRational import qualified Algebra.Field as Field import qualified Algebra.PrincipalIdealDomain as PID import qualified Algebra.RealIntegral as RealIntegral import qualified Algebra.Ring as Ring import Number.Ratio (T((:%)), ) import Algebra.Field ((^-), ) import Algebra.Ring ((^), fromInteger, ) import Data.Int (Int, Int8, Int16, Int32, Int64, ) import Data.Word (Word, Word8, Word16, Word32, Word64, ) import qualified Prelude as P import NumericPrelude.Base import Prelude (Integer, Float, Double, ) {- | The two classes 'Algebra.ToInteger.C' and 'Algebra.ToRational.C' exist to allow convenient conversions, primarily between the built-in types. They should satisfy > fromInteger . toInteger === id > toRational . toInteger === toRational Conversions must be lossless, that is, they do not round in any way. For rounding see "Algebra.RealRing". I think that the RealIntegral superclass is too restrictive. Non-negative numbers are not a ring, but can be easily converted to Integers. -} class (ToRational.C a, RealIntegral.C a) => C a where toInteger :: a -> Integer fromIntegral :: (C a, Ring.C b) => a -> b fromIntegral = fromInteger . toInteger -- generated by GenerateRules.hs {-# RULES "NP.fromIntegral :: Integer -> Int" fromIntegral = P.fromIntegral :: Integer -> Int; "NP.fromIntegral :: Integer -> Integer" fromIntegral = P.fromIntegral :: Integer -> Integer; "NP.fromIntegral :: Integer -> Float" fromIntegral = P.fromIntegral :: Integer -> Float; "NP.fromIntegral :: Integer -> Double" fromIntegral = P.fromIntegral :: Integer -> Double; "NP.fromIntegral :: Int -> Int" fromIntegral = P.fromIntegral :: Int -> Int; "NP.fromIntegral :: Int -> Integer" fromIntegral = P.fromIntegral :: Int -> Integer; "NP.fromIntegral :: Int -> Float" fromIntegral = P.fromIntegral :: Int -> Float; "NP.fromIntegral :: Int -> Double" fromIntegral = P.fromIntegral :: Int -> Double; "NP.fromIntegral :: Int8 -> Int" fromIntegral = P.fromIntegral :: Int8 -> Int; "NP.fromIntegral :: Int8 -> Integer" fromIntegral = P.fromIntegral :: Int8 -> Integer; "NP.fromIntegral :: Int8 -> Float" fromIntegral = P.fromIntegral :: Int8 -> Float; "NP.fromIntegral :: Int8 -> Double" fromIntegral = P.fromIntegral :: Int8 -> Double; "NP.fromIntegral :: Int16 -> Int" fromIntegral = P.fromIntegral :: Int16 -> Int; "NP.fromIntegral :: Int16 -> Integer" fromIntegral = P.fromIntegral :: Int16 -> Integer; "NP.fromIntegral :: Int16 -> Float" fromIntegral = P.fromIntegral :: Int16 -> Float; "NP.fromIntegral :: Int16 -> Double" fromIntegral = P.fromIntegral :: Int16 -> Double; "NP.fromIntegral :: Int32 -> Int" fromIntegral = P.fromIntegral :: Int32 -> Int; "NP.fromIntegral :: Int32 -> Integer" fromIntegral = P.fromIntegral :: Int32 -> Integer; "NP.fromIntegral :: Int32 -> Float" fromIntegral = P.fromIntegral :: Int32 -> Float; "NP.fromIntegral :: Int32 -> Double" fromIntegral = P.fromIntegral :: Int32 -> Double; "NP.fromIntegral :: Int64 -> Int" fromIntegral = P.fromIntegral :: Int64 -> Int; "NP.fromIntegral :: Int64 -> Integer" fromIntegral = P.fromIntegral :: Int64 -> Integer; "NP.fromIntegral :: Int64 -> Float" fromIntegral = P.fromIntegral :: Int64 -> Float; "NP.fromIntegral :: Int64 -> Double" fromIntegral = P.fromIntegral :: Int64 -> Double; "NP.fromIntegral :: Word -> Int" fromIntegral = P.fromIntegral :: Word -> Int; "NP.fromIntegral :: Word -> Integer" fromIntegral = P.fromIntegral :: Word -> Integer; "NP.fromIntegral :: Word -> Float" fromIntegral = P.fromIntegral :: Word -> Float; "NP.fromIntegral :: Word -> Double" fromIntegral = P.fromIntegral :: Word -> Double; "NP.fromIntegral :: Word8 -> Int" fromIntegral = P.fromIntegral :: Word8 -> Int; "NP.fromIntegral :: Word8 -> Integer" fromIntegral = P.fromIntegral :: Word8 -> Integer; "NP.fromIntegral :: Word8 -> Float" fromIntegral = P.fromIntegral :: Word8 -> Float; "NP.fromIntegral :: Word8 -> Double" fromIntegral = P.fromIntegral :: Word8 -> Double; "NP.fromIntegral :: Word16 -> Int" fromIntegral = P.fromIntegral :: Word16 -> Int; "NP.fromIntegral :: Word16 -> Integer" fromIntegral = P.fromIntegral :: Word16 -> Integer; "NP.fromIntegral :: Word16 -> Float" fromIntegral = P.fromIntegral :: Word16 -> Float; "NP.fromIntegral :: Word16 -> Double" fromIntegral = P.fromIntegral :: Word16 -> Double; "NP.fromIntegral :: Word32 -> Int" fromIntegral = P.fromIntegral :: Word32 -> Int; "NP.fromIntegral :: Word32 -> Integer" fromIntegral = P.fromIntegral :: Word32 -> Integer; "NP.fromIntegral :: Word32 -> Float" fromIntegral = P.fromIntegral :: Word32 -> Float; "NP.fromIntegral :: Word32 -> Double" fromIntegral = P.fromIntegral :: Word32 -> Double; "NP.fromIntegral :: Word64 -> Int" fromIntegral = P.fromIntegral :: Word64 -> Int; "NP.fromIntegral :: Word64 -> Integer" fromIntegral = P.fromIntegral :: Word64 -> Integer; "NP.fromIntegral :: Word64 -> Float" fromIntegral = P.fromIntegral :: Word64 -> Float; "NP.fromIntegral :: Word64 -> Double" fromIntegral = P.fromIntegral :: Word64 -> Double; #-} instance C Integer where {-#INLINE toInteger #-}; toInteger = id instance C Int where {-#INLINE toInteger #-}; toInteger = P.toInteger instance C Int8 where {-#INLINE toInteger #-}; toInteger = P.toInteger instance C Int16 where {-#INLINE toInteger #-}; toInteger = P.toInteger instance C Int32 where {-#INLINE toInteger #-}; toInteger = P.toInteger instance C Int64 where {-#INLINE toInteger #-}; toInteger = P.toInteger instance C Word where {-#INLINE toInteger #-}; toInteger = P.toInteger instance C Word8 where {-#INLINE toInteger #-}; toInteger = P.toInteger instance C Word16 where {-#INLINE toInteger #-}; toInteger = P.toInteger instance C Word32 where {-#INLINE toInteger #-}; toInteger = P.toInteger instance C Word64 where {-#INLINE toInteger #-}; toInteger = P.toInteger instance (C a, PID.C a) => ToRational.C (Ratio.T a) where toRational (x:%y) = toInteger x :% toInteger y {-| A prefix function of '(Algebra.Ring.^)' with a parameter order that fits the needs of partial application and function composition. It has generalised exponent. See: Argument order of @expNat@ on -} ringPower :: (Ring.C a, C b) => b -> a -> a ringPower exponent basis = basis ^ toInteger exponent {- | A prefix function of '(Algebra.Field.^-)'. It has a generalised exponent. -} fieldPower :: (Field.C a, C b) => b -> a -> a fieldPower exponent basis = basis ^- toInteger exponent