Safe Haskell | None |
---|---|
Language | Haskell2010 |
This module defines the FactorialMonoid
class and some of its instances.
- class MonoidNull m => FactorialMonoid m where
- factors :: m -> [m]
- primePrefix :: m -> m
- primeSuffix :: m -> m
- splitPrimePrefix :: m -> Maybe (m, m)
- splitPrimeSuffix :: m -> Maybe (m, m)
- foldl :: (a -> m -> a) -> a -> m -> a
- foldl' :: (a -> m -> a) -> a -> m -> a
- foldr :: (m -> a -> a) -> a -> m -> a
- length :: m -> Int
- foldMap :: (FactorialMonoid m, Monoid n) => (m -> n) -> m -> n
- span :: (m -> Bool) -> m -> (m, m)
- break :: FactorialMonoid m => (m -> Bool) -> m -> (m, m)
- split :: (m -> Bool) -> m -> [m]
- takeWhile :: FactorialMonoid m => (m -> Bool) -> m -> m
- dropWhile :: FactorialMonoid m => (m -> Bool) -> m -> m
- splitAt :: Int -> m -> (m, m)
- drop :: FactorialMonoid m => Int -> m -> m
- take :: FactorialMonoid m => Int -> m -> m
- reverse :: FactorialMonoid m => m -> m
- class (FactorialMonoid m, PositiveMonoid m) => StableFactorialMonoid m
- mapM :: (FactorialMonoid a, Monoid b, Monad m) => (a -> m b) -> a -> m b
- mapM_ :: (FactorialMonoid a, Monad m) => (a -> m b) -> a -> m ()
Classes
class MonoidNull m => FactorialMonoid m where Source
Class of monoids that can be split into irreducible (i.e., atomic or prime) factors
in a unique way. Factors of
a Product
are literally its prime factors:
factors (Product 12) == [Product 2, Product 2, Product 3]
Factors of a list are not its elements but all its single-item sublists:
factors "abc" == ["a", "b", "c"]
The methods of this class satisfy the following laws:
mconcat . factors == id null == List.null . factors List.all (\prime-> factors prime == [prime]) . factors factors == unfoldr splitPrimePrefix == List.reverse . unfoldr (fmap swap . splitPrimeSuffix) reverse == mconcat . List.reverse . factors primePrefix == maybe mempty fst . splitPrimePrefix primeSuffix == maybe mempty snd . splitPrimeSuffix foldl f a == List.foldl f a . factors foldl' f a == List.foldl' f a . factors foldr f a == List.foldr f a . factors span p m == (mconcat l, mconcat r) where (l, r) = List.span p (factors m) List.all (List.all (not . pred) . factors) . split pred mconcat . intersperse prime . split (== prime) == id splitAt i m == (mconcat l, mconcat r) where (l, r) = List.splitAt i (factors m)
A minimal instance definition must implement factors
or splitPrimePrefix
. Other methods are provided and should
be implemented only for performance reasons.
Nothing
Returns a list of all prime factors; inverse of mconcat.
primePrefix :: m -> m Source
The prime prefix, mempty
if none.
primeSuffix :: m -> m Source
The prime suffix, mempty
if none.
splitPrimePrefix :: m -> Maybe (m, m) Source
splitPrimeSuffix :: m -> Maybe (m, m) Source
foldl :: (a -> m -> a) -> a -> m -> a Source
foldl' :: (a -> m -> a) -> a -> m -> a Source
foldr :: (m -> a -> a) -> a -> m -> a Source
The length
of the list of primes
.
foldMap :: (FactorialMonoid m, Monoid n) => (m -> n) -> m -> n Source
Generalizes foldMap
from Data.Foldable, except the function arguments are prime factors rather than the
structure elements.
span :: (m -> Bool) -> m -> (m, m) Source
break :: FactorialMonoid m => (m -> Bool) -> m -> (m, m) Source
split :: (m -> Bool) -> m -> [m] Source
Splits the monoid into components delimited by prime separators satisfying the given predicate. The primes satisfying the predicate are not a part of the result.
takeWhile :: FactorialMonoid m => (m -> Bool) -> m -> m Source
dropWhile :: FactorialMonoid m => (m -> Bool) -> m -> m Source
splitAt :: Int -> m -> (m, m) Source
drop :: FactorialMonoid m => Int -> m -> m Source
take :: FactorialMonoid m => Int -> m -> m Source
reverse :: FactorialMonoid m => m -> m Source
FactorialMonoid () | |
FactorialMonoid ByteString | |
FactorialMonoid ByteString | |
FactorialMonoid IntSet | |
FactorialMonoid Text | |
FactorialMonoid Text | |
FactorialMonoid ByteStringUTF8 | |
FactorialMonoid [x] | |
FactorialMonoid a => FactorialMonoid (Dual a) | |
(Integral a, Eq a) => FactorialMonoid (Sum a) | |
Integral a => FactorialMonoid (Product a) | |
FactorialMonoid a => FactorialMonoid (Maybe a) | |
FactorialMonoid (IntMap a) | |
Ord a => FactorialMonoid (Set a) | |
FactorialMonoid (Seq a) | |
FactorialMonoid (Vector a) | |
FactorialMonoid a => FactorialMonoid (Concat a) | |
StableFactorialMonoid a => FactorialMonoid (Measured a) | |
(FactorialMonoid a, FactorialMonoid b) => FactorialMonoid (a, b) | |
Ord k => FactorialMonoid (Map k v) |
class (FactorialMonoid m, PositiveMonoid m) => StableFactorialMonoid m Source
A subclass of FactorialMonoid
whose instances satisfy this additional law:
factors (a <> b) == factors a <> factors b
Monad function equivalents
mapM_ :: (FactorialMonoid a, Monad m) => (a -> m b) -> a -> m () Source
A mapM_
equivalent.