Difference between revisions of "Output/Input"
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+ | [[Category:Theoretical foundations]] |
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+ | |||
=== <u>Clearing away the smoke and mirrors</u> === |
=== <u>Clearing away the smoke and mirrors</u> === |
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</haskell> |
</haskell> |
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− | An <code>IO</code>computation is a function that (logically) takes the state of the world, and returns a modified world as well as the return value. Of course, GHC does not actually pass the world around; instead, it passes a dummy “token,” to ensure proper sequencing of actions in the presence of lazy evaluation, and performs input and output as actual side effects! |
+ | An <code>IO</code> computation is a function that (logically) takes the state of the world, and returns a modified world as well as the return value. Of course, GHC does not actually pass the world around; instead, it passes a dummy “token,” to ensure proper sequencing of actions in the presence of lazy evaluation, and performs input and output as actual side effects! |
<tt>[https://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.168.4008&rep=rep1&type=pdf A History of Haskell: Being Lazy With Class], Paul Hudak, John Hughes, Simon Peyton Jones and Philip Wadler.</tt> |
<tt>[https://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.168.4008&rep=rep1&type=pdf A History of Haskell: Being Lazy With Class], Paul Hudak, John Hughes, Simon Peyton Jones and Philip Wadler.</tt> |
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</haskell> |
</haskell> |
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− | + | The result (of type <code>a</code>) can then be returned directly: |
|
<haskell> |
<haskell> |
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</haskell> |
</haskell> |
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− | Why "approximately"? Because "logically" a function in Haskell has no observable effects. |
+ | <sub>Why <i>"approximately"</i>? Because <i>"logically"</i> a function in Haskell has no observable effects.</sub> |
---- |
---- |
||
=== <u>Previously seen</u> === |
=== <u>Previously seen</u> === |
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− | + | The type <code>() -> a</code> (or variations of it) have appeared elsewhere - examples include: |
|
* page 2 of 13 in [https://fi.ort.edu.uy/innovaportal/file/20124/1/22-landin_correspondence-between-algol-60-and-churchs-lambda-notation.pdf A Correspondence Between ALGOL 60 and Church's Lambda-Notation: Part I] by Peter Landin: |
* page 2 of 13 in [https://fi.ort.edu.uy/innovaportal/file/20124/1/22-landin_correspondence-between-algol-60-and-churchs-lambda-notation.pdf A Correspondence Between ALGOL 60 and Church's Lambda-Notation: Part I] by Peter Landin: |
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<haskell> |
<haskell> |
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(\ () -> …) :: () -> a |
(\ () -> …) :: () -> a |
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+ | </haskell> |
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+ | |} |
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+ | |||
+ | * page 148 of 168 in [https://web.archive.org/web/20021107080915/https://www.cl.cam.ac.uk/techreports/UCAM-CL-TR-285.pdf Functional programming and Input/Output] by Andrew Gordon: |
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+ | :{| |
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+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | <pre> |
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+ | abstype 'a Job = JOB of unit -> 'a |
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+ | </pre> |
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+ | </div> |
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+ | <sup> </sup> |
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+ | <haskell> |
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+ | data Job a = JOB (() -> a) |
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</haskell> |
</haskell> |
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|} |
|} |
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|} |
|} |
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− | * [https://image.slidesharecdn.com/lazyio-120422092926-phpapp01/95/lazy-io-15-728.jpg page 15] of ''Non-Imperative Functional Programming |
+ | * [https://image.slidesharecdn.com/lazyio-120422092926-phpapp01/95/lazy-io-15-728.jpg page 15] of ''Non-Imperative Functional Programming'' by Nobuo Yamashita: |
:{| |
:{| |
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<haskell> |
<haskell> |
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data Time_ a = GetCurrentTime (UTCTime -> a) |
data Time_ a = GetCurrentTime (UTCTime -> a) |
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+ | </haskell> |
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+ | |} |
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+ | * [http://h2.jaguarpaw.co.uk/posts/impure-lazy-language An impure lazy programming language], also by Tom Ellis: |
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− | data Lock_ a = AcquireLock (Maybe Lock -> a) NominalDiffTime Key |
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+ | |||
− | | RenewLock (Maybe Lock -> a) NominalDiffTime Lock |
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+ | :{| |
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− | | ReleaseLock (() -> a) Lock |
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+ | <haskell> |
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+ | data IO a = IO (() -> a) |
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</haskell> |
</haskell> |
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|} |
|} |
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− | * page 2 of [https://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.128.9269&rep=rep1&type=pdf Unique Identifiers in Pure Functional Languages] by Péter Diviánszky |
+ | * page 2 of [https://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.128.9269&rep=rep1&type=pdf Unique Identifiers in Pure Functional Languages] by Péter Diviánszky: |
:{| |
:{| |
||
|<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
|<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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type Create a = Id -> a |
type Create a = Id -> a |
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</haskell> |
</haskell> |
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+ | |} |
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+ | |||
+ | * page 7 of [https://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.701.930&rep=rep1&type=pdf Functional Reactive Animation] by Conal Elliott and Paul Hudak: |
