grab bag of interesting stuff. topics higher kinded types files and handles ioerror arrays
Post on 19-Dec-2015
220 views
TRANSCRIPT
Grab Bag of Interesting Stuff
Topics
• Higher kinded types• Files and handles• IOError• Arrays
Higher Order types• Type constructors are higher order since they take types as
input and return types as output.• Some type constructors (and also some class definitions) are
even higher order, since they take type constructors as arguments.
• Haskell’s Kind system– A Kind is haskell’s way of “typing” types– Ordinary types have kind *
• Int :: *• [ String ] :: *
– Type constructors have kind * -> *• Tree :: * -> *• [] :: * -> *• (,) :: * -> * -> *
The Functor Classclass Functor f where fmap :: (a -> b) -> (f a -> f b)
• Note how the class Functor requires a type constructor of kind * -> * as an argument.
• The method fmap abstracts the operation of applying a function on every parametric Argument.
a a aType T a =
x x x
(f x) (f x) (f x)
fmap f
Notes
• Special syntax for built in type constructors
(->) :: * -> * -> *[] :: * -> *(,) :: * -> * -> *(,,) :: * -> * -> * -> *
• Most class definitions have some implicit laws that all instances should obey. The laws for Functor are:
fmap id = idfmap (f . g) = fmap f . fmap g
Instances of class functordata Tree a = Leaf a | Branch (Tree a) (Tree a)
instance Functor Tree where fmap f (Leaf x) = Leaf (f x) fmap f (Branch x y) = Branch (fmap f x) (fmap f y)
instance Functor ((,) c) where fmap f (x,y) = (x, f y)
More Instances
instance Functor [] where fmap f [] = [] fmap f (x:xs) = f x : fmap f xs
instance Functor Maybe where fmap f Nothing = Nothing fmap f (Just x) = Just (f x)
Other uses of Higher order T.C.’s
data Tree t a = Tip a | Node (t (Tree t a))
t1 = Node [Tip 3, Tip 0]Main> :t t1t1 :: Tree [] Int
data Bin x = Two x x
t2 = Node (Two(Tip 5) (Tip 21))Main> :t t2t2 :: Tree Bin Int
What is the kind of Tree?
• Tree is a binary type constructor– It’s kind will be something like: ? -> ? -> *
• The first argument to Tree is itself a type constructor, the second is just an ordinary type.
– Tree :: (* -> *)-> * -> *
Functor instances of Treeinstance Functor (Tree2 Bin) where fmap f (Tip x) = Tip(f x) fmap f (Node (Two x y)) = Node (Two (fmap f x) (fmap f y))
instance Functor (Tree2 []) where fmap f (Tip x) = Tip(f x) fmap f (Node xs) = Node (map (fmap f) xs)
Can we do betterinstance Functor t => Functor (Tree2 t) where fmap f (Tip x) = Tip(f x) fmap f (Node xs) = Node (fmap (fmap f) xs)
The Monad Classclass Monad m where (>>=) :: m a -> (a -> m b) -> m b (>>) :: m a -> m b -> m b return :: a -> m a fail :: String -> m a
p >> q = p >>= \ _ -> q fail s = error s
Note m is atype constructor
Generic Monad functionssequence :: Monad m => [m a] -> m [a] sequence = foldr mcons (return []) where mcons p q = do x <- p xs <- q return (x:xs)
sequence_ :: Monad m => [m a] -> m () sequence_ = foldr (>>) (return ())
mapM :: Monad m => (a -> m b) -> [a] -> m [b]mapM f as = sequence (map f as)
mapM_ :: Monad m => (a -> m b) -> [a] -> m ()mapM_ f as = sequence_ (map f as)
(=<<) :: Monad m => (a -> m b) -> m a -> m bf =<< x = x >>= f
Files and Handles• The functions:
import System.IOwriteFile :: FilePath -> String -> IO ()appendFile :: FilePath -> String -> IO ()
are used to read and write to files, but they incur quite a bit of overhead if they are used many times in a row. Instead we wish to open a file once, then make many actions on the file before we close it for a final time.
openFile :: FilePath -> IOMode -> IO Handle
hClose :: Handle -> IO ()
data IOMode = ReadMode | WriteMode | AppendMode deriving (Eq, Ord, Ix, Bounded, Enum, Read, Show)
File Modes• A file mode tells how an open file will be used. Different modes support
different operations.
