{- |

Module : $Header$

Copyright : (c) Christian Maeder and Uni Bremen 2002-2006

License : similar to LGPL, see HetCATS/LICENSE.txt or LIZENZ.txt

Maintainer : maeder@tzi.de

Stability : provisional

Portability : portable

mapping entities of morphisms

-}

module HasCASL.Morphism where

import HasCASL.Le

import HasCASL.As

import HasCASL.TypeAna

import HasCASL.AsUtils

import HasCASL.AsToLe

import HasCASL.MapTerm

import HasCASL.Merge

import Common.DocUtils

import Common.Id

import Common.Result

import qualified Data.Map as Map

import Data.List ((\\))

instance Eq Morphism where

m1 == m2 = (msource m1, mtarget m1, typeIdMap m1, funMap m1) ==

(msource m2, mtarget m2, typeIdMap m2, funMap m2)

mapTypeScheme :: IdMap -> TypeScheme -> TypeScheme

mapTypeScheme im = mapTypeOfScheme $ mapType im

mapSen :: Morphism -> Term -> Term

mapSen m = let im = typeIdMap m in

mapTerm (mapFunSym im (funMap m), mapType im)

mapDataEntry :: Morphism -> DataEntry -> DataEntry

mapDataEntry m (DataEntry tm i k args rk alts) =

let tim = compIdMap tm $ typeIdMap m

in DataEntry tim i k args rk $ map

(mapAlt m tim args $ patToType (Map.findWithDefault i i tim)

args rk) alts

mapAlt :: Morphism -> IdMap -> [TypeArg] -> Type -> AltDefn -> AltDefn

mapAlt m tm args dt c@(Construct mi ts p sels) =

case mi of

Just i ->

let sc = TypeScheme args

(getFunType dt p (map (mapType tm) ts)) nullRange

(j, TypeScheme _ ty _) =

mapFunSym (typeIdMap m) (funMap m) (i, sc)

in Construct (Just j) ts (getPartiality ts ty) sels

-- do not change (unused) selectors

Nothing -> c

-- | get the partiality from a constructor type

-- with a given number of curried arguments

getPartiality :: [a] -> Type -> Partiality

getPartiality args t = case getTypeAppl t of

(TypeName i _ _, [_, res]) | isArrow i -> case args of

[] -> Total

[_] -> if isPartialArrow i then Partial else Total

_ : rs -> getPartiality rs res

(TypeName i _ _, [_]) | i == lazyTypeId ->

if null args then Partial else error "getPartiality"

_ -> Total

mapSentence :: Morphism -> Sentence -> Result Sentence

mapSentence m s = return $ case s of

Formula t -> Formula $ mapSen m t

DatatypeSen td -> DatatypeSen $ map (mapDataEntry m) td

ProgEqSen i sc pe ->

let tm = typeIdMap m

fm = funMap m

f = mapFunSym tm fm

(ni, nsc) = f (i, sc)

in ProgEqSen ni nsc $ mapEq (f, mapType tm) pe

mapFunSym :: IdMap -> FunMap -> (Id, TypeScheme) -> (Id, TypeScheme)

mapFunSym im fm (i, sc) =

let msc = mapTypeScheme im sc

in Map.findWithDefault (i, msc) (i, msc) fm

embedMorphism :: Env -> Env -> Morphism

embedMorphism = mkMorphism

ideMor :: Env -> Morphism

ideMor e = embedMorphism e e

compIdMap :: IdMap -> IdMap -> IdMap

compIdMap im1 im2 = Map.foldWithKey ( \ i j ->

let k = Map.findWithDefault j j im2 in

if i == k then id else Map.insert i k)

im2 im1

compMor :: Morphism -> Morphism -> Result Morphism

compMor m1 m2 =

if isSubEnv (mtarget m1) (msource m2) &&

isSubEnv (msource m2) (mtarget m1) then

let tm2 = typeIdMap m2

fm2 = funMap m2 in return

(mkMorphism (msource m1) (mtarget m2))