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+ | :{| |
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+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | An early implementation of Fran represented behaviors as implied in the formal semantics: |
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+ | <haskell> |
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+ | data Behavior a = Behavior (Time -> a) |
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+ | </haskell> |
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+ | </div> |
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|} |
|} |
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:{| |
:{| |
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|<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
|<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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− | The type <code>'a io</code> is represented by a function expecting a dummy argument of type unit and returning a value of type <code>'a</code>. |
+ | The type <code>'a io</code> is represented by a function expecting a dummy argument of type <code>unit</code> and returning a value of type <code>'a</code>. |
<pre> |
<pre> |
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type 'a io = unit -> a |
type 'a io = unit -> a |
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<haskell> |
<haskell> |
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type Io a = () -> a |
type Io a = () -> a |
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+ | </haskell> |
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+ | |} |
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+ | |||
+ | * The [https://www.vex.net/~trebla/haskell/IO.xhtml Haskell I/O Tutorial] by Albert Lai: |
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+ | :{| |
||
+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | But I can already tell you why we cannot follow other languages and use simply <code>X</code> or <code>() -> X</code>. |
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+ | </div> |
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+ | |} |
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+ | |||
+ | * [http://comonad.com/reader/2011/free-monads-for-less-3 Free Monads for Less (Part 3 of 3): Yielding IO] by Edward Kmett: |
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+ | :{| |
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+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | <haskell> |
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+ | newtype OI a = forall o i. OI (FFI o i) o (i -> a) deriving Functor |
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+ | </haskell> |
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+ | </div> |
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+ | <sup> </sup> |
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+ | <haskell> |
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+ | type Oi a = forall i . i -> a |
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+ | </haskell> |
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+ | |} |
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+ | |||
+ | * page 27 of [https://blog.higher-order.com/assets/scalaio.pdf Purely Functional I/O in Scala] by Rúnar Bjarnason: |
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+ | :{| |
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+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | <pre> |
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+ | class IO[A](run: () => A) |
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+ | </pre> |
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+ | </div> |
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+ | <sup> </sup> |
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+ | <haskell> |
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+ | class Io a where run :: () -> a |
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+ | </haskell> |
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+ | |} |
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+ | |||
+ | * [http://www.fssnip.net/6i/title/Tiny-IO-Monad igeta's snippet]: |
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+ | :{| |
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+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | <pre> |
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+ | type IO<'T> = private | Action of (unit -> 'T) |
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+ | </pre> |
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+ | </div> |
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+ | <sup> </sup> |
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+ | <haskell> |
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+ | data IO t = Action (() -> t) |
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</haskell> |
</haskell> |
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|} |
|} |
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|} |
|} |
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+ | * [https://stackoverflow.com/questions/51770808/how-exactly-does-ios-work-under-the-hood/51772273#51772273 chi's answer] to [https://stackoverflow.com/questions/51770808/how-exactly-does-ios-work-under-the-hood this SO question]: |
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− | Of these, it is the implementation of <code>OI a</code> in Yamashita's [https://hackage.haskell.org/package/oi oi] package which is most interesting as its values are ''monousal'' - once used, their contents remain constant. This single-use property also appears in the implementation of the abstract <code>decision</code> type described by F. Warren Burton in [https://academic.oup.com/comjnl/article-pdf/31/3/243/1157325/310243.pdf Nondeterminism with Referential Transparency in Functional Programming Languages]. |
||
+ | :{| |
||
+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | As long as we have its special case <code>IO c = () ~> c</code>, we can represent (up to isomorphism) […] <code>a ~> c</code> […] |
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+ | </div> |
||
+ | |} |
||
+ | |||
+ | * [https://luxlang.blogspot.com/2016/01/monads-io-and-concurrency-in-lux.html Monads, I/O and Concurrency in Lux] by Eduardo Julián: |
||
+ | :{| |
||
+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | <pre> |
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+ | (deftype #export (IO a) |
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+ | (-> Void a)) |
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+ | </pre> |
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+ | </div> |