• When in WriteMode
hPutChar :: Handle -> Char -> IO ()hPutStr :: Handle -> String -> IO ()hPutStrLn :: Handle -> String -> IO ()hPrint :: Show a => Handle -> a -> IO ()
• When in ReadMode
hGetChar :: Handle -> IO CharhGetLine :: Handle -> IO String
Standard Channels and Errors• Predefined standard Channels
stdin, stdout, stderr :: Handle
• Error Handling while doing IO
isEOFError :: IOError -> Bool -- Test if the EOF errorioError :: IOError -> IO a -- Raise an IOErrorcatch :: IO a -> (IOError -> IO a) -> IO a -- Handle an Error
• Other IO types of errors and their predicates.
isAlreadyExistsError, isDoesNotExistError, isAlreadyInUseError, isFullError, isEOFError, isIllegalOperation,isPermissionError, isUserError,
IOError• IOError is an abstract datatype
– NOT and algebraic datatype, defined with data like [ ] or Tree
• Thus it does not admit pattern matching.• Hence the use of all the IOError recognizing predicates.
– isAlreadyExistsError, isDoesNotExistError, – isAlreadyInUseError, isFullError, – isEOFError, isIllegalOperation,– isPermissionError, isUserError
• This was a concious decision, made to allow easy extension of the kinds of IOErrors, as the system grew.
Handling IO Errors• Any action of type IO a may potentially cause an IO Error.• The function
catch :: IO a -> (IOError -> IO a) -> IO a
can be used to gracefully handle such an error by providing a “fix”
getChar' :: IO ChargetChar' = catch getChar (\ e -> return '\n')
getChar2 :: IO ChargetChar2 = catch getChar (\ e -> if isEOFError e then return '\n' else ioError e) –- pass non EOF errors on
An ExamplegetLine' :: IO StringgetLine' = catch getLine'' (\ e -> return ("Error: " ++ show e)) where getLine'' = do { c <- getChar2 ; if c == '\n' then return "" else do { l <- getLine' ; return (c:l) } }
Catching errors when opening files
getAndOpenFile :: String -> IOMode -> IO HandlegetAndOpenFile prompt mode = do { putStr prompt ; name <- getLine ; catch (openFile name mode) (\e -> do { putStrLn ("Cannot open: "++name) ; print e ; getAndOpenFile prompt mode }) }
Copying Filesmain = do { fromHandle <- getAndOpenFile "Copy from: " ReadMode ; toHandle <- getAndOpenFile "Copy to: " WriteMode ; contents <- hGetContents fromHandle ; hPutStr toHandle contents ; hClose fromHandle ; hClose toHandle ; putStr "Done\n" }
Arrays
• x :: Array index elem• In Haskell we have pure arrays• Created in linear time• Access in constant time• Indexed by many things• Store anything (polymorphic elem)
Indexing
• Arrays are indexed by scalar types• The class (Ix t) describes types that can be used as
indexes
class Ord a => Ix a where range :: (a, a) -> [a] index :: (a, a) -> a -> Int inRange :: (a, a) -> a -> Bool rangeSize :: (a, a) -> Int
Ix instances
• instance Ix Integer • instance Ix Int • instance Ix Char • instance Ix Bool • instance (Ix a, Ix b) => Ix (a, b)
Deriving Ix for enumerationsdata Color = Red | Blue | Green | Yellow | White | Black deriving (Ord,Eq,Ix)
*> range (Red,Black)[Red,Blue,Green,Yellow,White,Black]
*> index (Red,Black) Yellow3
*> index (Yellow,Black) Yellow0
*> rangeSize (Yellow,Black)3
Creating arrays by listing
• listArray :: (Ix i) => (i, i) -> [e] -> Array i e
• digits = listArray (0,9) "0123456789"
Creating arrays by tagging• array
:: (Ix i) => (i, i) -- bounds of the array: -- (lowest,highest) -> [(i, e)] -- list of associations -> Array i e
alphabet = array (1,26) (zip [1..26] "abcdefghijklmnopqrstuvwxyz")
fifth = alphabet ! 5
Accessing arrays
• (!) :: (Ix i) => a i e -> i -> e– Returns the element of an immutable array at the
specified index. • indices :: (Ix i) => a i e -> [i]– Returns a list of all the valid indices in an array.
• elems :: (Ix i) => a i e -> [e]– Returns a list of all the elements of an array, in the same
order as their indices. • assocs :: (Ix i) => a i e -> [(i, e)]– Returns the contents of an array as a list of associations.
Multiple Array libraries
• There are many array libraries that share the same interface
• class IArray a e where
• Class of immutable array types.
• An array type has the form (a i e) where a is the array type constructor (kind * -> * -> *), i is the index type (a member of the class Ix), and e is the element type. The IArray class is parameterised over both a and e, so that instances specialized to certain element types can be defined.
Compare
• listArray :: (Iarray a e, Ix i) => (i, i) -> [e] -> a i e
• Compare to
• listArray :: (Ix i) => (i, i) -> [e] -> Array i e
Use
• Array use generally follows a pattern1. Create a list of array elements• Comprehensions are very useful here
2. Create the Array from the list using array or listArray
3. Enter a mode where the many things are looked up in the array in constant time.