Difference between revisions of "Monad/ST"
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{{Standard class|ST|module=Control.Monad.ST|module-doc=Control-Monad-ST|package=base}} | {{Standard class|ST|module=Control.Monad.ST|module-doc=Control-Monad-ST|package=base}} | ||
− | The ST | + | The monadic <code>ST</code> type provides support for ''strict'' state threads. |
==A discussion on the Haskell irc == | ==A discussion on the Haskell irc == | ||
From #haskell (see 13:05:37 in the [http://tunes.org/~nef/logs/haskell/07.02.07 log] ): | From #haskell (see 13:05:37 in the [http://tunes.org/~nef/logs/haskell/07.02.07 log] ): | ||
− | + | <tt> | |
* TuringTest: ST lets you implement algorithms that are much more efficient with mutable memory used internally. But the whole "thread" of computation cannot exchange mutable state with the outside world, it can only exchange immutable state. | * TuringTest: ST lets you implement algorithms that are much more efficient with mutable memory used internally. But the whole "thread" of computation cannot exchange mutable state with the outside world, it can only exchange immutable state. | ||
Line 12: | Line 12: | ||
* sjanssen: a monad that has mutable references and arrays, but has a "run" function that is referentially transparent | * sjanssen: a monad that has mutable references and arrays, but has a "run" function that is referentially transparent | ||
− | |||
− | |||
* DapperDan2: it strikes me that ST is like a lexical scope, where all the variables/state disappear when the function returns. | * DapperDan2: it strikes me that ST is like a lexical scope, where all the variables/state disappear when the function returns. | ||
+ | </tt> | ||
[[Category:Standard classes]] [[Category:Monad]] | [[Category:Standard classes]] [[Category:Monad]] | ||
− | |||
==An explanation in Haskell-Cafe== | ==An explanation in Haskell-Cafe== | ||
− | The ST | + | The ST type lets you use update-in-place, but is escapable (unlike <code>IO</code>). |
− | ST actions have the form: | + | <code>ST</code> actions have the form: |
<haskell> | <haskell> | ||
Line 28: | Line 26: | ||
</haskell> | </haskell> | ||
− | Meaning that they return a value of type α, and execute in "thread" s. | + | Meaning that they return a value of type <code>α</code>, and execute in "thread" <code>s</code>. All reference types are tagged with the thread, so that actions can only affect references in their own "thread". |
− | All reference types are tagged with the thread, so that actions can only | ||
− | affect references in their own "thread". | ||
− | Now, the type of the function used to escape ST is: | + | Now, the type of the function used to escape <code>ST</code> is: |
<haskell> | <haskell> | ||
Line 38: | Line 34: | ||
</haskell> | </haskell> | ||
− | The action you pass must be universal in s, so inside your action you | + | The action you pass must be universal in <code>s</code>, so inside your action you don't know what thread, thus you cannot access any other threads, thus <hask>runST</hask> is pure. This is very useful, since it allows you to implement externally pure things like in-place quicksort, and present them as pure functions <code>∀ e. Ord e ⇒ Array e → Array e</code>; without using any unsafe definitions. |
− | don't know what thread, thus you cannot access any other threads, thus | ||
− | <hask>runST</hask> is pure. This is very useful, since it allows you to implement | ||
− | externally pure things like in-place quicksort, and present them as pure | ||
− | functions ∀ e. Ord e ⇒ Array e → Array e; without using any unsafe | ||
− | |||
− | But that type of <hask>runST</hask> is illegal in Haskell-98, because it needs a | + | But that type of <hask>runST</hask> is illegal in Haskell-98, because it needs a universal quantifier ''inside'' the function-arrow! In the jargon, that type has rank 2; Haskell-98 types may have rank at most 1. |
− | universal quantifier | ||
− | type has rank 2; | ||
See http://www.haskell.org/pipermail/haskell-cafe/2007-July/028233.html | See http://www.haskell.org/pipermail/haskell-cafe/2007-July/028233.html | ||
− | |||
− | |||
− | |||
− | |||
== A few simple examples == | == A few simple examples == | ||
− | In this example, we define a version of the function sum, but do it in a way which more like how it would be done in imperative languages, where a variable is updated, rather than a new value is formed and passed to the next iteration of the function. While in place modifications of the STRef n are occurring, something that would usually be considered a side effect, it is all done in a safe way which is deterministic. The result is that we get the benefits of being able to modify memory in place, while still producing a pure function with the use of runST. | + | In this example, we define a version of the function <code>sum</code>, but do it in a way which more like how it would be done in imperative languages, where a variable is updated, rather than a new value is formed and passed to the next iteration of the function. While in-place modifications of the <code>STRef</code> <code>n</code> are occurring, something that would usually be considered a side effect, it is all done in a safe way which is deterministic. The result is that we get the benefits of being able to modify memory in-place, while still producing a pure function with the use of <code>runST</code>. |
<haskell> | <haskell> | ||
Line 78: | Line 63: | ||
</haskell> | </haskell> | ||
− | An implementation of foldl using | + | An implementation of <code>foldl</code> using <code>ST</code> (a lot like <code>sum</code>, and in fact <code>sum</code> can be defined in terms of <code>foldlST</code>): |
<haskell> | <haskell> | ||
Line 93: | Line 78: | ||
</haskell> | </haskell> | ||
− | An example of the Fibonacci function running in | + | An example of the Fibonacci function running in constant¹ space: |
<haskell> | <haskell> | ||
Line 110: | Line 95: | ||
y' <- readSTRef y | y' <- readSTRef y | ||
writeSTRef x y' | writeSTRef x y' | ||
− | writeSTRef y | + | writeSTRef y $! x'+y' |
fibST' (n-1) x y | fibST' (n-1) x y | ||
</haskell> | </haskell> | ||
− | + | ||
+ | <sup>[1] Since we're using <code>Integers</code>, technically it's not constant space, as they grow in size when they get bigger, but we can ignore this</sup>. | ||
+ | |||
+ | == References == | ||
+ | * [https://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.50.3299&rep=rep1&type=pdf Lazy Functional State Threads], John Launchbury and Simon Peyton Jones (the authors of [https://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.52.3656&rep=rep1&type=pdf State in Haskell]). | ||
+ | * [https://hackage.haskell.org/package/base/docs/Control-Monad-ST.html Control.Monad.ST] in the base libraries |
Latest revision as of 05:38, 4 August 2021
import Control.Monad.ST |
The monadic ST
type provides support for strict state threads.
