X-Git-Url: http://git.megacz.com/?p=coq-hetmet.git;a=blobdiff_plain;f=examples%2Ftutorial.hs;h=7668eab785d33c7cf8912e6e2a687bda02883e8f;hp=29939b6c4d6fa6010f5d43dffcd7eb13064d5eb7;hb=e3e2ce9cb83acdd8191049b4e9bd3d4fcf6a4db4;hpb=132fd8b8ed861301b0ed38d286770003ea18396b diff --git a/examples/tutorial.hs b/examples/tutorial.hs index 29939b6..7668eab 100644 --- a/examples/tutorial.hs +++ b/examples/tutorial.hs @@ -1,10 +1,13 @@ -{-# OPTIONS_GHC -XModalTypes -XScopedTypeVariables -XFlexibleContexts -XMultiParamTypeClasses -ddump-types -XNoMonoPatBinds #-} +{-# OPTIONS_GHC -XModalTypes -XScopedTypeVariables -XFlexibleContexts -XMultiParamTypeClasses -ddump-types -XNoMonoPatBinds -XFlexibleInstances -XGADTs -XUndecidableInstances #-} module GArrowsTutorial where import Data.Bits import Data.Bool (not) import GHC.HetMet.CodeTypes hiding ((-)) import GHC.HetMet.GArrow +import Control.Category +import Control.Arrow +import Prelude hiding ( id, (.) ) -- The best way to understand heterogeneous metaprogramming and -- generalized arrows is to play around with this file, poking at the @@ -206,6 +209,7 @@ increment_at_level1 = <[ \x -> x + 1 ]> -------------------------------------------------------------------------------- -- Ye Olde and Most Venerable "pow" Function +pow :: forall c. GuestIntegerLiteral c => GuestLanguageMult c Integer => Integer -> <[ Integer -> Integer ]>@c pow n = if n==0 then <[ \x -> 1 ]> @@ -213,6 +217,7 @@ pow n = -- a more efficient two-level pow +pow' :: forall c. GuestIntegerLiteral c => GuestLanguageMult c Integer => Integer -> <[ Integer -> Integer ]>@c pow' 0 = <[ \x -> 1 ]> pow' 1 = <[ \x -> x ]> pow' n = if n `mod` 2==0 @@ -228,7 +233,6 @@ pow' n = if n `mod` 2==0 - -------------------------------------------------------------------------------- -- Dot Product -- @@ -270,11 +274,11 @@ dotproduct' v1 v2 = -- original vector, we will emit code which is faster than a one-level -- dot product. ---dotproduct'' :: forall g. --- GuestLanguageAdd g Int => --- GuestLanguageMult g Int => --- GuestLanguageFromInteger g Int => --- [Int] -> <[ [Int] -> Int ]>@g +dotproduct'' :: forall g. + GuestLanguageAdd g Integer => + GuestLanguageMult g Integer => + GuestIntegerLiteral g => + [Integer] -> <[ [Integer] -> Integer ]>@g dotproduct'' v1 = case v1 of [] -> <[ \v2 -> 0 ]> @@ -292,8 +296,6 @@ dotproduct'' v1 = - - -------------------------------------------------------------------------------- -- Taha-Sheard "isomorphism for code types" @@ -412,11 +414,13 @@ staged_accept (Star e) k = -- because "k" is free in loop; it is analogous to the free -- environment variable in Nanevski's example + staged_accept (Const c) k = <[ \s -> if gs_empty s then false else (gs_head s) == ~~(guestCharLiteral c) && ~~k (gs_tail s) ]> + -- this type won't work unless the case for (Star e) is commented out; -- see loop above -- Regex @@ -433,6 +437,143 @@ staged_accept (Const c) k = + +-------------------------------------------------------------------------------- +-- Unflattening + +-- The current implementation has problems with literals at level>0; +-- there are special-purpose hacks for Int and Char, but none for +-- unit. So I use this instead as a placeholder for <[ () ]> + +<[ u ]> = Prelude.error "FIXME" + +-- This more or less "undoes" the flatten function. People often ask +-- me how you "translate generalized arrows back into multi-level +-- terms".. I'm not sure why you'd want to do that, but this is how: +newtype Code x y = Code { unCode :: forall a. <[ x -> y ]>@a } + +instance Category Code where + id = Code <[ \x -> x ]> + f . g = Code <[ \x -> ~~(unCode f) (~~(unCode