hoopl-3.10.2.2: A library to support dataflow analysis and optimization

Safe HaskellSafe
LanguageHaskell2010

Compiler.Hoopl

Contents

Synopsis

Body

type Body n = LabelMap (Block n C C) Source #

A (possibly empty) collection of closed/closed blocks

type Body' block n = LabelMap (block n C C) Source #

Body abstracted over block

emptyBody :: Body' block n Source #

bodyList :: Body' block n -> [(Label, block n C C)] Source #

addBlock :: NonLocal thing => thing C C -> LabelMap (thing C C) -> LabelMap (thing C C) Source #

bodyUnion :: forall a. LabelMap a -> LabelMap a -> LabelMap a Source #

Graph

type Graph = Graph' Block Source #

A control-flow graph, which may take any of four shapes (O/O, OC, CO, C/C). A graph open at the entry has a single, distinguished, anonymous entry point; if a graph is closed at the entry, its entry point(s) are supplied by a context.

data Graph' block n e x where Source #

Graph' is abstracted over the block type, so that we can build graphs of annotated blocks for example (Compiler.Hoopl.Dataflow needs this).

Constructors

GNil :: Graph' block n O O 
GUnit :: block n O O -> Graph' block n O O 
GMany :: MaybeO e (block n O C) -> Body' block n -> MaybeO x (block n C O) -> Graph' block n e x 

class NonLocal thing where Source #

Gives access to the anchor points for nonlocal edges as well as the edges themselves

Minimal complete definition

entryLabel, successors

Methods

entryLabel :: thing C x -> Label Source #

successors :: thing e C -> [Label] Source #

Instances

Constructing graphs

blockGraph :: NonLocal n => Block n e x -> Graph n e x Source #

gUnitOO :: block n O O -> Graph' block n O O Source #

gUnitOC :: block n O C -> Graph' block n O C Source #

gUnitCO :: block n C O -> Graph' block n C O Source #

gUnitCC :: NonLocal (block n) => block n C C -> Graph' block n C C Source #

catGraphNodeOC :: NonLocal n => Graph n e O -> n O C -> Graph n e C Source #

catGraphNodeOO :: Graph n e O -> n O O -> Graph n e O Source #

catNodeCOGraph :: NonLocal n => n C O -> Graph n O x -> Graph n C x Source #

catNodeOOGraph :: n O O -> Graph n O x -> Graph n O x Source #

Splicing graphs

splice :: forall block n e a x. NonLocal (block n) => (forall e x. block n e O -> block n O x -> block n e x) -> Graph' block n e a -> Graph' block n a x -> Graph' block n e x Source #

gSplice :: NonLocal n => Graph n e a -> Graph n a x -> Graph n e x Source #

Maps

mapGraph :: (forall e x. n e x -> n' e x) -> Graph n e x -> Graph n' e x Source #

Maps over all nodes in a graph.

mapGraphBlocks :: forall block n block' n' e x. (forall e x. block n e x -> block' n' e x) -> Graph' block n e x -> Graph' block' n' e x Source #

Function mapGraphBlocks enables a change of representation of blocks, nodes, or both. It lifts a polymorphic block transform into a polymorphic graph transform. When the block representation stabilizes, a similar function should be provided for blocks.

Folds

foldGraphNodes :: forall n a. (forall e x. n e x -> a -> a) -> forall e x. Graph n e x -> a -> a Source #

Fold a function over every node in a graph. The fold function must be polymorphic in the shape of the nodes.

Extracting Labels

labelsDefined :: forall block n e x. NonLocal (block n) => Graph' block n e x -> LabelSet Source #

labelsUsed :: forall block n e x. NonLocal (block n) => Graph' block n e x -> LabelSet Source #

Depth-first traversals

postorder_dfs :: NonLocal (block n) => Graph' block n O x -> [block n C C] Source #

Traversal: postorder_dfs returns a list of blocks reachable from the entry of enterable graph. The entry and exit are *not* included. The list has the following property:

Say a "back reference" exists if one of a block's control-flow successors precedes it in the output list

Then there are as few back references as possible

The output is suitable for use in a forward dataflow problem. For a backward problem, simply reverse the list. (postorder_dfs is sufficiently tricky to implement that one doesn't want to try and maintain both forward and backward versions.)

postorder_dfs_from :: (NonLocal block, LabelsPtr b) => LabelMap (block C C) -> b -> [block C C] Source #

postorder_dfs_from_except :: forall block e. (NonLocal block, LabelsPtr e) => LabelMap (block C C) -> e -> LabelSet -> [block C C] Source #

preorder_dfs :: NonLocal (block n) => Graph' block n O x -> [block n C C] Source #

preorder_dfs_from_except :: forall block e. (NonLocal block, LabelsPtr e) => LabelMap (block C C) -> e -> LabelSet -> [block C C] Source #

class LabelsPtr l where Source #

Minimal complete definition

targetLabels

Methods

targetLabels :: l -> [Label] Source #

Instances

Shapes

data O Source #

Used at the type level to indicate an "open" structure with a unique, unnamed control-flow edge flowing in or out. Fallthrough and concatenation are permitted at an open point.

Instances

IfThenElseable O Source # 

Methods

mkIfThenElse :: HooplNode n => (Label -> Label -> AGraph n O C) -> AGraph n O O -> AGraph n O O -> AGraph n O O Source #

type Fact O f Source # 
type Fact O f = f
type IndexedCO O _a b Source # 
type IndexedCO O _a b = b

data C Source #

Used at the type level to indicate a "closed" structure which supports control transfer only through the use of named labels---no "fallthrough" is permitted. The number of control-flow edges is unconstrained.

Instances

IfThenElseable C Source # 

Methods

mkIfThenElse :: HooplNode n => (Label -> Label -> AGraph n O C) -> AGraph n O C -> AGraph n O C -> AGraph n O C Source #

NonLocal n => LabelsPtr (n e C) Source # 

Methods

targetLabels :: n e C -> [Label] Source #

type Fact C f Source # 
type Fact C f = FactBase f
type IndexedCO C a _b Source # 
type IndexedCO C a _b = a

data MaybeO ex t where Source #

Maybe type indexed by open/closed

Constructors

JustO :: t -> MaybeO O t 
NothingO :: MaybeO C t 

Instances

Functor (MaybeO ex) Source # 

Methods

fmap :: (a -> b) -> MaybeO ex a -> MaybeO ex b #

(<$) :: a -> MaybeO ex b -> MaybeO ex a #

data MaybeC ex t where Source #

Maybe type indexed by closed/open

Constructors

JustC :: t -> MaybeC C t 
NothingC :: MaybeC O t 

Instances

Functor (MaybeC ex) Source # 

Methods

fmap :: (a -> b) -> MaybeC ex a -> MaybeC ex b #

(<$) :: a -> MaybeC ex b -> MaybeC ex a #

type family IndexedCO ex a b :: * Source #

Either type indexed by closed/open using type families

Instances

type IndexedCO C a _b Source # 
type IndexedCO C a _b = a
type IndexedCO O _a b Source # 
type IndexedCO O _a b = b

data Shape ex where Source #

Dynamic shape value

Constructors

Closed :: Shape C 
Open :: Shape O 

Blocks

data Block n e x where Source #

A sequence of nodes. May be any of four shapes (OO, OC, CO, CC). Open at the entry means single entry, mutatis mutandis for exit. A closedclosed block is a basic/ block and can't be extended further. Clients should avoid manipulating blocks and should stick to either nodes or graphs.

