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First simple thing of coalgebra

master
Joshua Moerman 12 years ago
commit
b26e5d4b5b
  1. 23
      Coalgebra.hs
  2. 34
      Streams.hs

23
Coalgebra.hs

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{-# LANGUAGE MultiParamTypeClasses, FlexibleInstances #-}
module Coalgebra where
import Control.Monad
-- Definitions for (co)algebras
class Functor f => Algebra f m where
phi :: f m -> m
class Functor f => Coalgebra f m where
psi :: m -> f m
-- Fixpoint, ie f (Mu f) = Mu f
-- unfortunatly we need a data constructor
data Mu f = In (f (Mu f))
-- The fixpoint is both a algebra and coalgebra,
-- because there is an arrow id: X -> X = FX, if X is a fixpoint
instance Functor f => Algebra f (Mu f) where
phi = In
instance Functor f => Coalgebra f (Mu f) where
psi (In x) = x

34
Streams.hs

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{-# LANGUAGE MultiParamTypeClasses, FlexibleInstances, FlexibleContexts #-}
import Control.Monad.Instances
import Coalgebra
-- F X = A x X, for a fixed A, The prelude already provides the functor instance :)
type F a = (,) a
-- This will give the fixpoint, ie a coalgebra.
type Stream a = Mu (F a)
(+:+) :: a -> Stream a -> Stream a
(+:+) a s = In (a, s)
-- For every other (F a)-coalgebra x, there is a arrow x -> Stream a
-- and it is unique, so `Stream a` is the final (F a)-coalgebra!
sem :: (Coalgebra (F a) x) => x -> Stream a
sem x = x0 +:+ sem x' where (x0, x') = psi x
-- auxilary functions
toList :: Stream a -> [a]
toList s = a0 : toList a' where (a0, a') = psi s
-- example, with a very simple (F Int)-coalgebra, 1 -> 2, 2 -> 3, 3 -> 2
data X = One | Two | Three
instance Coalgebra (F Int) X where
psi One = (1, Two)
psi Two = (2, Three)
psi Three = (3, Two)
main :: IO ()
main = do
putStrLn $ show $ take 20 $ toList $ (sem One :: Stream Int)