g) x) ]> + +instance GArrow Code (,) () where + ga_first f = Code <[ \(x,y) -> ((~~(unCode f) x),y) ]> + ga_second f = Code <[ \(x,y) -> (x ,(~~(unCode f) y)) ]> + ga_cancell = Code <[ \(_,x) -> x ]> + + ga_cancelr = Code <[ \(x,_) -> x ]> + ga_uncancell = Code <[ \x -> (u,x) ]> + ga_uncancelr = Code <[ \x -> (x,u) ]> + ga_assoc = Code <[ \((x,y),z) -> (x,(y,z)) ]> + ga_unassoc = Code <[ \(x,(y,z)) -> ((x,y),z) ]> + + + +-------------------------------------------------------------------------------- +-- BiGArrows + +class GArrow g (**) u => BiGArrow g (**) u where + -- Note that we trust the user's pair of functions actually are + -- mutually inverse; confirming this in the type system would + -- require very powerful dependent types (such as Coq's). However, + -- the consequences of failure here are much more mild than failures + -- in BiArrow.inv: if the functions below are not mutually inverse, + -- the LoggingBiGArrow will simply compute the wrong result rather + -- than fail in some manner outside the language's semantics. + biga_arr :: (x -> y) -> (y -> x) -> g x y + biga_inv :: g x y -> g y x + +-- For any GArrow instance, its mutually inverse pairs form a BiGArrow +data GArrow g (**) u => GArrowInversePair g (**) u x y = + GArrowInversePair { forward :: g x y , backward :: g y x } +instance GArrow g (**) u => Category (GArrowInversePair g (**) u) where + id = GArrowInversePair { forward = id , backward = id } + f . g = GArrowInversePair { forward = (forward f) . (forward g) , backward = (backward g) . (backward f) } +instance GArrow g (**) u => GArrow (GArrowInversePair g (**) u) (**) u where + ga_first f = GArrowInversePair { forward = ga_first (forward f), backward = ga_first (backward f) } + ga_second f = GArrowInversePair { forward = ga_second (forward f), backward = ga_second (backward f) } + ga_cancell = GArrowInversePair { forward = ga_cancell , backward = ga_uncancell } + ga_cancelr = GArrowInversePair { forward = ga_cancelr , backward = ga_uncancelr } + ga_uncancell = GArrowInversePair { forward = ga_uncancell , backward = ga_cancell } + ga_uncancelr = GArrowInversePair { forward = ga_uncancelr , backward = ga_cancelr } + ga_assoc = GArrowInversePair { forward = ga_assoc , backward = ga_unassoc } + ga_unassoc = GArrowInversePair { forward = ga_unassoc , backward = ga_assoc } +instance GArrowSwap g (**) u => GArrowSwap (GArrowInversePair g (**) u) (**) u where + ga_swap = GArrowInversePair { forward = ga_swap , backward = ga_swap } +-- but notice that we can't (in general) get +-- instance GArrowDrop g => GArrowDrop (GArrowInversePair g) where ... + + +-- For that, we need PreLenses, which "log the history" where necessary. +-- I call this a "PreLens" because it consists of the data required +-- for a Lens (as in BCPierce's Lenses) but does not necessarily +-- satisfy the putget/getput laws. Specifically, the "extra stuff" we +-- store is the inversion function. +newtype PreLens x y = PreLens { preLens :: x -> (y , y->x) } + +instance Category PreLens where + id = PreLens { preLens = \x -> (x, (\x -> x)) } + f . g = PreLens { preLens = \x -> let (gx,g') = (preLens g) x in let (fgx,f') = (preLens f) gx in (fgx , \q -> g' (f' q)) } + +instance GArrow PreLens (,) () where + ga_first f = PreLens { preLens = \(x,z) -> let (y,f') = (preLens f) x in ((y,z),(\(q1,q2) -> (f' q1,q2))) } + ga_second f = PreLens { preLens = \(z,x) -> let (y,f') = (preLens f) x in ((z,y),(\(q1,q2) -> (q1,f' q2))) } + ga_cancell = PreLens { preLens = \(_,x) -> (x, (\x -> ((),x))) } + ga_cancelr = PreLens { preLens = \(x,_) -> (x, (\x -> (x,()))) } + ga_uncancell = PreLens { preLens = \x -> (((),x), (\(_,x) -> x)) } + ga_uncancelr = PreLens { preLens = \x -> ((x,()), (\(x,_) -> x)) } + ga_assoc = PreLens { preLens = \((x,y),z) -> ( (x,(y,z)) , (\(x,(y,z)) -> ((x,y),z)) ) } + ga_unassoc = PreLens { preLens = \(x,(y,z)) -> ( ((x,y),z) , (\((x,y),z) -> (x,(y,z))) ) } + +instance GArrowDrop PreLens (,) () where + ga_drop = PreLens { preLens = \x -> (() , (\() -> x)) } +instance GArrowCopy PreLens (,) () where + ga_copy = PreLens { preLens = \x -> ((x,x) , fst) } +instance GArrowSwap PreLens (,) () where + ga_swap = PreLens { preLens = \(x,y) -> ((y,x) , (\(z,q) -> (q,z))) } + + + +data Lens x y where + Lens :: forall x y c1 c2 . ((x,c1)->(y,c2)) -> ((y,c2)->(x,c1)) -> Lens x y +{- +-- can we make lenses out of GArrows other than (->)? +instance Category Lens where + id = Lens (\x -> x) (\x -> x) + (Lens g1 g2) . (Lens f1 f2) = Lens (\(x,(c1,c2)) -> let (y,fc) = f1 (x,c1) in let (z,gc) = g1 (y,c2) in (z,(fc,gc))) + (\(z,(c1,c2)) -> let (y,gc) = g2 (z,c2) in let (x,fc) = f2 (y,c1) in (x,(fc,gc))) + +instance GArrow Lens (,) () where + ga_first (Lens f1 f2) = Lens (\((x1,x2),c) -> let (y,c') = f1 (x1,c) in ((y,x2),c')) + (\((x1,x2),c) -> let (y,c') = f2 (x1,c) in ((y,x2),c')) + ga_second (Lens f1 f2) = Lens (\((x1,x2),c) -> let (y,c') = f1 (x2,c) in ((x1,y),c')) + (\((x1,x2),c) -> let (y,c') = f2 (x2,c) in ((x1,y),c')) + ga_cancell = Lens (\(((),x),()) -> ( x ,())) + (\( x ,()) -> (((),x),())) + ga_uncancell = Lens (\( x ,()) -> (((),x),())) + (\(((),x),()) -> ( x ,())) + ga_cancelr = Lens (\((x,()),()) -> ( x ,())) + (\( x ,()) -> ((x,()),())) + ga_uncancelr = Lens (\( x ,()) -> ((x,()),())) + (\((x,()),()) -> ( x ,())) + ga_assoc = Lens (\(((x,y),z),()) -> ((x,(y,z)),())) + (\((x,(y,z)),()) -> (((x,y),z),())) + ga_unassoc = Lens (\((x,(y,z)),()) -> (((x,y),z),())) + (\(((x,y),z),()) -> ((x,(y,z)),())) + +instance GArrowDrop Lens (,) () where + ga_drop = Lens (\(x,()) -> ((),x)) (\((),x) -> (x,())) +instance GArrowCopy Lens (,) () where + ga_copy = Lens (\(x,()) -> ((x,x),())) (\((x,_),()) -> (x,())) +instance GArrowSwap Lens (,) () where + ga_swap = Lens (\((x,y),()) -> ((y,x),())) (\((x,y),()) -> ((y,x),())) + +instance BiGArrow Lens (,) () where + biga_arr f f' = Lens (\(x,()) -> ((f x),())) (\(x,()) -> ((f' x),())) + biga_inv (Lens f1 f2) = Lens f2 f1 +-} + + -------------------------------------------------------------------------------- -- An example generalized arrow @@ -498,3 +639,189 @@ instance GArrowLiteral GArrowVerilog (,) where + +{- +lambda calculus interpreter + +data Val = + Num Int +| Fun <[Val -> Val]> + +This requires higher-order functions in the second level... + +eval :: Exp -> a Env Val +eval (Var s) = <[ lookup s ]> +eval (Add e1 e2) = <[ let (Num v1) = ~(eval e1) + in let (Num v2) = ~(eval e2) + in (Num (v1+v2)) ]> +eval (If e1 e2 e3) = <[ let v1 = ~(eval e1) in + in if v1 + then ~(eval e2) + else ~(eval e3) ]> +eval (Lam x e) = ??? + +eval (Var s) = proc env -> + returnA -< fromJust (lookup s env) +eval (Add e1 e2) = proc env -> + (eval e1 -< env) `bind` \ ~(Num u) -> + (eval e2 -< env) `bind` \ ~(Num v) -> + returnA -< Num (u + v) +eval (If e1 e2 e3) = proc env -> + (eval e1 -< env) `bind` \ ~(Bl b) -> + if b then eval e2 -< env + else eval e3 -< env +eval (Lam x e) = proc env -> + returnA -< Fun (proc v -> eval e -< (x,v):env) +eval (App e1 e2) = proc env -> + (eval e1 -< env) `bind` \ ~(Fun f) -> + (eval e2 -< env) `bind` \ v -> + f -< v + +eval (Var s) = <[ \env -> fromJust (lookup s env) ]> +eval (Add e1 e2) = <[ \env -> (~(eval e1) env) + (~(eval e2) env) ]> +eval (If e1 e2 e3) = <[ \env -> if ~(eval e1) env + then ~(eval e2) env + else ~(eval e2) env +eval (Lam x e) = <[ \env -> Fun (\v -> ~(eval e) ((x,v):env)) ]> +eval (App e1 e2) = <[ \env -> case ~(eval e1) env of + (Fun f) -> f (~(eval e2) env) ]> +eval (Var s) <[env]> = <[ fromJust (lookup s env) ]> +eval (Add e1 e2) <[env]> = <[ (~(eval e1) env) + (~(eval e2) env) ]> +-} + + + + + +{- +immutable heap with cycles + +-- an immutable heap; maps Int->(Int,Int) + +alloc :: A (Int,Int) Int +lookup :: A Int (Int,Int) + +onetwocycle :: A (Int,Int) (Int,Int) +onetwocycle = + proc \(x,y)-> do + x' <- alloc -< (1,y) + y' <- alloc -< (2,x) + return (x',y') +\end{verbatim} + +\begin{verbatim} +alloc :: <[ (Int,Int) -> Int ]> +lookup :: <[ Int -> (Int,Int) ]> + +onetwocycle :: <[ (Int,Int) ]> -> <[ (Int,Int) ]> +onetwocycle x y = <[ + let x' = ~alloc (1,~y) + in let y' = ~alloc (2,~x) + in (x',y') +]> + +onetwocycle' :: <[ (Int,Int) -> (Int,Int) ]> +onetwocycle' = back2 onetwocycle +\end{verbatim} +-} + + + + +{- +The example may seem a little contrived, but its purpose is to +illustrate the be- haviour when the argument of mapC refers both to +its parameter and a free vari- able (n). + +\begin{verbatim} +-- we can use mapA rather than mapC (from page 100) + +mapA f = proc xs -> case xs of +[] -> returnA -< [] x:xs’ -> do y <- f -< x +ys’ <- mapA f -< xs’ returnA -< y:ys + +example2 = + <[ \(n,xs) -> + ~(mapA <[ \x-> (~(delay 0) n, x) ]> ) + xs + ]> + +<[ example2 (n,xs) = + ~(mapA <[ \x-> (~(delay 0) n, x) ]> ) xs ]> +\end{verbatim} +-} + + + + + + +{- +delaysA = + arr listcase >>> + arr (const []) ||| + (arr id *** (delaysA >>> delay []) >>> + arr (uncurry (:))) + +nor :: SF (Bool,Bool) Bool +nor = arr (not.uncurry (||)) + +edge :: SF Bool Bool +edge = + proc a -> do + b <- delay False -< a + returnA -< a && not b + +flipflop = + proc (reset,set) -> do + rec c <- delay False -< nor + reset d d <- delay True -< nor set c + returnA -< (c,d) + +halfAdd :: Arrow arr => arr (Bool,Bool) (Bool,Bool) +halfAdd = + proc (x,y) -> returnA -< (x&&y, x/=y) + +fullAdd :: + Arrow arr => arr (Bool,Bool,Bool) (Bool,Bool) +fullAdd = + proc (x,y,c) -> do + (c1,s1) <- halfAdd -< (x,y) + (c2,s2) <- halfAdd -< (s1,c) + returnA -< (c1||c2,s2) + +Here is the appendix of Hughes04: +module Circuits where +import Control.Arrow import List +class ArrowLoop a => ArrowCircuit a where delay :: b -> a b b +nor :: Arrow a => a (Bool,Bool) Bool nor = arr (not.uncurry (||)) +flipflop :: ArrowCircuit a => a (Bool,Bool) (Bool,Bool) flipflop = loop (arr (\((a,b),~(c,d)) -> ((a,d),(b,c))) >>> +nor *** nor >>> delay (False,True) >>> arr id &&& arr id) +class Signal a where showSignal :: [a] -> String +instance Signal Bool where showSignal bs = concat top++"\n"++concat bot++"\n" +where (top,bot) = unzip (zipWith sh (False:bs) bs) sh True True = ("__"," ") sh True False = (" ","|_") sh False True = (" _","| ") +sh False False = (" ","__") +instance (Signal a,Signal b) => Signal showSignal xys = showSignal (map fst showSignal (map snd +instance Signal a => Signal [a] where showSignal = concat . map showSignal +sig = concat . map (uncurry replicate) +(a,b) where xys) ++ xys) +. transpose +flipflopInput = sig [(5,(False,False)),(2,(False,True)),(5,(False,False)), +(2,(True,False)),(5,(False,False)),(2,(True,True)), (6,(False,False))] + + + + + +-- from Hughes' "programming with Arrows" + +mapC :: ArrowChoice arr => arr (env,a) b -> arr (env,[a]) [b] mapC c = proc (env,xs) -> +case xs of [] -> returnA -< [] x:xs’ -> do y <- c -< (env,x) +ys <- mapC c -< (env,xs’) returnA -< y:ys + +example2 = proc (n,xs) -> (| mapC (\x-> do delay 0 -< n +&&& do returnA -< x) |) xs +-} + + +