Safe Haskell | Safe-Inferred |
---|---|
Language | Haskell2010 |
Synopsis
- iterWhile :: (b -> Bool) -> (a -> (b, a)) -> a -> [(b, a)]
- repeatWhile :: (a -> (Bool, a)) -> a -> a
- repeatWhileM :: Monad m => (a -> m (Bool, a)) -> a -> m a
- trampolineWhile :: (a -> (Bool, a)) -> a -> a
- trampolineWhileM :: Monad m => (a -> m (Bool, a)) -> a -> m a
- trampoline :: (a -> Either b a) -> a -> b
- trampolineM :: Monad m => (a -> m (Either b a)) -> a -> m b
- iterateUntil :: (a -> a -> Bool) -> (a -> a) -> a -> a
- iterateUntilM :: Monad m => (a -> a -> Bool) -> (a -> m a) -> a -> m a
- iterate' :: Integral i => i -> (a -> a) -> a -> a
- applyWhen :: IsBool b => b -> (a -> a) -> a -> a
- applyUnless :: IsBool b => b -> (a -> a) -> a -> a
- applyWhenM :: (IsBool b, Monad m) => m b -> (m a -> m a) -> m a -> m a
- applyUnlessM :: (IsBool b, Monad m) => m b -> (m a -> m a) -> m a -> m a
Documentation
iterWhile :: (b -> Bool) -> (a -> (b, a)) -> a -> [(b, a)] Source #
Repeat a state transition f :: a -> (b, a)
with output b
while condition cond
on the output is true.
Return all intermediate results and the final result
where cond
is False
.
Postconditions (when it terminates):
fst (last (iterWhile cond f a)) == False
.
all fst (init (interWhile cond f a))
.
repeatWhile :: (a -> (Bool, a)) -> a -> a Source #
Repeat something while a condition on some state is true. Return the last state (including the changes of the last transition, even if the condition became false then).
repeatWhileM :: Monad m => (a -> m (Bool, a)) -> a -> m a Source #
Monadic version of repeatWhile
.
trampolineWhile :: (a -> (Bool, a)) -> a -> a Source #
A version of the trampoline function.
The usual function iterates f :: a -> Maybe a
as long
as Just{}
is returned, and returns the last value of a
upon Nothing
.
usualTrampoline f = trampolineWhile $ a -> maybe (False,a) (True,) (f a)
.
trampolineWhile
is very similar to repeatWhile
, only that
it discards the state on which the condition went False
,
and returns the last state on which the condition was True
.
trampolineWhileM :: Monad m => (a -> m (Bool, a)) -> a -> m a Source #
Monadic version of trampolineWhile
.
trampoline :: (a -> Either b a) -> a -> b Source #
More general trampoline, which allows some final computation
from iteration state a
into result type b
.
trampolineM :: Monad m => (a -> m (Either b a)) -> a -> m b Source #
Monadic version of trampoline
.
iterateUntil :: (a -> a -> Bool) -> (a -> a) -> a -> a Source #
Iteration to fixed-point.
iterateUntil r f a0
iterates endofunction f
, starting with a0
,
until r
relates its result to its input, i.e., f a
.r
a
This is the generic pattern behind saturation algorithms.
If f
is monotone with regard to r
,
meaning a
implies r
bf a
,
and r
f bf
-chains starting with a0
are finite
then iteration is guaranteed to terminate.
A typical instance will work on sets, and r
could be set inclusion,
and a0
the empty set, and f
the step function of a saturation algorithm.
iterateUntilM :: Monad m => (a -> a -> Bool) -> (a -> m a) -> a -> m a Source #
Monadic version of iterateUntil
.
iterate' :: Integral i => i -> (a -> a) -> a -> a Source #
applies iterate'
n f xf
to x
n
times and returns the
result.
The applications are calculated strictly.
Iteration over Booleans.
applyUnless :: IsBool b => b -> (a -> a) -> a -> a Source #
applyUnless b f a
applies f
to a
unless b
.
applyWhenM :: (IsBool b, Monad m) => m b -> (m a -> m a) -> m a -> m a Source #
Monadic version of applyWhen
applyUnlessM :: (IsBool b, Monad m) => m b -> (m a -> m a) -> m a -> m a Source #
Monadic version of applyUnless