Constructors

BlockCO :: n C O -> Block n O O -> Block n C O 
BlockCC :: n C O -> Block n O O -> n O C -> Block n C C 
BlockOC :: Block n O O -> n O C -> Block n O C 
BNil :: Block n O O 
BMiddle :: n O O -> Block n O O 
BCat :: Block n O O -> Block n O O -> Block n O O 
BSnoc :: Block n O O -> n O O -> Block n O O 
BCons :: n O O -> Block n O O -> Block n O O 

Instances

Predicates on Blocks

Constructing blocks

blockCons :: n O O -> Block n O x -> Block n O x Source #

blockSnoc :: Block n e O -> n O O -> Block n e O Source #

blockJoinHead :: n C O -> Block n O x -> Block n C x Source #

blockJoinTail :: Block n e O -> n O C -> Block n e C Source #

blockJoin :: n C O -> Block n O O -> n O C -> Block n C C Source #

blockJoinAny :: (MaybeC e (n C O), Block n O O, MaybeC x (n O C)) -> Block n e x Source #

Convert a list of nodes to a block. The entry and exit node must or must not be present depending on the shape of the block.

blockAppend :: Block n e O -> Block n O x -> Block n e x Source #

Deconstructing blocks

firstNode :: Block n C x -> n C O Source #

lastNode :: Block n x C -> n O C Source #

endNodes :: Block n C C -> (n C O, n O C) Source #

blockSplitHead :: Block n C x -> (n C O, Block n O x) Source #

blockSplitTail :: Block n e C -> (Block n e O, n O C) Source #

blockSplit :: Block n C C -> (n C O, Block n O O, n O C) Source #

Split a closed block into its entry node, open middle block, and exit node.

blockSplitAny :: Block n e x -> (MaybeC e (n C O), Block n O O, MaybeC x (n O C)) Source #

Modifying blocks

replaceFirstNode :: Block n C x -> n C O -> Block n C x Source #

replaceLastNode :: Block n x C -> n O C -> Block n x C Source #

Converting to and from lists

blockToList :: Block n O O -> [n O O] Source #

Maps and folds

mapBlock :: (forall e x. n e x -> n' e x) -> Block n e x -> Block n' e x Source #

map a function over the nodes of a Block

mapBlock' :: (forall e x. n e x -> n' e x) -> Block n e x -> Block n' e x Source #

A strict mapBlock

mapBlock3' :: forall n n' e x. (n C O -> n' C O, n O O -> n' O O, n O C -> n' O C) -> Block n e x -> Block n' e x Source #

map over a block, with different functions to apply to first nodes, middle nodes and last nodes respectively. The map is strict.

foldBlockNodesF :: forall n a. (forall e x. n e x -> a -> a) -> forall e x. Block n e x -> IndexedCO e a a -> IndexedCO x a a Source #

foldBlockNodesF3 :: forall n a b c. (n C O -> a -> b, n O O -> b -> b, n O C -> b -> c) -> forall e x. Block n e x -> IndexedCO e a b -> IndexedCO x c b Source #

Fold a function over every node in a block, forward or backward. The fold function must be polymorphic in the shape of the nodes.

foldBlockNodesB :: forall n a. (forall e x. n e x -> a -> a) -> forall e x. Block n e x -> IndexedCO x a a -> IndexedCO e a a Source #

foldBlockNodesB3 :: forall n a b c. (n C O -> b -> c, n O O -> b -> b, n O C -> a -> b) -> forall e x. Block n e x -> IndexedCO x a b -> IndexedCO e c b Source #

Biasing

frontBiasBlock :: Block n e x -> Block n e x Source #

A block is "front biased" if the left child of every concatenation operation is a node, not a general block; a front-biased block is analogous to an ordinary list. If a block is front-biased, then its nodes can be traversed from front to back without general recusion; tail recursion suffices. Not all shapes can be front-biased; a closed/open block is inherently back-biased.

backBiasBlock :: Block n e x -> Block n e x Source #

A block is "back biased" if the right child of every concatenation operation is a node, not a general block; a back-biased block is analogous to a snoc-list. If a block is back-biased, then its nodes can be traversed from back to back without general recusion; tail recursion suffices. Not all shapes can be back-biased; an open/closed block is inherently front-biased.

data AGraph n e x Source #

The type of abstract graphs. Offers extra "smart constructors" that may consume fresh labels during construction.

graphOfAGraph :: AGraph n e x -> forall m. UniqueMonad m => m (Graph n e x) Source #

Take an abstract AGraph and make a concrete (if monadic) Graph.

aGraphOfGraph :: Graph n e x -> AGraph n e x Source #

Take a graph and make it abstract.

(<*>) :: (GraphRep g, NonLocal n) => g n e O -> g n O x -> g n e x infixl 3 Source #

Concatenate two graphs; control flows from left to right.

(|*><*|) :: (GraphRep g, NonLocal n) => g n e C -> g n C x -> g n e x infixl 2 Source #

Splice together two graphs at a closed point; nothing is known about control flow.

catGraphs :: (GraphRep g, NonLocal n) => [g n O O] -> g n O O Source #

Conveniently concatenate a sequence of open/open graphs using <*>.

addEntrySeq :: NonLocal n => AGraph n O C -> AGraph n C x -> AGraph n O x Source #

Deprecated: use |*><*| instead

addExitSeq :: NonLocal n => AGraph n e C -> AGraph n C O -> AGraph n e O Source #

Deprecated: use |*><*| instead

addBlocks :: HooplNode n => AGraph n e x -> AGraph n C C -> AGraph n e x Source #

Extend an existing AGraph with extra basic blocks "out of line". No control flow is implied. Simon PJ should give example use case.

unionBlocks :: NonLocal n => AGraph n C C -> AGraph n C C -> AGraph n C C Source #

Deprecated: use |*><*| instead

emptyGraph :: GraphRep g => g n O O Source #

An empty graph that is open at entry and exit. It is the left and right identity of <*>.