Contents
A discussion on the Haskell irc
From #haskell (see 13:05:37 in the log ):
- TuringTest: ST lets you implement algorithms that are much more efficient with mutable memory used internally. But the whole "thread" of computation cannot exchange mutable state with the outside world, it can only exchange immutable state.
- TuringTest: chessguy: You pass in normal Haskell values and then use ST to allocate mutable memory, then you initialize and play with it, then you put it away and return a normal Haskell value.
- sjanssen: a monad that has mutable references and arrays, but has a "run" function that is referentially transparent
- DapperDan2: it strikes me that ST is like a lexical scope, where all the variables/state disappear when the function returns.
An explanation in Haskell-Cafe
The ST type lets you use update-in-place, but is escapable (unlike IO
).
ST
actions have the form:
ST s α
Meaning that they return a value of type α
, and execute in "thread" s
. All reference types are tagged with the thread, so that actions can only affect references in their own "thread".
Now, the type of the function used to escape ST
is:
runST :: forall α. (forall s. ST s α) -> α
The action you pass must be universal in s
, so inside your action you don't know what thread, thus you cannot access any other threads, thus runST
is pure. This is very useful, since it allows you to implement externally pure things like in-place quicksort, and present them as pure functions ∀ e. Ord e ⇒ Array e → Array e
; without using any unsafe definitions.
But that type of runST
is illegal in Haskell-98, because it needs a universal quantifier inside the function-arrow! In the jargon, that type has rank 2; Haskell-98 types may have rank at most 1.
See http://www.haskell.org/pipermail/haskell-cafe/2007-July/028233.html
A few simple examples
In this example, we define a version of the function sum
, but do it in a way which more like how it would be done in imperative languages, where a variable is updated, rather than a new value is formed and passed to the next iteration of the function. While in-place modifications of the STRef
n
are occurring, something that would usually be considered a side effect, it is all done in a safe way which is deterministic. The result is that we get the benefits of being able to modify memory in-place, while still producing a pure function with the use of runST
.
import Control.Monad.ST
import Data.STRef
import Control.Monad
sumST :: Num a => [a] -> a
sumST xs = runST $ do -- runST takes out stateful code and makes it pure again.
n <- newSTRef 0 -- Create an STRef (place in memory to store values)
forM_ xs $ \x -> do -- For each element of xs ..
modifySTRef n (+x) -- add it to what we have in n.
readSTRef n -- read the value of n, and return it.
An implementation of foldl
using ST
(a lot like sum
, and in fact sum
can be defined in terms of foldlST
):
foldlST :: (a -> b -> a) -> a -> [b] -> a
foldlST f acc xs = runST $ do
acc' <- newSTRef acc -- Create a variable for the accumulator
forM_ xs $ \x -> do -- For each x in xs...
a <- readSTRef acc' -- read the accumulator
writeSTRef acc' (f a x) -- apply f to the accumulator and x
readSTRef acc' -- and finally read the result
An example of the Fibonacci function running in constant¹ space:
fibST :: Integer -> Integer
fibST n =
if n < 2
then n
else runST $ do
x <- newSTRef 0
y <- newSTRef 1
fibST' n x y
where fibST' 0 x _ = readSTRef x
fibST' n x y = do
x' <- readSTRef x
y' <- readSTRef y
writeSTRef x y'
writeSTRef y $! x'+y'
fibST' (n-1) x y
^{[1] Since we're using Integers, technically it's not constant space, as they grow in size when they get bigger, but we can ignore this}.
References
- Lazy Functional State Threads, John Launchbury and Simon Peyton Jones (the authors of State in Haskell).
- Control.Monad.ST in the base libraries