Copyright | (c) 2016-2019 Rudy Matela |
---|---|
License | 3-Clause BSD (see the file LICENSE) |
Maintainer | Rudy Matela <rudy@matela.com.br> |
Safe Haskell | Safe-Inferred |
Language | Haskell2010 |
This module is part of Speculate.
Main engine to process data.
Synopsis
- expansions :: Instances -> Int -> Expr -> [Expr]
- expansionsOfType :: Expr -> [String] -> Expr -> [Expr]
- expansionsWith :: [Expr] -> Expr -> [Expr]
- theoryAndRepresentativesFromAtoms :: (Expr -> Expr -> Bool) -> Int -> [[Expr]] -> (Thy, [[Expr]])
- representativesFromAtoms :: (Expr -> Expr -> Bool) -> Int -> [[Expr]] -> [[Expr]]
- theoryFromAtoms :: (Expr -> Expr -> Bool) -> Int -> [[Expr]] -> Thy
- theoryAndRepresentativesFromAtomsKeeping :: (Expr -> Bool) -> (Expr -> Expr -> Bool) -> Int -> [[Expr]] -> (Thy, [[Expr]])
- representativesFromAtomsKeeping :: (Expr -> Bool) -> (Expr -> Expr -> Bool) -> Int -> [[Expr]] -> [[Expr]]
- theoryFromAtomsKeeping :: (Expr -> Bool) -> (Expr -> Expr -> Bool) -> Int -> [[Expr]] -> Thy
- equivalencesBetween :: (Expr -> Expr -> Bool) -> Expr -> Expr -> [(Expr, Expr)]
- consider :: (Expr -> Expr -> Bool) -> Int -> Expr -> (Thy, [[Expr]]) -> (Thy, [[Expr]])
- distinctFromSchemas :: Instances -> Int -> Int -> Thy -> [Expr] -> [Expr]
- classesFromSchemas :: Instances -> Int -> Int -> Thy -> [Expr] -> [Class Expr]
- classesFromSchemasAndVariables :: Thy -> [Expr] -> [Expr] -> [Class Expr]
- semiTheoryFromThyAndReps :: Instances -> Int -> Int -> Thy -> [Expr] -> Shy
- conditionalTheoryFromThyAndReps :: Instances -> Int -> Int -> Int -> Thy -> [Expr] -> Chy
- conditionalEquivalences :: ((Expr, Expr, Expr) -> Bool) -> (Expr -> Expr -> Expr -> Bool) -> (Expr -> Expr -> Bool) -> Int -> Thy -> [Class Expr] -> [Class Expr] -> Chy
- subConsequence :: Thy -> [Class Expr] -> Expr -> Expr -> Expr -> Bool
- psortBy :: (a -> a -> Bool) -> [a] -> [(a, a)]
- module Test.Speculate.Expr
Documentation
expansions :: Instances -> Int -> Expr -> [Expr] Source #
List all variable assignments for a given number of variables. It only assign variables to holes (variables with "" as its name).
> expansions preludeInstances 2 '(_ + _ + ord _) [ (x + x) + ord c :: Int , (x + x) + ord d :: Int , (x + y) + ord c :: Int , (x + y) + ord d :: Int , (y + x) + ord c :: Int , (y + x) + ord d :: Int , (y + y) + ord c :: Int , (y + y) + ord d :: Int ]
expansionsOfType :: Expr -> [String] -> Expr -> [Expr] Source #
List all variable assignments for a given type and list of variables.
theoryAndRepresentativesFromAtoms :: (Expr -> Expr -> Bool) -> Int -> [[Expr]] -> (Thy, [[Expr]]) Source #
theoryFromAtoms :: (Expr -> Expr -> Bool) -> Int -> [[Expr]] -> Thy Source #
Computes a theory from atomic expressions. Example:
> theoryFromAtoms 5 (const True) (equal preludeInstances 100) > [hole (undefined :: Int),constant "+" ((+) :: Int -> Int -> Int)] Thy { rules = [ (x + y) + z == x + (y + z) ] , equations = [ y + x == x + y , y + (x + z) == x + (y + z) , z + (x + y) == x + (y + z) , z + (y + x) == x + (y + z) ] , canReduceTo = (|>) , closureLimit = 2 , keepE = keepUpToLength 5 }
theoryAndRepresentativesFromAtomsKeeping :: (Expr -> Bool) -> (Expr -> Expr -> Bool) -> Int -> [[Expr]] -> (Thy, [[Expr]]) Source #
Given atomic expressions, compute theory and representative schema
expressions. (cf. theoryFromAtoms
)
representativesFromAtomsKeeping :: (Expr -> Bool) -> (Expr -> Expr -> Bool) -> Int -> [[Expr]] -> [[Expr]] Source #
theoryFromAtomsKeeping :: (Expr -> Bool) -> (Expr -> Expr -> Bool) -> Int -> [[Expr]] -> Thy Source #
conditionalEquivalences :: ((Expr, Expr, Expr) -> Bool) -> (Expr -> Expr -> Expr -> Bool) -> (Expr -> Expr -> Bool) -> Int -> Thy -> [Class Expr] -> [Class Expr] -> Chy Source #
subConsequence :: Thy -> [Class Expr] -> Expr -> Expr -> Expr -> Bool Source #
Is the equation a consequence of substitution? > subConsequence (x == y) (x + y) (x + x) == True > subConsequence (x <= y) (x + y) (x + x) == False -- not sub > subConsequence (abs x == abs y) (abs x) (abs y) == True > subConsequence (abs x == 1) (x + abs x) (20) == False (artificial)
module Test.Speculate.Expr