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+ | <sup> </sup> |
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+ | <haskell> |
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+ | type IO a = (->) Void a |
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+ | </haskell> |
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+ | |} |
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+ | |||
+ | * [https://mperry.github.io/2014/01/03/referentially-transparent-io.html Referentially Transparent Input/Output in Groovy] by Mark Perry: |
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+ | :{| |
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+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | <pre> |
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+ | abstract class SimpleIO<A> { |
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+ | abstract A run() |
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+ | } |
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+ | </pre> |
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+ | </div> |
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+ | <sup> </sup> |
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+ | <haskell> |
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+ | class SimpleIO a where |
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+ | run :: () -> a |
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+ | </haskell> |
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+ | |} |
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+ | |||
+ | * [https://github.com/php-fp/php-fp-io#readme The <code>IO</code> Monad for PHP] by Tom Harding: |
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+ | :{| |
||
+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | <pre> |
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+ | __construct :: (-> a) -> IO a |
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+ | </pre> |
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+ | [...] The parameter to the constructor must be a zero-parameter [none-adic] function that returns a value. |
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+ | </div> |
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+ | <sup> </sup> |
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+ | <haskell> |
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+ | data IO a = IO (() -> a) |
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+ | __construct :: (() -> a) -> IO a |
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+ | __construct = IO |
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+ | </haskell> |
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+ | |} |
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+ | |||
+ | * [https://medium.com/@luijar/the-observable-disguised-as-an-io-monad-c89042aa8f31 The Observable disguised as an IO Monad] by Luis Atencio: |
||
+ | :{| |
||
+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | <code>IO</code> is a very simple monad that implements a slightly modified version of our abstract interface with the difference that instead of wrapping a value <code>a</code>, it wraps a side effect function <code>() -> a</code>. |
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+ | </div> |
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+ | <sup> </sup> |
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+ | <haskell> |
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+ | data IO a = Wrap (() -> a) |
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+ | </haskell> |
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+ | |} |
||
+ | |||
+ | * [https://weblogs.asp.net/dixin/category-theory-via-c-sharp-18-more-monad-io-monad More Monad: <code>IO<></code> Monad], from [https://weblogs.asp.net/dixin/Tags/Category%20Theory dixin's Category Theory via C#] series: |
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+ | :{| |
||
+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | The definition of <code>IO<></code> is simple: |
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+ | <pre> |
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+ | public delegate T IO<out T>(); |
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+ | </pre> |
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+ | [...] |
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+ | * <code>IO<T></code> is used to represent a impure function. When a <code>IO<T></code> function is applied, it returns a <code>T</code> value, with side effects. |
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+ | </div> |
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+ | <sup> </sup> |
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+ | <haskell> |
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+ | type IO t = () -> t |
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+ | </haskell> |
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+ | |} |
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+ | |||
+ | * [https://discuss.ocaml.org/t/io-monad-for-ocaml/4618/11 ivg's post] in [https://discuss.ocaml.org/t/io-monad-for-ocaml/4618 <code>IO</code> Monad for OCaml] |
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+ | :{| |
||
+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | So let’s implement the <code>IO</code> Monad right now and here. Given that OCaml is strict and that the order of function applications imposes the order of evaluation, the <code>IO</code> Monad is just a thunk, e.g., |
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+ | <pre> |
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+ | type 'a io = unit -> 'a |
||
+ | </pre> |
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+ | </div> |
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+ | <sup> </sup> |
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+ | <haskell> |
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+ | type Io a = () -> a |
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+ | </haskell> |
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+ | |} |
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+ | |||
+ | * [https://arrow-kt.io/docs/effects/io Why <code>suspend</code> over <code>IO</code>] in [https://arrow-kt.io/docs/fx Arrow Fx]: |
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+ | :{| |
||
+ | |<div style="border-left:1px solid lightgray; padding: 1em" alt="blockquote"> |
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+ | [...] So <code>suspend () -> A</code> offers us the exact same guarantees as <code>IO<A></code>. |
||
+ | </div> |
||
+ | |} |
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+ | |||