emptyClosedGraph :: GraphRep g => g n C C Source #

An empty graph that is closed at entry and exit. It is the left and right identity of |*><*|.

withFresh :: Uniques u => (u -> AGraph n e x) -> AGraph n e x Source #

mkFirst :: GraphRep g => n C O -> g n C O Source #

Create a graph from a first node

mkMiddle :: GraphRep g => n O O -> g n O O Source #

Create a graph from a middle node

mkMiddles :: (GraphRep g, NonLocal n) => [n O O] -> g n O O Source #

Conveniently concatenate a sequence of middle nodes to form an open/open graph.

mkLast :: GraphRep g => n O C -> g n O C Source #

Create a graph from a last node

mkBranch :: (GraphRep g, HooplNode n) => Label -> g n O C Source #

Create a graph that branches to a label

mkLabel :: (GraphRep g, HooplNode n) => Label -> g n C O Source #

Create a graph that defines a label

mkWhileDo Source #

Arguments

:: HooplNode n 
=> (Label -> Label -> AGraph n O C)

loop condition

-> AGraph n O O

body of the loop

-> AGraph n O O

the final while loop

class IfThenElseable x where Source #

Minimal complete definition

mkIfThenElse

Methods

mkIfThenElse :: HooplNode n => (Label -> Label -> AGraph n O C) -> AGraph n O x -> AGraph n O x -> AGraph n O x Source #

Translate a high-level if-then-else construct into an AGraph. The condition takes as arguments labels on the true-false branch and returns a single-entry, two-exit graph which exits to the two labels.

Instances

IfThenElseable C Source # 

Methods

mkIfThenElse :: HooplNode n => (Label -> Label -> AGraph n O C) -> AGraph n O C -> AGraph n O C -> AGraph n O C Source #

IfThenElseable O Source # 

Methods

mkIfThenElse :: HooplNode n => (Label -> Label -> AGraph n O C) -> AGraph n O O -> AGraph n O O -> AGraph n O O Source #

mkEntry :: GraphRep g => Block n O C -> g n O C Source #

Create a graph containing only an entry sequence

mkExit :: GraphRep g => Block n C O -> g n C O Source #

Create a graph containing only an exit sequence

class NonLocal n => HooplNode n where Source #

For some graph-construction operations and some optimizations, Hoopl must be able to create control-flow edges using a given node type n.

Minimal complete definition

mkBranchNode, mkLabelNode

Methods

mkBranchNode :: Label -> n O C Source #

Create a branch node, the source of a control-flow edge.

mkLabelNode :: Label -> n C O Source #

Create a label node, the target (destination) of a control-flow edge.

Utilities for clients

firstXfer :: NonLocal n => (n C O -> f -> f) -> n C O -> FactBase f -> f Source #

A utility function so that a transfer function for a first node can be given just a fact; we handle the lookup. This function is planned to be made obsolete by changes in the dataflow interface.

distributeXfer :: NonLocal n => DataflowLattice f -> (n O C -> f -> f) -> n O C -> f -> FactBase f Source #

This utility function handles a common case in which a transfer function produces a single fact out of a last node, which is then distributed over the outgoing edges.

distributeFact :: NonLocal n => n O C -> f -> FactBase f Source #

This utility function handles a common case in which a transfer function for a last node takes the incoming fact unchanged and simply distributes that fact over the outgoing edges.

distributeFactBwd :: NonLocal n => n C O -> f -> FactBase f Source #

This utility function handles a common case in which a backward transfer function takes the incoming fact unchanged and tags it with the node's label.

successorFacts :: NonLocal n => n O C -> FactBase f -> [f] Source #

List of (unlabelled) facts from the successors of a last node

joinFacts :: DataflowLattice f -> Label -> [f] -> f Source #

Join a list of facts.

joinOutFacts :: NonLocal node => DataflowLattice f -> node O C -> FactBase f -> f Source #

Deprecated: should be replaced by 'joinFacts lat l (successorFacts n f)'; as is, it uses the wrong Label

joinMaps :: Ord k => JoinFun v -> JoinFun (Map k v) Source #

It's common to represent dataflow facts as a map from variables to some fact about the locations. For these maps, the join operation on the map can be expressed in terms of the join on each element of the codomain:

analyzeAndRewriteFwdBody :: forall m n f entries. (CheckpointMonad m, NonLocal n, LabelsPtr entries) => FwdPass m n f -> entries -> Body n -> FactBase f -> m (Body n, FactBase f) Source #

Forward dataflow analysis and rewriting for the special case of a Body. A set of entry points must be supplied; blocks not reachable from the set are thrown away.

analyzeAndRewriteBwdBody :: forall m n f entries. (CheckpointMonad m, NonLocal n, LabelsPtr entries) => BwdPass m n f -> entries -> Body n -> FactBase f -> m (Body n, FactBase f) Source #

Backward dataflow analysis and rewriting for the special case of a Body. A set of entry points must be supplied; blocks not reachable from the set are thrown away.

analyzeAndRewriteFwdOx :: forall m n f x. (CheckpointMonad m, NonLocal n) => FwdPass m n f -> Graph n O x -> f -> m (Graph n O x, FactBase f, MaybeO x f) Source #

Forward dataflow analysis and rewriting for the special case of a graph open at the entry. This special case relieves the client from having to specify a type signature for NothingO, which beginners might find confusing and experts might find annoying.

analyzeAndRewriteBwdOx :: forall m n f x. (CheckpointMonad m, NonLocal n) => BwdPass m n f -> Graph n O x -> Fact x f -> m (Graph n O x, FactBase f, f) Source #

Backward dataflow analysis and rewriting for the special case of a graph open at the entry. This special case relieves the client from having to specify a type signature for NothingO, which beginners might find confusing and experts might find annoying.

