Safe Haskell  SafeInferred 

Language  Haskell2010 
Synopsis
 data CondTree v c a = CondNode {
 condTreeData :: a
 condTreeConstraints :: c
 condTreeComponents :: [CondBranch v c a]
 data CondBranch v c a = CondBranch {
 condBranchCondition :: Condition v
 condBranchIfTrue :: CondTree v c a
 condBranchIfFalse :: Maybe (CondTree v c a)
 condIfThen :: Condition v > CondTree v c a > CondBranch v c a
 condIfThenElse :: Condition v > CondTree v c a > CondTree v c a > CondBranch v c a
 foldCondTree :: b > ((c, a) > b) > (b > b > b) > (b > b > b) > CondTree v c a > b
 mapCondTree :: (a > b) > (c > d) > (Condition v > Condition w) > CondTree v c a > CondTree w d b
 mapTreeConstrs :: (c > d) > CondTree v c a > CondTree v d a
 mapTreeConds :: (Condition v > Condition w) > CondTree v c a > CondTree w c a
 mapTreeData :: (a > b) > CondTree v c a > CondTree v c b
 traverseCondTreeV :: forall v c a w f. Applicative f => LensLike f (CondTree v c a) (CondTree w c a) v w
 traverseCondBranchV :: forall v c a w f. Applicative f => LensLike f (CondBranch v c a) (CondBranch w c a) v w
 traverseCondTreeC :: forall v c a d f. Applicative f => LensLike f (CondTree v c a) (CondTree v d a) c d
 traverseCondBranchC :: forall v c a d f. Applicative f => LensLike f (CondBranch v c a) (CondBranch v d a) c d
 extractCondition :: Eq v => (a > Bool) > CondTree v c a > Condition v
 simplifyCondTree :: (Semigroup a, Semigroup d) => (v > Either v Bool) > CondTree v d a > (d, a)
 ignoreConditions :: (Semigroup a, Semigroup c) => CondTree v c a > (a, c)
Documentation
A CondTree
is used to represent the conditional structure of
a Cabal file, reflecting a syntax element subject to constraints,
and then any number of subelements which may be enabled subject
to some condition. Both a
and c
are usually Monoid
s.
To be more concrete, consider the following fragment of a Cabal
file:
builddepends: base >= 4.0 if flag(extra) builddepends: base >= 4.2
One way to represent this is to have
. Here, CondTree
ConfVar
[Dependency
] BuildInfo
condTreeData
represents
the actual fields which are not behind any conditional, while
condTreeComponents
recursively records any further fields
which are behind a conditional. condTreeConstraints
records
the constraints (in this case, base >= 4.0
) which would
be applied if you use this syntax; in general, this is
derived off of targetBuildInfo
(perhaps a good refactoring
would be to convert this into an opaque type, with a smart
constructor that precomputes the dependencies.)
CondNode  

Instances
Foldable (CondTree v c) Source #  
Defined in Distribution.Types.CondTree fold :: Monoid m => CondTree v c m > m Source # foldMap :: Monoid m => (a > m) > CondTree v c a > m Source # foldMap' :: Monoid m => (a > m) > CondTree v c a > m Source # foldr :: (a > b > b) > b > CondTree v c a > b Source # foldr' :: (a > b > b) > b > CondTree v c a > b Source # foldl :: (b > a > b) > b > CondTree v c a > b Source # foldl' :: (b > a > b) > b > CondTree v c a > b Source # foldr1 :: (a > a > a) > CondTree v c a > a Source # foldl1 :: (a > a > a) > CondTree v c a > a Source # toList :: CondTree v c a > [a] Source # null :: CondTree v c a > Bool Source # length :: CondTree v c a > Int Source # elem :: Eq a => a > CondTree v c a > Bool Source # maximum :: Ord a => CondTree v c a > a Source # minimum :: Ord a => CondTree v c a > a Source #  
Traversable (CondTree v c) Source #  
Defined in Distribution.Types.CondTree traverse :: Applicative f => (a > f b) > CondTree v c a > f (CondTree v c b) Source # sequenceA :: Applicative f => CondTree v c (f a) > f (CondTree v c a) Source # mapM :: Monad m => (a > m b) > CondTree v c a > m (CondTree v c b) Source # sequence :: Monad m => CondTree v c (m a) > m (CondTree v c a) Source #  
Functor (CondTree v c) Source #  
(Structured v, Structured c, Structured a) => Structured (CondTree v c a) Source #  
Defined in Distribution.Types.CondTree  
(Data v, Data a, Data c) => Data (CondTree v c a) Source #  
Defined in Distribution.Types.CondTree gfoldl :: (forall d b. Data d => c0 (d > b) > d > c0 b) > (forall g. g > c0 g) > CondTree v c a > c0 (CondTree v c a) Source # gunfold :: (forall b r. Data b => c0 (b > r) > c0 r) > (forall r. r > c0 r) > Constr > c0 (CondTree v c a) Source # toConstr :: CondTree v c a > Constr Source # dataTypeOf :: CondTree v c a > DataType Source # dataCast1 :: Typeable t => (forall d. Data d => c0 (t d)) > Maybe (c0 (CondTree v c a)) Source # dataCast2 :: Typeable t => (forall d e. (Data d, Data e) => c0 (t d e)) > Maybe (c0 (CondTree v c a)) Source # gmapT :: (forall b. Data b => b > b) > CondTree v c a > CondTree v c a Source # gmapQl :: (r > r' > r) > r > (forall d. Data d => d > r') > CondTree v c a > r Source # gmapQr :: forall r r'. (r' > r > r) > r > (forall d. Data d => d > r') > CondTree v c a > r Source # gmapQ :: (forall d. Data d => d > u) > CondTree v c a > [u] Source # gmapQi :: Int > (forall d. Data d => d > u) > CondTree v c a > u Source # gmapM :: Monad m => (forall d. Data d => d > m d) > CondTree v c a > m (CondTree v c a) Source # gmapMp :: MonadPlus m => (forall d. Data d => d > m d) > CondTree v c a > m (CondTree v c a) Source # gmapMo :: MonadPlus m => (forall d. Data d => d > m d) > CondTree v c a > m (CondTree v c a) Source #  
(Semigroup a, Semigroup c, Monoid a, Monoid c) => Monoid (CondTree v c a) Source #  
(Semigroup a, Semigroup c) => Semigroup (CondTree v c a) Source #  
Generic (CondTree v c a) Source #  
Defined in Distribution.Types.CondTree
 
