{- Copyright 2016, Dominic Orchard, Andrew Rice, Mistral Contrastin, Matthew Danish Licensed under the Apache License, Version 2.0 (the "License"); you may not use this file except in compliance with the License. You may obtain a copy of the License at http://www.apache.org/licenses/LICENSE-2.0 Unless required by applicable law or agreed to in writing, software distributed under the License is distributed on an "AS IS" BASIS, WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied. See the License for the specific language governing permissions and limitations under the License. -} {-# LANGUAGE FlexibleInstances #-} {-# LANGUAGE FlexibleContexts #-} {-# LANGUAGE ScopedTypeVariables #-} {-# LANGUAGE DeriveGeneric #-} {-# LANGUAGE RankNTypes #-} module Camfort.Traverse where import Camfort.Analysis.Annotations import Language.Fortran import Generics.Deriving.Base import Generics.Deriving.Copoint import GHC.Generics import Control.Monad.Trans.Writer.Lazy import Data.Generics.Zipper import Data.Generics.Aliases import Data.Generics.Str import Data.Generics.Uniplate.Operations import Language.Fortran.Lexer import Control.Comonad import Data.Data import Data.Maybe import Data.Monoid import Debug.Trace -- Data-type generic comonad-style traversal extendBi :: (Biplate (from a) (to a), RComonad to) => (to a -> a) -> (from a) -> (from a) extendBi f x = case biplate x of (current, generate) -> generate $ strMap (rextend f) current reduceCollect :: (Data s, Data t, Uniplate t, Biplate t s) => (s -> Maybe a) -> t -> [a] reduceCollect k x = execWriter (transformBiM (\y -> do case k y of Just x -> tell [x] Nothing -> return () return y) x) -- Data-type generic comonad-style traversal with zipper (contextual traversal) everywhere :: (Zipper a -> Zipper a) -> Zipper a -> Zipper a everywhere k z = let everywhere' = enterRight . enterDown . k enterDown z = case (down' z) of Just dz -> let dz' = everywhere' dz in case (up $ dz') of Just uz -> uz Nothing -> dz' Nothing -> z enterRight z = case (right z) of Just rz -> let rz' = everywhere' rz in case (left $ rz') of Just lz -> lz Nothing -> rz' Nothing -> z in everywhere' z zfmap :: Data a => (a -> a) -> Zipper (d a) -> Zipper (d a) zfmap f x = zeverywhere (mkT f) x -- This one is less useful as the definitions for comonads are then very annoying extendBi' :: (Biplate (from a) (to a), Comonad to) => (to a -> a) -> (from a) -> (from a) extendBi' f x = case biplate x of (current, generate) -> generate $ strMap (extend f) current class RComonad t where rextract :: t a -> a rextend :: (t a -> a) -> t a -> t a class RFunctor t where rfmap :: (a -> a) -> t a -> t a instance RComonad Fortran where rextract x = tag x rextend k y@(Assg _ sp e1 e2) = Assg (k y) sp e1 e2 rextend k y@(For _ sp v e1 e2 e3 fs) = For (k y) sp v e1 e2 e3 (rextend k fs) rextend k y@(FSeq _ sp f1 f2) = FSeq (k y) sp (rextend k f1) (rextend k f2) rextend k y@(If _ sp e f1 fes f3) = let fes' = map (\(e, f) -> (e, rextend k f)) fes f3' = case f3 of Nothing -> Nothing Just f3a -> Just (rextend k f3a) in If (k y) sp e (rextend k