class IsSet set where Source #

Associated Types

type ElemOf set Source #

Methods

setNull :: set -> Bool Source #

setSize :: set -> Int Source #

setMember :: ElemOf set -> set -> Bool Source #

setEmpty :: set Source #

setSingleton :: ElemOf set -> set Source #

setInsert :: ElemOf set -> set -> set Source #

setDelete :: ElemOf set -> set -> set Source #

setUnion :: set -> set -> set Source #

setDifference :: set -> set -> set Source #

setIntersection :: set -> set -> set Source #

setIsSubsetOf :: set -> set -> Bool Source #

setFold :: (ElemOf set -> b -> b) -> b -> set -> b Source #

setElems :: set -> [ElemOf set] Source #

setFromList :: [ElemOf set] -> set Source #

Instances

IsSet UniqueSet Source # 
IsSet LabelSet Source # 

setInsertList :: IsSet set => [ElemOf set] -> set -> set Source #

setDeleteList :: IsSet set => [ElemOf set] -> set -> set Source #

setUnions :: IsSet set => [set] -> set Source #

class IsMap map where Source #

Associated Types

type KeyOf map Source #

Methods

mapNull :: map a -> Bool Source #

mapSize :: map a -> Int Source #

mapMember :: KeyOf map -> map a -> Bool Source #

mapLookup :: KeyOf map -> map a -> Maybe a Source #

mapFindWithDefault :: a -> KeyOf map -> map a -> a Source #

mapEmpty :: map a Source #

mapSingleton :: KeyOf map -> a -> map a Source #

mapInsert :: KeyOf map -> a -> map a -> map a Source #

mapInsertWith :: (a -> a -> a) -> KeyOf map -> a -> map a -> map a Source #

mapDelete :: KeyOf map -> map a -> map a Source #

mapUnion :: map a -> map a -> map a Source #

mapUnionWithKey :: (KeyOf map -> a -> a -> a) -> map a -> map a -> map a Source #

mapDifference :: map a -> map a -> map a Source #

mapIntersection :: map a -> map a -> map a Source #

mapIsSubmapOf :: Eq a => map a -> map a -> Bool Source #

mapMap :: (a -> b) -> map a -> map b Source #

mapMapWithKey :: (KeyOf map -> a -> b) -> map a -> map b Source #

mapFold :: (a -> b -> b) -> b -> map a -> b Source #

mapFoldWithKey :: (KeyOf map -> a -> b -> b) -> b -> map a -> b Source #

mapFilter :: (a -> Bool) -> map a -> map a Source #

mapElems :: map a -> [a] Source #

mapKeys :: map a -> [KeyOf map] Source #

mapToList :: map a -> [(KeyOf map, a)] Source #

mapFromList :: [(KeyOf map, a)] -> map a Source #

mapFromListWith :: (a -> a -> a) -> [(KeyOf map, a)] -> map a Source #

Instances

IsMap UniqueMap Source # 

Associated Types

type KeyOf (UniqueMap :: * -> *) :: * Source #

Methods

mapNull :: UniqueMap a -> Bool Source #

mapSize :: UniqueMap a -> Int Source #

mapMember :: KeyOf UniqueMap -> UniqueMap a -> Bool Source #

mapLookup :: KeyOf UniqueMap -> UniqueMap a -> Maybe a Source #

mapFindWithDefault :: a -> KeyOf UniqueMap -> UniqueMap a -> a Source #

mapEmpty :: UniqueMap a Source #

mapSingleton :: KeyOf UniqueMap -> a -> UniqueMap a Source #

mapInsert :: KeyOf UniqueMap -> a -> UniqueMap a -> UniqueMap a Source #

mapInsertWith :: (a -> a -> a) -> KeyOf UniqueMap -> a -> UniqueMap a -> UniqueMap a Source #

mapDelete :: KeyOf UniqueMap -> UniqueMap a -> UniqueMap a Source #

mapUnion :: UniqueMap a -> UniqueMap a -> UniqueMap a Source #

mapUnionWithKey :: (KeyOf UniqueMap -> a -> a -> a) -> UniqueMap a -> UniqueMap a -> UniqueMap a Source #

mapDifference :: UniqueMap a -> UniqueMap a -> UniqueMap a Source #

mapIntersection :: UniqueMap a -> UniqueMap a -> UniqueMap a Source #

mapIsSubmapOf :: Eq a => UniqueMap a -> UniqueMap a -> Bool Source #

mapMap :: (a -> b) -> UniqueMap a -> UniqueMap b Source #

mapMapWithKey :: (KeyOf UniqueMap -> a -> b) -> UniqueMap a -> UniqueMap b Source #

mapFold :: (a -> b -> b) -> b -> UniqueMap a -> b Source #

mapFoldWithKey :: (KeyOf UniqueMap -> a -> b -> b) -> b -> UniqueMap a -> b Source #

mapFilter :: (a -> Bool) -> UniqueMap a -> UniqueMap a Source #

mapElems :: UniqueMap a -> [a] Source #

mapKeys :: UniqueMap a -> [KeyOf UniqueMap] Source #

mapToList :: UniqueMap a -> [(KeyOf UniqueMap, a)] Source #

mapFromList :: [(KeyOf UniqueMap, a)] -> UniqueMap a Source #

mapFromListWith :: (a -> a -> a) -> [(KeyOf UniqueMap, a)] -> UniqueMap a Source #

IsMap LabelMap Source # 

Associated Types

type KeyOf (LabelMap :: * -> *) :: * Source #

Methods

mapNull :: LabelMap a -> Bool Source #

mapSize :: LabelMap a -> Int Source #

mapMember :: KeyOf LabelMap -> LabelMap a -> Bool Source #

mapLookup :: KeyOf LabelMap -> LabelMap a -> Maybe a Source #

mapFindWithDefault :: a -> KeyOf LabelMap -> LabelMap a -> a Source #

mapEmpty :: LabelMap a Source #

mapSingleton :: KeyOf LabelMap -> a -> LabelMap a Source #

mapInsert :: KeyOf LabelMap -> a -> LabelMap a -> LabelMap a Source #

mapInsertWith :: (a -> a -> a) -> KeyOf LabelMap -> a -> LabelMap a -> LabelMap a Source #

mapDelete :: KeyOf LabelMap -> LabelMap a -> LabelMap a Source #

mapUnion :: LabelMap a -> LabelMap a -> LabelMap a Source #

mapUnionWithKey :: (KeyOf LabelMap -> a -> a -> a) -> LabelMap a -> LabelMap a -> LabelMap a Source #

mapDifference :: LabelMap a -> LabelMap a -> LabelMap a Source #

mapIntersection :: LabelMap a -> LabelMap a -> LabelMap a Source #

mapIsSubmapOf :: Eq a => LabelMap a -> LabelMap a -> Bool Source #

mapMap :: (a -> b) -> LabelMap a -> LabelMap b Source #

mapMapWithKey :: (KeyOf LabelMap -> a -> b) -> LabelMap a -> LabelMap b Source #

mapFold :: (a -> b -> b) -> b -> LabelMap a -> b Source #

mapFoldWithKey :: (KeyOf LabelMap -> a -> b -> b) -> b -> LabelMap a -> b Source #

mapFilter :: (a -> Bool) -> LabelMap a -> LabelMap a Source #

mapElems :: LabelMap a -> [a] Source #

mapKeys :: LabelMap a -> [KeyOf LabelMap] Source #

mapToList :: LabelMap a -> [(KeyOf LabelMap, a)] Source #

mapFromList :: [(KeyOf LabelMap, a)] -> LabelMap a Source #

mapFromListWith :: (a -> a -> a) -> [(KeyOf LabelMap, a)] -> LabelMap a Source #

mapInsertList :: IsMap map => [(KeyOf map, a)] -> map a -> map a Source #

mapDeleteList :: IsMap map => [KeyOf map] -> map a -> map a Source #

mapUnions :: IsMap map => [map a] -> map a Source #

data DataflowLattice a Source #

A transfer function might want to use the logging flag to control debugging, as in for example, it updates just one element in a big finite map. We don't want Hoopl to show the whole fact, and only the transfer function knows exactly what changed.