(Show a, Show c, Show v) => Show (CondTree v c a) Source #  
(Binary v, Binary c, Binary a) => Binary (CondTree v c a) Source #  
(NFData v, NFData c, NFData a) => NFData (CondTree v c a) Source #  
Defined in Distribution.Types.CondTree  
(Eq a, Eq c, Eq v) => Eq (CondTree v c a) Source #  
type Rep (CondTree v c a) Source #  
Defined in Distribution.Types.CondTree type Rep (CondTree v c a) = D1 ('MetaData "CondTree" "Distribution.Types.CondTree" "Cabalsyntax3.11.0.0inplace" 'False) (C1 ('MetaCons "CondNode" 'PrefixI 'True) (S1 ('MetaSel ('Just "condTreeData") 'NoSourceUnpackedness 'NoSourceStrictness 'DecidedLazy) (Rec0 a) :*: (S1 ('MetaSel ('Just "condTreeConstraints") 'NoSourceUnpackedness 'NoSourceStrictness 'DecidedLazy) (Rec0 c) :*: S1 ('MetaSel ('Just "condTreeComponents") 'NoSourceUnpackedness 'NoSourceStrictness 'DecidedLazy) (Rec0 [CondBranch v c a])))) 
data CondBranch v c a Source #
A CondBranch
represents a conditional branch, e.g., if
flag(foo)
on some syntax a
. It also has an optional false
branch.
CondBranch  

Instances
condIfThen :: Condition v > CondTree v c a > CondBranch v c a Source #
condIfThenElse :: Condition v > CondTree v c a > CondTree v c a > CondBranch v c a Source #
foldCondTree :: b > ((c, a) > b) > (b > b > b) > (b > b > b) > CondTree v c a > b Source #
Flatten a CondTree. This will traverse the CondTree by taking all possible paths into account, but merging inclusive when two paths may coexist, and exclusively when the paths are an if/else
mapCondTree :: (a > b) > (c > d) > (Condition v > Condition w) > CondTree v c a > CondTree w d b Source #
mapTreeConstrs :: (c > d) > CondTree v c a > CondTree v d a Source #
mapTreeData :: (a > b) > CondTree v c a > CondTree v c b Source #
traverseCondTreeV :: forall v c a w f. Applicative f => LensLike f (CondTree v c a) (CondTree w c a) v w Source #
@Traversal
@ for the variables
traverseCondBranchV :: forall v c a w f. Applicative f => LensLike f (CondBranch v c a) (CondBranch w c a) v w Source #
@Traversal
@ for the variables
traverseCondTreeC :: forall v c a d f. Applicative f => LensLike f (CondTree v c a) (CondTree v d a) c d Source #
@Traversal
@ for the aggregated constraints
traverseCondBranchC :: forall v c a d f. Applicative f => LensLike f (CondBranch v c a) (CondBranch v d a) c d Source #
@Traversal
@ for the aggregated constraints
extractCondition :: Eq v => (a > Bool) > CondTree v c a > Condition v Source #
Extract the condition matched by the given predicate from a cond tree.
We use this mainly for extracting buildable conditions (see the Note in Distribution.PackageDescription.Configuration), but the function is in fact more general.