f1) fes' f3' rextend k y@(Allocate _ sp e1 e2) = Allocate (k y) sp e1 e2 rextend k y@(Backspace _ sp sp') = Backspace (k y) sp sp' rextend k y@(Call _ sp e as) = Call (k y) sp e as rextend k y@(Open _ sp s) = Open (k y) sp s rextend k y@(Close _ sp s) = Close (k y) sp s rextend k y@(Continue _ sp) = Continue (k y) sp rextend k y@(Cycle _ sp s) = Cycle (k y) sp s rextend k y@(Deallocate _ sp es e) = Deallocate (k y) sp es e rextend k y@(Endfile _ sp s) = Endfile (k y) sp s rextend k y@(Exit _ sp s) = Exit (k y) sp s rextend k y@(Forall _ sp es f) = Forall (k y) sp es (rextend k f) rextend k y@(Goto _ sp s) = Goto (k y) sp s rextend k y@(Nullify _ sp e) = Nullify (k y) sp e rextend k y@(Inquire _ sp s e) = Inquire (k y) sp s e rextend k y@(Rewind _ sp s) = Rewind (k y) sp s rextend k y@(Stop _ sp e) = Stop (k y) sp e rextend k y@(Where _ sp e f Nothing) = Where (k y) sp e (rextend k f) Nothing rextend k y@(Where _ sp e f (Just f')) = Where (k y) sp e (rextend k f) (Just (rextend k f')) rextend k y@(Write _ sp s e) = Write (k y) sp s e rextend k y@(PointerAssg _ sp e1 e2) = PointerAssg (k y) sp e1 e2 rextend k y@(Return _ sp e) = Return (k y) sp e rextend k y@(Label _ sp s f) = Label (k y) sp s (rextend k f) rextend k y@(Print _ sp e es) = Print (k y) sp e es rextend k y@(ReadS _ sp s e) = ReadS (k y) sp s e rextend k y@(TextStmt _ sp s) = TextStmt (k y) sp s rextend k y@(NullStmt _ sp) = NullStmt (k y) sp class Refill d where refill :: d a -> a -> d a instance Refill Fortran where refill y@(Assg _ sp e1 e2) a = Assg a sp e1 e2 refill y@(For _ sp v e1 e2 e3 fs) a = For a sp v e1 e2 e3 fs refill y@(DoWhile _ sp e f) a = DoWhile a sp e f refill y@(FSeq _ sp f1 f2) a = FSeq a sp f1 f2 refill y@(If _ sp e f1 fes f3) a = If a sp e f1 fes f3 refill y@(Allocate _ sp e1 e2) a = Allocate a sp e1 e2 refill y@(Backspace _ sp sp') a = Backspace a sp sp' refill y@(Call _ sp e as) a = Call a sp e as refill y@(Open _ sp s) a = Open a sp s refill y@(Close _ sp s) a = Close a sp s refill y@(Continue _ sp) a = Continue a sp refill y@(Cycle _ sp s) a = Cycle a sp s refill y@(DataStmt _ sp p) a = DataStmt a sp p refill y@(Deallocate _ sp es e) a = Deallocate a sp es e refill y@(Endfile _ sp s) a = Endfile a sp s refill y@(Exit _ sp s) a = Exit a sp s refill y@(Forall _ sp es f) a = Forall a sp es f refill y@(Format _ sp s) a = Format a sp s refill y@(Goto _ sp s) a = Goto a sp s refill y@(Nullify _ sp e) a = Nullify a sp e refill y@(Inquire _ sp s e) a = Inquire a sp s e refill y@(Pause _ sp s) a = Pause a sp s refill y@(Rewind _ sp s) a = Rewind a sp s refill y@(Stop _ sp e) a = Stop a sp e refill y@(Where _ sp e f f') a = Where a sp e f f' refill y@(Write _ sp s e) a = Write a sp s e refill y@(PointerAssg _ sp e1 e2) a = PointerAssg a sp e1 e2 refill y@(Return _ sp e) a = Return a sp e refill y@(Label _ sp s f) a = Label a sp s f refill y@(Print _ sp e es) a = Print a sp e es refill y@(ReadS _ sp s e) a = ReadS a sp s e refill y@(TextStmt _ sp s) a = TextStmt a sp s refill y@(NullStmt _ sp) a = NullStmt a sp annotation :: Tagged g => g a -> a annotation = tag