{ typeIdMap = compIdMap (typeIdMap m1) tm2

, funMap = Map.foldWithKey ( \ p1 p2 ->

let p3 = mapFunSym tm2 fm2 p2 in

if p1 == p3 then id else Map.insert p1 p3)

fm2 $ funMap m1

}

else fail "intermediate signatures of morphisms do not match"

inclusionMor :: Env -> Env -> Result Morphism

inclusionMor e1 e2 =

if isSubEnv e1 e2

then return (embedMorphism e1 e2)

else Result [Diag Error

("Attempt to construct inclusion between non-subsignatures:\n"

++ showEnvDiff e1 e2) nullRange] Nothing

showEnvDiff :: Env -> Env -> String

showEnvDiff e1 e2 =

"Signature 1:\n" ++ showDoc e1 "\nSignature 2:\n"

++ showDoc e2 "\nDifference\n" ++ showDoc

(diffEnv e1 e2) ""

legalEnv :: Env -> Bool

legalEnv _ = True -- maybe a closure test?

legalMor :: Morphism -> Bool

legalMor m = let s = msource m

t = mtarget m

ts = typeIdMap m

fs = funMap m

in

all (`elem` (Map.keys $ typeMap s))

(Map.keys ts)

&& all (`elem` (Map.keys $ typeMap t))

(Map.elems ts)

&& all ((`elem` (Map.keys $ assumps s)) . fst)

(Map.keys fs)

&& all ((`elem` (Map.keys $ assumps t)) . fst)

(Map.elems fs)

morphismUnion :: Morphism -> Morphism -> Result Morphism

morphismUnion m1 m2 =

do let s1 = msource m1

s2 = msource m2

tm1 = Map.toList $ typeIdMap m1

tm2 = Map.toList $ typeIdMap m2

-- unchanged types

ut1 = Map.keys (typeMap s1) \\ map fst tm1

ut2 = Map.keys (typeMap s2) \\ map fst tm2

mkP = map ( \ a -> (a, a))

tml = tm1 ++ tm2 ++ mkP (ut1 ++ ut2)

fm1 = Map.toList $ funMap m1

fm2 = Map.toList $ funMap m2

-- all functions

af = concatMap ( \ (i, os) ->

map ( \ o -> (i, opType o)) $ opInfos os) . Map.toList

-- unchanged functions

uf1 = af (assumps s1) \\ map fst fm1

uf2 = af (assumps s2) \\ map fst fm2

fml = fm1 ++ fm2 ++ mkP (uf1 ++ uf2)

s <- merge s1 s2

t <- merge (mtarget m1) $ mtarget m2

tm <- foldr ( \ (i, j) rm ->

do m <- rm

case Map.lookup i m of

Nothing -> return $ Map.insert i j m

Just k -> if j == k then return m

else fail ("incompatible mapping of type id: " ++

showId i " to: " ++ showId j " and: "

++ showId k ""))

(return Map.empty) tml

fm <- foldr ( \ (isc@(i, sc), jsc@(j, sc1)) rm -> do

let nsc = expand (typeMap t) sc1

nisc = (i, expand (typeMap s) sc)

m <- rm

case Map.lookup nisc m of

Nothing -> return $ Map.insert nisc

(j, nsc) m

Just ksc@(k, sc2) -> if j == k &&

nsc == sc2

then return m

else fail ("incompatible mapping of op: " ++

showFun isc " to: " ++ showFun jsc " and: "

++ showFun ksc ""))

(return Map.empty) fml

return (mkMorphism s t)

{ typeIdMap = Map.filterWithKey (/=) tm

, funMap = Map.filterWithKey (/=) fm }

showFun :: (Id, TypeScheme) -> ShowS

showFun (i, ty) = showId i . (" : " ++) . showDoc ty

morphismToSymbMap :: Morphism -> SymbolMap

morphismToSymbMap mor =

let

src = msource mor

tar = mtarget mor

tm = typeIdMap mor

typeSymMap = Map.foldWithKey ( \ i ti ->

let j = Map.findWithDefault i i tm

k = typeKind ti

in Map.insert (idToTypeSymbol src i k)

$ idToTypeSymbol tar j k) Map.empty $ typeMap src

in Map.foldWithKey

( \ i (OpInfos l) m ->

foldr ( \ oi ->

let ty = opType oi

(j, t2) = mapFunSym

tm (funMap mor) (i, ty)

in Map.insert (idToOpSymbol src i ty)

(idToOpSymbol tar j t2)) m l)

typeSymMap $ assumps src