----------------------------------------------------------------------------- -- | -- Module : Data.SBV.BitVectors.PrettyNum -- Copyright : (c) Levent Erkok -- License : BSD3 -- Maintainer : erkokl@gmail.com -- Stability : experimental -- -- Number representations in hex/bin ----------------------------------------------------------------------------- {-# LANGUAGE ScopedTypeVariables #-} {-# LANGUAGE TypeSynonymInstances #-} module Data.SBV.BitVectors.PrettyNum ( PrettyNum(..), readBin, shex, shexI, sbin, sbinI , showCFloat, showCDouble, showHFloat, showHDouble , showSMTFloat, showSMTDouble, smtRoundingMode, cwToSMTLib, mkSkolemZero ) where import Data.Char (ord, intToDigit) import Data.Int (Int8, Int16, Int32, Int64) import Data.List (isPrefixOf) import Data.Maybe (fromJust, fromMaybe, listToMaybe) import Data.Ratio (numerator, denominator) import Data.Word (Word8, Word16, Word32, Word64) import Numeric (showIntAtBase, showHex, readInt) import Data.Numbers.CrackNum (floatToFP, doubleToFP) import Data.SBV.BitVectors.Data import Data.SBV.BitVectors.AlgReals (algRealToSMTLib2) -- | PrettyNum class captures printing of numbers in hex and binary formats; also supporting negative numbers. -- -- Minimal complete definition: 'hexS' and 'binS' class PrettyNum a where -- | Show a number in hexadecimal (starting with @0x@ and type.) hexS :: a -> String -- | Show a number in binary (starting with @0b@ and type.) binS :: a -> String -- | Show a number in hex, without prefix, or types. hex :: a -> String -- | Show a number in bin, without prefix, or types. bin :: a -> String -- Why not default methods? Because defaults need "Integral a" but Bool is not.. instance PrettyNum Bool where {hexS = show; binS = show; hex = show; bin = show} instance PrettyNum Word8 where {hexS = shex True True (False,8) ; binS = sbin True True (False,8) ; hex = shex False False (False,8) ; bin = sbin False False (False,8) ;} instance PrettyNum Int8 where {hexS = shex True True (True,8) ; binS = sbin True True (True,8) ; hex = shex False False (True,8) ; bin = sbin False False (True,8) ;} instance PrettyNum Word16 where {hexS = shex True True (False,16); binS = sbin True True (False,16); hex = shex False False (False,16); bin = sbin False False (False,16);} instance PrettyNum Int16 where {hexS = shex True True (True,16); binS = sbin True True (True,16) ; hex = shex False False (True,16); bin = sbin False False (True,16) ;} instance PrettyNum Word32 where {hexS = shex True True (False,32); binS = sbin True True (False,32); hex = shex False False (False,32); bin = sbin False False (False,32);} instance PrettyNum Int32 where {hexS = shex True True (True,32); binS = sbin True True (True,32) ; hex = shex False False (True,32); bin = sbin False False (True,32) ;} instance PrettyNum Word64 where {hexS = shex True True (False,64); binS = sbin True True (False,64); hex = shex False False (False,64); bin = sbin False False (False,64);} instance PrettyNum Int64 where {hexS = shex True True (True,64); binS = sbin True True (True,64) ; hex = shex False False (True,64); bin = sbin False False (True,64) ;} instance PrettyNum Integer where {hexS = shexI True True; binS = sbinI True True; hex = shexI False False; bin = sbinI False False;} instance PrettyNum CW where hexS cw | isUninterpreted cw = show cw ++ " :: " ++ show (kindOf cw) | isBoolean cw = hexS (cwToBool cw) ++ " :: Bool" | isFloat cw = let CWFloat f = cwVal cw in show f ++ " :: Float\n" ++ show (floatToFP f) | isDouble cw = let CWDouble d = cwVal cw in show d ++ " :: Double\n" ++ show (doubleToFP d) | isReal cw = let CWAlgReal w = cwVal cw in show w ++ " :: Real" | not (isBounded cw) = let CWInteger w = cwVal cw in shexI True True w | True = let CWInteger w = cwVal cw in shex True True (hasSign cw, intSizeOf cw) w binS cw | isUninterpreted cw = show cw ++ " :: " ++ show (kindOf cw) | isBoolean cw = binS (cwToBool cw) ++ " :: Bool" | isFloat cw = let CWFloat f = cwVal cw in show f ++ " :: Float\n" ++ show (floatToFP f) | isDouble cw = let CWDouble d = cwVal cw in show d ++ " :: Double\n" ++ show (doubleToFP d) | isReal cw = let CWAlgReal w = cwVal cw in show w ++ " :: Real" | not (isBounded cw) = let CWInteger w = cwVal cw in sbinI True True w | True = let CWInteger w = cwVal cw in sbin