+ | Of these, it is the [https://hackage.haskell.org/package/oi/docs/src/Data-OI-Internal.html#OI implementation of <code>OI a</code>] in Yamashita's [https://hackage.haskell.org/package/oi oi] package which is most interesting as its values are ''monousal'' - once used, their contents remain constant. This single-use property also appears in the implementation of the abstract <code>decision</code> type described by F. Warren Burton in [https://academic.oup.com/comjnl/article-pdf/31/3/243/1157325/310243.pdf Nondeterminism with Referential Transparency in Functional Programming Languages]. |
||
---- |
---- |
||
=== <code>IO</code><u>, redefined</u> === |
=== <code>IO</code><u>, redefined</u> === |
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− | Based on these and other observations, a reasonable |
+ | Based on these and other observations, a reasonable distillment of these examples would be <code>OI -> a</code>, which then implies: |
<haskell> |
<haskell> |
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</haskell> |
</haskell> |
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− | Of course, in an actual implementation <code>OI</code> would be abstract like <code>World</code>, and for similar reasons. This |
+ | Of course, in an actual implementation <code>OI</code> would be abstract like <code>World</code>, and for similar reasons. This permits a simpler implementation for <code>OI</code> and its values, instead of being based on (theoretically) infinite structured values like binary trees. That simplicity has benefits for the <code>OI</code> interface, in this case: |
<haskell> |
<haskell> |
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</haskell> |
</haskell> |
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<sup> </sup> |
<sup> </sup> |
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− | |||
− | ---- |
||
− | |||
− | === <u>Various questions</u> === |
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− | |||
− | * Is the C language purely functional? |
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− | |||
− | ::No. C was never intended to be [[Referential transparency|referentially transparent]]. |
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− | |||
− | * Can functional programming be liberated from the von Neumann paradigm? |
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− | |||
− | ::That remains an [[Open research problems|open research problem]]. |
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− | |||
− | * Is Haskell a purely functional language? |
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− | |||
− | ::No. Since the advent of <code>ST</code> (and <code>runST</code> in particular) supposedly-pure definitions can be implemented imperatively using encapsulated state - read [https://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.52.3656&rep=rep1&type=pdf State in Haskell] by John Launchbury and Simon Peyton Jones for the details. |
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− | |||
− | * Why do our programs need to read input and write output? |
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− | |||
− | ::Because programs are usually written for [https://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.628.7053&rep=rep1&type=pdf practical] purposes, such as implementing domain-specific [https://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.7.2089&rep=rep1&type=pdf little languages]. |
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---- |
---- |
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=== <u>See also</u> === |
=== <u>See also</u> === |
||
+ | * [https://pqnelson.github.io/2021/07/29/monadic-io-in-ml.html Monadic IO in Standard ML] |
||
− | * [[IO, partible-style]] |
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+ | * [[Disposing of dismissives]] |
||
* [[IO then abstraction]] |
* [[IO then abstraction]] |
||
+ | * [https://okmij.org/ftp/Computation/IO-monad-history.html The IO monad in 1965] |
Revision as of 04:27, 9 June 2022
Clearing away the smoke and mirrors
The implementation in GHC uses the following one:
type IO a = World -> (a, World)
An IO
computation is a function that (logically) takes the state of the world, and returns a modified world as well as the return value. Of course, GHC does not actually pass the world around; instead, it passes a dummy “token,” to ensure proper sequencing of actions in the presence of lazy evaluation, and performs input and output as actual side effects!
A History of Haskell: Being Lazy With Class, Paul Hudak, John Hughes, Simon Peyton Jones and Philip Wadler.
...so what starts out as an I/O action of type:
World -> (a, World)
is changed by GHC to approximately:
() -> (a, ())
The result (of type a
) can then be returned directly:
() -> a
Why "approximately"? Because "logically" a function in Haskell has no observable effects.
Previously seen
The type () -> a
(or variations of it) have appeared elsewhere - examples include:
- page 2 of 13 in A Correspondence Between ALGOL 60 and Church's Lambda-Notation: Part I by Peter Landin:
The use of
λ
, and in particular (to avoid an irrelevant bound variable) ofλ()
, to delay and possibly avoid evaluation is exploited repeatedly in our model of ALGOL 60. A function that requires an argument-list of length zero is called a none-adic function.(\ () -> …) :: () -> a
- page 148 of 168 in Functional programming and Input/Output by Andrew Gordon:
abstype 'a Job = JOB of unit -> 'a
data Job a = JOB (() -> a)
- page 3 of Assignments for Applicative Languages by Vipin Swarup, Uday S. Reddy and Evan Ireland:
A value of type
Obs 𝜏
is called an observer. Such a value observes (i.e. views or inspects) a state and returns a value of type𝜏
. [...] An observer typeObs 𝜏
may be viewed as an implicit function space from the set of states to the type𝜏
.type Obs tau = State -> tau
- page 15 of Non-Imperative Functional Programming by Nobuo Yamashita:
type a :-> b = OI a -> b
- MTL style for free by Tom Ellis:
data Time_ a = GetCurrentTime (UTCTime -> a)
- An impure lazy programming language, also by Tom Ellis:
data IO a = IO (() -> a)
- page 2 of Unique Identifiers in Pure Functional Languages by Péter Diviánszky:
[...] The type
Id
can be hidden by the synonym data type:: Create a :== Id -> a
type Create a = Id -> a
- page 7 of Functional Reactive Animation by Conal Elliott and Paul Hudak:
An early implementation of Fran represented behaviors as implied in the formal semantics:
data Behavior a = Behavior (Time -> a)
- page 26 of How to Declare an Imperative by Philip Wadler:
The type
'a io
is represented by a function expecting a dummy argument of typeunit
and returning a value of type'a
.type 'a io = unit -> a
type Io a = () -> a
- The Haskell I/O Tutorial by Albert Lai:
But I can already tell you why we cannot follow other languages and use simply
X
or() -> X
.