Constructors

DataflowLattice 

Fields

type JoinFun a = Label -> OldFact a -> NewFact a -> (ChangeFlag, a) Source #

newtype OldFact a Source #

Constructors

OldFact a 

newtype NewFact a Source #

Constructors

NewFact a 

type family Fact x f :: * Source #

Instances

type Fact C f Source # 
type Fact C f = FactBase f
type Fact O f Source # 
type Fact O f = f

mkFactBase :: forall f. DataflowLattice f -> [(Label, f)] -> FactBase f Source #

mkFactBase creates a FactBase from a list of (Label, fact) pairs. If the same label appears more than once, the relevant facts are joined.

data FwdPass m n f Source #

Constructors

FwdPass 

newtype FwdTransfer n f Source #

Constructors

FwdTransfer3 

Fields

mkFTransfer :: (forall e x. n e x -> f -> Fact x f) -> FwdTransfer n f Source #

mkFTransfer3 :: (n C O -> f -> f) -> (n O O -> f -> f) -> (n O C -> f -> FactBase f) -> FwdTransfer n f Source #

newtype FwdRewrite m n f Source #

Constructors

FwdRewrite3 

Fields

mkFRewrite :: FuelMonad m => (forall e x. n e x -> f -> m (Maybe (Graph n e x))) -> FwdRewrite m n f Source #

Functions passed to mkFRewrite should not be aware of the fuel supply. The result returned by mkFRewrite respects fuel.

mkFRewrite3 :: forall m n f. FuelMonad m => (n C O -> f -> m (Maybe (Graph n C O))) -> (n O O -> f -> m (Maybe (Graph n O O))) -> (n O C -> f -> m (Maybe (Graph n O C))) -> FwdRewrite m n f Source #

Functions passed to mkFRewrite3 should not be aware of the fuel supply. The result returned by mkFRewrite3 respects fuel.

wrapFR Source #

Arguments

:: (forall e x. (n e x -> f -> m (Maybe (Graph n e x, FwdRewrite m n f))) -> n' e x -> f' -> m' (Maybe (Graph n' e x, FwdRewrite m' n' f')))

This argument may assume that any function passed to it respects fuel, and it must return a result that respects fuel.

-> FwdRewrite m n f 
-> FwdRewrite m' n' f' 

wrapFR2 Source #

Arguments

:: (forall e x. (n1 e x -> f1 -> m1 (Maybe (Graph n1 e x, FwdRewrite m1 n1 f1))) -> (n2 e x -> f2 -> m2 (Maybe (Graph n2 e x, FwdRewrite m2 n2 f2))) -> n3 e x -> f3 -> m3 (Maybe (Graph n3 e x, FwdRewrite m3 n3 f3)))

This argument may assume that any function passed to it respects fuel, and it must return a result that respects fuel.

-> FwdRewrite m1 n1 f1 
-> FwdRewrite m2 n2 f2 
-> FwdRewrite m3 n3 f3 

data BwdPass m n f Source #

Constructors

BwdPass 

newtype BwdTransfer n f Source #

Constructors

BwdTransfer3 

Fields

mkBTransfer :: (forall e x. n e x -> Fact x f -> f) -> BwdTransfer n f Source #

mkBTransfer3 :: (n C O -> f -> f) -> (n O O -> f -> f) -> (n O C -> FactBase f -> f) -> BwdTransfer n f Source #

wrapBR Source #

Arguments

:: (forall e x. Shape x -> (n e x -> Fact x f -> m (Maybe (Graph n e x, BwdRewrite m n f))) -> n' e x -> Fact x f' -> m' (Maybe (Graph n' e x, BwdRewrite m' n' f')))

This argument may assume that any function passed to it respects fuel, and it must return a result that respects fuel.

-> BwdRewrite m n f 
-> BwdRewrite m' n' f' 

wrapBR2 Source #

Arguments

:: (forall e x. Shape x -> (n1 e x -> Fact x f1 -> m1 (Maybe (Graph n1 e x, BwdRewrite m1 n1 f1))) -> (n2 e x -> Fact x f2 -> m2 (Maybe (Graph n2 e x, BwdRewrite m2 n2 f2))) -> n3 e x -> Fact x f3 -> m3 (Maybe (Graph n3 e x, BwdRewrite m3 n3 f3)))

This argument may assume that any function passed to it respects fuel, and it must return a result that respects fuel.

-> BwdRewrite m1 n1 f1 
-> BwdRewrite m2 n2 f2 
-> BwdRewrite m3 n3 f3 

newtype BwdRewrite m n f Source #

Constructors

BwdRewrite3 

Fields

mkBRewrite :: FuelMonad m => (forall e x. n e x -> Fact x f -> m (Maybe (Graph n e x))) -> BwdRewrite m n f Source #

Functions passed to mkBRewrite should not be aware of the fuel supply. The result returned by mkBRewrite respects fuel.

mkBRewrite3 :: forall m n f. FuelMonad m => (n C O -> f -> m (Maybe (Graph n C O))) -> (n O O -> f -> m (Maybe (Graph n O O))) -> (n O C -> FactBase f -> m (Maybe (Graph n O C))) -> BwdRewrite m n f Source #

Functions passed to mkBRewrite3 should not be aware of the fuel supply. The result returned by mkBRewrite3 respects fuel.

analyzeAndRewriteFwd :: forall m n f e x entries. (CheckpointMonad m, NonLocal n, LabelsPtr entries) => FwdPass m n f -> MaybeC e entries -> Graph n e x -> Fact e f -> m (Graph n e x, FactBase f, MaybeO x f) Source #

if the graph being analyzed is open at the entry, there must be no other entry point, or all goes horribly wrong...

analyzeAndRewriteBwd :: (CheckpointMonad m, NonLocal n, LabelsPtr entries) => BwdPass m n f -> MaybeC e entries -> Graph n e x -> Fact x f -> m (Graph n e x, FactBase f, MaybeO e f) Source #

if the graph being analyzed is open at the exit, I don't quite understand the implications of possible other exits

Respecting Fuel

A value of type FwdRewrite or BwdRewrite respects fuel if any function contained within the value satisfies the following properties:

  • When fuel is exhausted, it always returns Nothing.
  • When it returns Just g rw, it consumes exactly one unit of fuel, and new rewrite rw also respects fuel.