True True (hasSign cw, intSizeOf cw) w hex cw | isUninterpreted cw = show cw | isBoolean cw = hexS (cwToBool cw) ++ " :: Bool" | isFloat cw = let CWFloat f = cwVal cw in show f | isDouble cw = let CWDouble d = cwVal cw in show d | isReal cw = let CWAlgReal w = cwVal cw in show w | not (isBounded cw) = let CWInteger w = cwVal cw in shexI False False w | True = let CWInteger w = cwVal cw in shex False False (hasSign cw, intSizeOf cw) w bin cw | isUninterpreted cw = show cw | isBoolean cw = binS (cwToBool cw) ++ " :: Bool" | isFloat cw = let CWFloat f = cwVal cw in show f | isDouble cw = let CWDouble d = cwVal cw in show d | isReal cw = let CWAlgReal w = cwVal cw in show w | not (isBounded cw) = let CWInteger w = cwVal cw in sbinI False False w | True = let CWInteger w = cwVal cw in sbin False False (hasSign cw, intSizeOf cw) w instance (SymWord a, PrettyNum a) => PrettyNum (SBV a) where hexS s = maybe (show s) (hexS :: a -> String) $ unliteral s binS s = maybe (show s) (binS :: a -> String) $ unliteral s hex s = maybe (show s) (hex :: a -> String) $ unliteral s bin s = maybe (show s) (bin :: a -> String) $ unliteral s -- | Show as a hexadecimal value. First bool controls whether type info is printed -- while the second boolean controls wether 0x prefix is printed. The tuple is -- the signedness and the bit-length of the input. The length of the string -- will /not/ depend on the value, but rather the bit-length. shex :: (Show a, Integral a) => Bool -> Bool -> (Bool, Int) -> a -> String shex shType shPre (signed, size) a | a < 0 = "-" ++ pre ++ pad l (s16 (abs (fromIntegral a :: Integer))) ++ t | True = pre ++ pad l (s16 a) ++ t where t | shType = " :: " ++ (if signed then "Int" else "Word") ++ show size | True = "" pre | shPre = "0x" | True = "" l = (size + 3) `div` 4 -- | Show as a hexadecimal value, integer version. Almost the same as shex above -- except we don't have a bit-length so the length of the string will depend -- on the actual value. shexI :: Bool -> Bool -> Integer -> String shexI shType shPre a | a < 0 = "-" ++ pre ++ s16 (abs a) ++ t | True = pre ++ s16 a ++ t where t | shType = " :: Integer" | True = "" pre | shPre = "0x" | True = "" -- | Similar to 'shex'; except in binary. sbin :: (Show a, Integral a) => Bool -> Bool -> (Bool, Int) -> a -> String sbin shType shPre (signed,size) a | a < 0 = "-" ++ pre ++ pad size (s2 (abs (fromIntegral a :: Integer))) ++ t | True = pre ++ pad size (s2 a) ++ t where t | shType = " :: " ++ (if signed then "Int" else "Word") ++ show size | True = "" pre | shPre = "0b" | True = "" -- | Similar to 'shexI'; except in binary. sbinI :: Bool -> Bool -> Integer -> String sbinI shType shPre a | a < 0 = "-" ++ pre ++ s2 (abs a) ++ t | True = pre ++ s2 a ++ t where t | shType = " :: Integer" | True = "" pre | shPre = "0b" | True = "" -- | Pad a string to a given length. If the string is longer, then we don't drop anything. pad :: Int -> String -> String pad l s = replicate (l - length s) '0' ++ s -- | Binary printer s2 :: (Show a, Integral a) => a -> String s2 v = showIntAtBase 2 dig v "" where dig = fromJust . flip lookup [(0, '0'), (1, '1')] -- | Hex printer s16 :: (Show a, Integral a) => a -> String s16 v = showHex v "" -- | A more convenient interface for reading binary numbers, also supports negative numbers readBin :: Num a => String -> a readBin ('-':s) = -(readBin s) readBin s = case readInt 2 isDigit cvt s' of [(a, "")] -> a _ -> error $ "SBV.readBin: Cannot read a binary number from: " ++ show s where cvt c = ord c - ord '0' isDigit = (`elem` "01") s' | "0b" `isPrefixOf` s = drop 2 s | True = s -- | A version of show for floats that generates correct C literals for nan/infinite. NB. Requires "math.h" to be included. showCFloat :: Float -> String showCFloat f | isNaN f = "((float) NAN)" | isInfinite f, f < 0 = "((float) (-INFINITY))" | isInfinite f = "((float) INFINITY)" | True = show f ++ "F" -- | A version of show for doubles that generates correct C literals for nan/infinite. NB. Requires "math.h" to be included. showCDouble :: Double -> String showCDouble f | isNaN f = "((double) NAN)" | isInfinite f, f < 0 = "((double) (-INFINITY))" | isInfinite f = "((double) INFINITY)" | True = show f -- | A version of show for floats that generates correct Haskell