- Free Monads for Less (Part 3 of 3): Yielding IO by Edward Kmett:
newtype OI a = forall o i. OI (FFI o i) o (i -> a) deriving Functor
type Oi a = forall i . i -> a
- page 27 of Purely Functional I/O in Scala by Rúnar Bjarnason:
class IO[A](run: () => A)
class Io a where run :: () -> a
type IO<'T> = private | Action of (unit -> 'T)
data IO t = Action (() -> t)
Let's say you want to implement
IO
in SML :structure Io : MONAD = struct type 'a t = unit -> 'a ⋮ end
type T a = () -> a
newtype IO a = IO { runIO :: () -> a }
newtype Supply r a = Supply { runSupply :: r -> a }
As long as we have its special case
IO c = () ~> c
, we can represent (up to isomorphism) […]a ~> c
[…]
- Monads, I/O and Concurrency in Lux by Eduardo Julián:
(deftype #export (IO a) (-> Void a))
type IO a = (->) Void a
- Referentially Transparent Input/Output in Groovy by Mark Perry:
abstract class SimpleIO<A> { abstract A run() }
class SimpleIO a where run :: () -> a
- The
IO
Monad for PHP by Tom Harding:
__construct :: (-> a) -> IO a
[...] The parameter to the constructor must be a zero-parameter [none-adic] function that returns a value.
data IO a = IO (() -> a) __construct :: (() -> a) -> IO a __construct = IO
- The Observable disguised as an IO Monad by Luis Atencio:
IO
is a very simple monad that implements a slightly modified version of our abstract interface with the difference that instead of wrapping a valuea
, it wraps a side effect function() -> a
.data IO a = Wrap (() -> a)
- More Monad:
IO<>
Monad, from dixin's Category Theory via C# series:
The definition of
IO<>
is simple:public delegate T IO<out T>();
[...]
IO<T>
is used to represent a impure function. When aIO<T>
function is applied, it returns aT
value, with side effects.
type IO t = () -> t
So let’s implement the
IO
Monad right now and here. Given that OCaml is strict and that the order of function applications imposes the order of evaluation, theIO
Monad is just a thunk, e.g.,type 'a io = unit -> 'a
type Io a = () -> a
[...] So
suspend () -> A
offers us the exact same guarantees asIO<A>
.
Of these, it is the implementation of OI a
in Yamashita's oi package which is most interesting as its values are monousal - once used, their contents remain constant. This single-use property also appears in the implementation of the abstract decision
type described by F. Warren Burton in Nondeterminism with Referential Transparency in Functional Programming Languages.
IO
, redefined
Based on these and other observations, a reasonable distillment of these examples would be OI -> a
, which then implies:
type IO a = OI -> a
Using Burton's pseudodata approach:
-- abstract; single-use I/O-access mediator
data Exterior
getchar :: Exterior -> Char
putchar :: Char -> Exterior -> ()
-- from section 2 of Burton's paper
data Tree a = Node { contents :: a,
left :: Tree a,
right :: Tree a }
-- utility definitions
type OI = Tree Exterior
getChar' :: OI -> Char
getChar' = getchar . contents
putChar' :: Char -> OI -> ()
putChar' c = putchar c . contents
part :: OI -> (OI, OI)
parts :: OI -> [OI]
part t = (left t, right t)
parts t = let !(t1, t2) = part t in
t1 : parts t2
Of course, in an actual implementation OI
would be abstract like World
, and for similar reasons. This permits a simpler implementation for OI
and its values, instead of being based on (theoretically) infinite structured values like binary trees. That simplicity has benefits for the OI
interface, in this case:
data OI
part :: OI -> (OI, OI)
getChar' :: OI -> Char
putChar' :: Char -> OI -> ()