Provided that functions passed to mkFRewrite, mkFRewrite3, mkBRewrite, and mkBRewrite3 are not aware of the fuel supply, the results respect fuel.

It is an unchecked run-time error for the argument passed to wrapFR, wrapFR2, wrapBR, or warpBR2 to return a function that does not respect fuel.

data Label Source #

Instances

data LabelSet Source #

Instances

data LabelMap v Source #

Instances

Functor LabelMap Source # 

Methods

fmap :: (a -> b) -> LabelMap a -> LabelMap b #

(<$) :: a -> LabelMap b -> LabelMap a #

Foldable LabelMap Source # 

Methods

fold :: Monoid m => LabelMap m -> m #

foldMap :: Monoid m => (a -> m) -> LabelMap a -> m #

foldr :: (a -> b -> b) -> b -> LabelMap a -> b #

foldr' :: (a -> b -> b) -> b -> LabelMap a -> b #

foldl :: (b -> a -> b) -> b -> LabelMap a -> b #

foldl' :: (b -> a -> b) -> b -> LabelMap a -> b #

foldr1 :: (a -> a -> a) -> LabelMap a -> a #

foldl1 :: (a -> a -> a) -> LabelMap a -> a #

toList :: LabelMap a -> [a] #

null :: LabelMap a -> Bool #

length :: LabelMap a -> Int #

elem :: Eq a => a -> LabelMap a -> Bool #

maximum :: Ord a => LabelMap a -> a #

minimum :: Ord a => LabelMap a -> a #

sum :: Num a => LabelMap a -> a #

product :: Num a => LabelMap a -> a #

Traversable LabelMap Source # 

Methods

traverse :: Applicative f => (a -> f b) -> LabelMap a -> f (LabelMap b) #

sequenceA :: Applicative f => LabelMap (f a) -> f (LabelMap a) #

mapM :: Monad m => (a -> m b) -> LabelMap a -> m (LabelMap b) #

sequence :: Monad m => LabelMap (m a) -> m (LabelMap a) #

IsMap LabelMap Source # 

Associated Types

type KeyOf (LabelMap :: * -> *) :: * Source #

Methods

mapNull :: LabelMap a -> Bool Source #

mapSize :: LabelMap a -> Int Source #

mapMember :: KeyOf LabelMap -> LabelMap a -> Bool Source #

mapLookup :: KeyOf LabelMap -> LabelMap a -> Maybe a Source #

mapFindWithDefault :: a -> KeyOf LabelMap -> LabelMap a -> a Source #

mapEmpty :: LabelMap a Source #

mapSingleton :: KeyOf LabelMap -> a -> LabelMap a Source #

mapInsert :: KeyOf LabelMap -> a -> LabelMap a -> LabelMap a Source #

mapInsertWith :: (a -> a -> a) -> KeyOf LabelMap -> a -> LabelMap a -> LabelMap a Source #

mapDelete :: KeyOf LabelMap -> LabelMap a -> LabelMap a Source #

mapUnion :: LabelMap a -> LabelMap a -> LabelMap a Source #

mapUnionWithKey :: (KeyOf LabelMap -> a -> a -> a) -> LabelMap a -> LabelMap a -> LabelMap a Source #

mapDifference :: LabelMap a -> LabelMap a -> LabelMap a Source #

mapIntersection :: LabelMap a -> LabelMap a -> LabelMap a Source #

mapIsSubmapOf :: Eq a => LabelMap a -> LabelMap a -> Bool Source #

mapMap :: (a -> b) -> LabelMap a -> LabelMap b Source #

mapMapWithKey :: (KeyOf LabelMap -> a -> b) -> LabelMap a -> LabelMap b Source #

mapFold :: (a -> b -> b) -> b -> LabelMap a -> b Source #

mapFoldWithKey :: (KeyOf LabelMap -> a -> b -> b) -> b -> LabelMap a -> b Source #

mapFilter :: (a -> Bool) -> LabelMap a -> LabelMap a Source #

mapElems :: LabelMap a -> [a] Source #

mapKeys :: LabelMap a -> [KeyOf LabelMap] Source #

mapToList :: LabelMap a -> [(KeyOf LabelMap, a)] Source #

mapFromList :: [(KeyOf LabelMap, a)] -> LabelMap a Source #

mapFromListWith :: (a -> a -> a) -> [(KeyOf LabelMap, a)] -> LabelMap a Source #

Eq v => Eq (LabelMap v) Source # 

Methods

(==) :: LabelMap v -> LabelMap v -> Bool #

(/=) :: LabelMap v -> LabelMap v -> Bool #

Ord v => Ord (LabelMap v) Source # 

Methods

compare :: LabelMap v -> LabelMap v -> Ordering #

(<) :: LabelMap v -> LabelMap v -> Bool #

(<=) :: LabelMap v -> LabelMap v -> Bool #

(>) :: LabelMap v -> LabelMap v -> Bool #

(>=) :: LabelMap v -> LabelMap v -> Bool #

max :: LabelMap v -> LabelMap v -> LabelMap v #

min :: LabelMap v -> LabelMap v -> LabelMap v #

Show v => Show (LabelMap v) Source # 

Methods

showsPrec :: Int -> LabelMap v -> ShowS #

show :: LabelMap v -> String #

showList :: [LabelMap v] -> ShowS #

type KeyOf LabelMap Source # 

data Pointed t b a where Source #

Adds top, bottom, or both to help form a lattice

The type parameters t and b are used to say whether top and bottom elements have been added. The analogy with Block is nearly exact:

  • A Block is closed at the entry if and only if it has a first node; a Pointed is closed at the top if and only if it has a top element.
  • A Block is closed at the exit if and only if it has a last node; a Pointed is closed at the bottom if and only if it has a bottom element.

We thus have four possible types, of which three are interesting:

Pointed C C a
Type a extended with both top and bottom elements.
Pointed C O a
Type a extended with a top element only. (Presumably a comes equipped with a bottom element of its own.)
Pointed O C a
Type a extended with a bottom element only.
Pointed O O a
Isomorphic to a, and therefore not interesting.

The advantage of all this GADT-ishness is that the constructors Bot, Top, and PElem can all be used polymorphically.

A 'Pointed t b' type is an instance of Functor and Show.