literals for nan/infinite showHFloat :: Float -> String showHFloat f | isNaN f = "((0/0) :: Float)" | isInfinite f, f < 0 = "((-1/0) :: Float)" | isInfinite f = "((1/0) :: Float)" | True = show f -- | A version of show for doubles that generates correct Haskell literals for nan/infinite showHDouble :: Double -> String showHDouble d | isNaN d = "((0/0) :: Double)" | isInfinite d, d < 0 = "((-1/0) :: Double)" | isInfinite d = "((1/0) :: Double)" | True = show d -- | A version of show for floats that generates correct SMTLib literals using the rounding mode showSMTFloat :: RoundingMode -> Float -> String showSMTFloat rm f | isNaN f = as "NaN" | isInfinite f, f < 0 = as "-oo" | isInfinite f = as "+oo" | isNegativeZero f = as "-zero" | f == 0 = as "+zero" | True = "((_ to_fp 8 24) " ++ smtRoundingMode rm ++ " " ++ toSMTLibRational (toRational f) ++ ")" where as s = "(_ " ++ s ++ " 8 24)" -- | A version of show for doubles that generates correct SMTLib literals using the rounding mode showSMTDouble :: RoundingMode -> Double -> String showSMTDouble rm d | isNaN d = as "NaN" | isInfinite d, d < 0 = as "-oo" | isInfinite d = as "+oo" | isNegativeZero d = as "-zero" | d == 0 = as "+zero" | True = "((_ to_fp 11 53) " ++ smtRoundingMode rm ++ " " ++ toSMTLibRational (toRational d) ++ ")" where as s = "(_ " ++ s ++ " 11 53)" -- | Show a rational in SMTLib format toSMTLibRational :: Rational -> String toSMTLibRational r | n < 0 = "(- (/ " ++ show (abs n) ++ " " ++ show d ++ "))" | True = "(/ " ++ show n ++ " " ++ show d ++ ")" where n = numerator r d = denominator r -- | Convert a rounding mode to the format SMT-Lib2 understands. smtRoundingMode :: RoundingMode -> String smtRoundingMode RoundNearestTiesToEven = "roundNearestTiesToEven" smtRoundingMode RoundNearestTiesToAway = "roundNearestTiesToAway" smtRoundingMode RoundTowardPositive = "roundTowardPositive" smtRoundingMode RoundTowardNegative = "roundTowardNegative" smtRoundingMode RoundTowardZero = "roundTowardZero" -- | Convert a CW to an SMTLib2 compliant value cwToSMTLib :: RoundingMode -> CW -> String cwToSMTLib rm x | isBoolean x, CWInteger w <- cwVal x = if w == 0 then "false" else "true" | isUninterpreted x, CWUserSort (_, s) <- cwVal x = roundModeConvert s | isReal x, CWAlgReal r <- cwVal x = algRealToSMTLib2 r | isFloat x, CWFloat f <- cwVal x = showSMTFloat rm f | isDouble x, CWDouble d <- cwVal x = showSMTDouble rm d | not (isBounded x), CWInteger w <- cwVal x = if w >= 0 then show w else "(- " ++ show (abs w) ++ ")" | not (hasSign x) , CWInteger w <- cwVal x = smtLibHex (intSizeOf x) w -- signed numbers (with 2's complement representation) is problematic -- since there's no way to put a bvneg over a positive number to get minBound.. -- Hence, we punt and use binary notation in that particular case | hasSign x , CWInteger w <- cwVal x = if w == negate (2 ^ intSizeOf x) then mkMinBound (intSizeOf x) else negIf (w < 0) $ smtLibHex (intSizeOf x) (abs w) | True = error $ "SBV.cvtCW: Impossible happened: Kind/Value disagreement on: " ++ show (kindOf x, x) where roundModeConvert s = fromMaybe s (listToMaybe [smtRoundingMode m | m <- [minBound .. maxBound] :: [RoundingMode], show m == s]) -- Carefully code hex numbers, SMTLib is picky about lengths of hex constants. For the time -- being, SBV only supports sizes that are multiples of 4, but the below code is more robust -- in case of future extensions to support arbitrary sizes. smtLibHex :: Int -> Integer -> String smtLibHex 1 v = "#b" ++ show v smtLibHex sz v | sz `mod` 4 == 0 = "#x" ++ pad (sz `div` 4) (showHex v "") | True = "#b" ++ pad sz (showBin v "") where showBin = showIntAtBase 2 intToDigit negIf :: Bool -> String -> String negIf True a = "(bvneg " ++ a ++ ")" negIf False a = a -- anamoly at the 2's complement min value! Have to use binary notation here -- as there is no positive value we can provide to make the bvneg work.. (see above) mkMinBound :: Int -> String mkMinBound i = "#b1" ++ replicate (i-1) '0' -- | Create a skolem 0 for the kind mkSkolemZero :: RoundingMode -> Kind -> String mkSkolemZero _ (KUserSort _ (Right (f:_))) = f mkSkolemZero _ (KUserSort s _) = error $ "SBV.mkSkolemZero: Unexpected uninterpreted sort: " ++ s mkSkolemZero rm k = cwToSMTLib rm (mkConstCW k (0::Integer))