Constructors

Bot :: Pointed t C a 
PElem :: a -> Pointed t b a 
Top :: Pointed C b a 

Instances

Functor (Pointed t b) Source # 

Methods

fmap :: (a -> b) -> Pointed t b a -> Pointed t b b #

(<$) :: a -> Pointed t b b -> Pointed t b a #

Eq a => Eq (Pointed t b a) Source # 

Methods

(==) :: Pointed t b a -> Pointed t b a -> Bool #

(/=) :: Pointed t b a -> Pointed t b a -> Bool #

Ord a => Ord (Pointed t b a) Source # 

Methods

compare :: Pointed t b a -> Pointed t b a -> Ordering #

(<) :: Pointed t b a -> Pointed t b a -> Bool #

(<=) :: Pointed t b a -> Pointed t b a -> Bool #

(>) :: Pointed t b a -> Pointed t b a -> Bool #

(>=) :: Pointed t b a -> Pointed t b a -> Bool #

max :: Pointed t b a -> Pointed t b a -> Pointed t b a #

min :: Pointed t b a -> Pointed t b a -> Pointed t b a #

Show a => Show (Pointed t b a) Source # 

Methods

showsPrec :: Int -> Pointed t b a -> ShowS #

show :: Pointed t b a -> String #

showList :: [Pointed t b a] -> ShowS #

addPoints :: String -> JoinFun a -> DataflowLattice (Pointed t C a) Source #

Given a join function and a name, creates a semi lattice by adding a bottom element, and possibly a top element also. A specialized version of addPoints'.

addPoints' :: forall a t. String -> (Label -> OldFact a -> NewFact a -> (ChangeFlag, Pointed t C a)) -> DataflowLattice (Pointed t C a) Source #

A more general case for creating a new lattice

addTop :: DataflowLattice a -> DataflowLattice (WithTop a) Source #

Given a join function and a name, creates a semi lattice by adding a top element but no bottom element. Caller must supply the bottom element.

addTop' :: forall a. String -> a -> (Label -> OldFact a -> NewFact a -> (ChangeFlag, WithTop a)) -> DataflowLattice (WithTop a) Source #

A more general case for creating a new lattice

extendJoinDomain :: forall a. (Label -> OldFact a -> NewFact a -> (ChangeFlag, WithTop a)) -> JoinFun (WithTop a) Source #

type WithTop a = Pointed C O a Source #

Type a with a top element adjoined

type WithBot a = Pointed O C a Source #

Type a with a bottom element adjoined

type WithTopAndBot a = Pointed C C a Source #

Type a with top and bottom elements adjoined

thenFwdRw :: forall m n f. Monad m => FwdRewrite m n f -> FwdRewrite m n f -> FwdRewrite m n f Source #

deepFwdRw3 :: FuelMonad m => (n C O -> f -> m (Maybe (Graph n C O))) -> (n O O -> f -> m (Maybe (Graph n O O))) -> (n O C -> f -> m (Maybe (Graph n O C))) -> FwdRewrite m n f Source #

deepFwdRw :: FuelMonad m => (forall e x. n e x -> f -> m (Maybe (Graph n e x))) -> FwdRewrite m n f Source #

iterFwdRw :: forall m n f. Monad m => FwdRewrite m n f -> FwdRewrite m n f Source #

thenBwdRw :: forall m n f. Monad m => BwdRewrite m n f -> BwdRewrite m n f -> BwdRewrite m n f Source #

deepBwdRw3 :: FuelMonad m => (n C O -> f -> m (Maybe (Graph n C O))) -> (n O O -> f -> m (Maybe (Graph n O O))) -> (n O C -> FactBase f -> m (Maybe (Graph n O C))) -> BwdRewrite m n f Source #

deepBwdRw :: FuelMonad m => (forall e x. n e x -> Fact x f -> m (Maybe (Graph n e x))) -> BwdRewrite m n f Source #

iterBwdRw :: forall m n f. Monad m => BwdRewrite m n f -> BwdRewrite m n f Source #

pairFwd :: forall m n f f'. Monad m => FwdPass m n f -> FwdPass m n f' -> FwdPass m n (f, f') Source #

pairBwd :: forall m n f f'. Monad m => BwdPass m n f -> BwdPass m n f' -> BwdPass m n (f, f') Source #

type Fuel = Int Source #

fuelRemaining :: FuelMonad m => m Fuel Source #

Find out how much fuel remains after a computation. Can be subtracted from initial fuel to get total consumption.

withFuel :: FuelMonad m => Maybe a -> m (Maybe a) Source #

class FuelMonadT fm where Source #

Minimal complete definition

runWithFuel, liftFuel

Methods

runWithFuel :: (Monad m, FuelMonad (fm m)) => Fuel -> fm m a -> m a Source #

liftFuel :: (Monad m, FuelMonad (fm m)) => m a -> fm m a Source #

data CheckingFuelMonad m a Source #

Instances

FuelMonadT CheckingFuelMonad Source # 
Monad m => Monad (CheckingFuelMonad m) Source # 
Monad m => Functor (CheckingFuelMonad m) Source # 

Methods

fmap :: (a -> b) -> CheckingFuelMonad m a -> CheckingFuelMonad m b #

(<$) :: a -> CheckingFuelMonad m b -> CheckingFuelMonad m a #

Monad m => Applicative (CheckingFuelMonad m) Source # 
CheckpointMonad m => CheckpointMonad (CheckingFuelMonad m) Source # 
UniqueMonad m => UniqueMonad (CheckingFuelMonad m) Source # 
Monad m => FuelMonad (CheckingFuelMonad m) Source # 
type Checkpoint (CheckingFuelMonad m) Source # 

data InfiniteFuelMonad m a Source #

Instances

FuelMonadT InfiniteFuelMonad Source # 
Monad m => Monad (InfiniteFuelMonad m) Source # 
Monad m => Functor (InfiniteFuelMonad m) Source # 

Methods

fmap :: (a -> b) -> InfiniteFuelMonad m a -> InfiniteFuelMonad m b #

(<$) :: a -> InfiniteFuelMonad m b -> InfiniteFuelMonad m a #

Monad m => Applicative (InfiniteFuelMonad m) Source # 
CheckpointMonad m => CheckpointMonad (InfiniteFuelMonad m) Source # 
UniqueMonad m => UniqueMonad (InfiniteFuelMonad m) Source # 
Monad m => FuelMonad (InfiniteFuelMonad m) Source # 
type Checkpoint (InfiniteFuelMonad m) Source # 

data UniqueSet Source #

data UniqueMap v Source #

Instances

Functor UniqueMap Source # 

Methods

fmap :: (a -> b) -> UniqueMap a -> UniqueMap b #

(<$) :: a -> UniqueMap b -> UniqueMap a #

Foldable UniqueMap Source # 

Methods

fold :: Monoid m => UniqueMap m -> m #

foldMap :: Monoid m => (a -> m) -> UniqueMap a -> m #

foldr :: (a -> b -> b) -> b -> UniqueMap a -> b #

foldr' :: (a -> b -> b) -> b -> UniqueMap a -> b #

foldl :: (b -> a -> b) -> b -> UniqueMap a -> b #

foldl' :: (b -> a -> b) -> b -> UniqueMap a -> b #

foldr1 :: (a -> a -> a) -> UniqueMap a -> a #

foldl1 :: (a -> a -> a) -> UniqueMap a -> a #

toList :: UniqueMap a -> [a] #

null :: UniqueMap a -> Bool #

length :: UniqueMap a -> Int #

elem :: Eq a => a -> UniqueMap a -> Bool #

maximum :: Ord a => UniqueMap a -> a #

minimum :: Ord a => UniqueMap a -> a #

sum :: Num a => UniqueMap a -> a #

product :: Num a => UniqueMap a -> a #

Traversable UniqueMap Source # 

Methods

traverse :: Applicative f => (a -> f b) -> UniqueMap a -> f (UniqueMap b) #

sequenceA :: Applicative f => UniqueMap (f a) -> f (UniqueMap a) #

mapM :: Monad m => (a -> m b) -> UniqueMap a -> m (UniqueMap b) #

sequence :: Monad m => UniqueMap (m a) -> m (UniqueMap a) #

IsMap UniqueMap Source # 

Associated Types

type KeyOf (UniqueMap :: * -> *) :: * Source #

Methods

mapNull :: UniqueMap a -> Bool Source #

mapSize :: UniqueMap a -> Int Source #

mapMember :: KeyOf UniqueMap -> UniqueMap a -> Bool Source #

mapLookup :: KeyOf UniqueMap -> UniqueMap a -> Maybe a Source #

mapFindWithDefault :: a -> KeyOf UniqueMap -> UniqueMap a -> a Source #

mapEmpty :: UniqueMap a Source #

mapSingleton :: KeyOf UniqueMap -> a -> UniqueMap a Source #

mapInsert :: KeyOf UniqueMap -> a -> UniqueMap a -> UniqueMap a Source #

mapInsertWith :: (a -> a -> a) -> KeyOf UniqueMap -> a -> UniqueMap a -> UniqueMap a Source #

mapDelete :: KeyOf UniqueMap -> UniqueMap a -> UniqueMap a Source #

mapUnion :: UniqueMap a -> UniqueMap a -> UniqueMap a Source #

mapUnionWithKey :: (KeyOf UniqueMap -> a -> a -> a) -> UniqueMap a -> UniqueMap a -> UniqueMap a Source #

mapDifference :: UniqueMap a -> UniqueMap a -> UniqueMap a Source #

mapIntersection :: UniqueMap a -> UniqueMap a -> UniqueMap a Source #

mapIsSubmapOf :: Eq a => UniqueMap a -> UniqueMap a -> Bool Source #

mapMap :: (a -> b) -> UniqueMap a -> UniqueMap b Source #

mapMapWithKey :: (KeyOf UniqueMap -> a -> b) -> UniqueMap a -> UniqueMap b Source #

mapFold :: (a -> b -> b) -> b -> UniqueMap a -> b Source #

mapFoldWithKey :: (KeyOf UniqueMap -> a -> b -> b) -> b -> UniqueMap a -> b Source #

mapFilter :: (a -> Bool) -> UniqueMap a -> UniqueMap a Source #

mapElems :: UniqueMap a -> [a] Source #

mapKeys :: UniqueMap a -> [KeyOf UniqueMap] Source #

mapToList :: UniqueMap a -> [(KeyOf UniqueMap, a)] Source #

mapFromList :: [(KeyOf UniqueMap, a)] -> UniqueMap a Source #

mapFromListWith :: (a -> a -> a) -> [(KeyOf UniqueMap, a)] -> UniqueMap a Source #

Eq v => Eq (UniqueMap v) Source # 

Methods

(==) :: UniqueMap v -> UniqueMap v -> Bool #

(/=) :: UniqueMap v -> UniqueMap v -> Bool #

Ord v => Ord (UniqueMap v) Source # 
Show v => Show (UniqueMap v) Source # 
type KeyOf UniqueMap Source # 

data UniqueMonadT m a Source #

Instances

Monad m => Monad (UniqueMonadT m) Source # 

Methods

(>>=) :: UniqueMonadT m a -> (a -> UniqueMonadT m b) -> UniqueMonadT m b #

(>>) :: UniqueMonadT m a -> UniqueMonadT m b -> UniqueMonadT m b #

return :: a -> UniqueMonadT m a #

fail :: String -> UniqueMonadT m a #

Monad m => Functor (UniqueMonadT m) Source # 

Methods

fmap :: (a -> b) -> UniqueMonadT m a -> UniqueMonadT m b #

(<$) :: a -> UniqueMonadT m b -> UniqueMonadT m a #

Monad m => Applicative (UniqueMonadT m) Source # 

Methods

pure :: a -> UniqueMonadT m a #

(<*>) :: UniqueMonadT m (a -> b) -> UniqueMonadT m a -> UniqueMonadT m b #

(*>) :: UniqueMonadT m a -> UniqueMonadT m b -> UniqueMonadT m b #

(<*) :: UniqueMonadT m a -> UniqueMonadT m b -> UniqueMonadT m a #

Monad m => UniqueMonad (UniqueMonadT m) Source # 

type TraceFn = forall a. String -> a -> a Source #

debugFwdJoins :: forall m n f. Show f => TraceFn -> ChangePred -> FwdPass m n f -> FwdPass m n f Source #

Debugging combinators: Each combinator takes a dataflow pass and produces a dataflow pass that can output debugging messages. You provide the function, we call it with the applicable message.

The most common use case is probably to:

  1. import Trace
  2. pass trace as the 1st argument to the debug combinator
  3. pass 'const true' as the 2nd argument to the debug combinator

There are two kinds of debugging messages for a join, depending on whether the join is higher in the lattice than the old fact: 1. If the join is higher, we show: + JoinL: f1 join f2 = f' where: + indicates a change L is the label where the join takes place f1 is the old fact at the label f2 is the new fact we are joining to f1 f' is the result of the join 2. _ JoinL: f2 <= f1 where: _ indicates no change L is the label where the join takes place f1 is the old fact at the label (which remains unchanged) f2 is the new fact we joined with f1

debugBwdJoins :: forall m n f. Show f => TraceFn -> ChangePred -> BwdPass m n f -> BwdPass m n f Source #

debugFwdTransfers :: forall m n f. Show f => TraceFn -> ShowN n -> FPred n f -> FwdPass m n f -> FwdPass m n f Source #

debugBwdTransfers :: forall m n f. Show f => TraceFn -> ShowN n -> BPred n f -> BwdPass m n f -> BwdPass m n f Source #

showGraph :: forall n e x. Showing n -> Graph n e x -> String Source #

type Showing n = forall e x. n e x -> String Source #