Difference between revisions of "TypeCompose"
m |
m |
||
(23 intermediate revisions by 4 users not shown) | |||
Line 1: | Line 1: | ||
+ | [[Category:Applicative Functor]] |
||
+ | [[Category:Libraries]] |
||
+ | [[Category:Packages]] |
||
+ | [[Category:Type-level programming]] |
||
+ | |||
== Abstract == |
== Abstract == |
||
− | '''TypeCompose''' provides some classes & instances for forms of type composition |
+ | '''TypeCompose''' provides some classes & instances for forms of type composition, as well as some modules that haven't found another home. |
+ | Besides this wiki page, here are more ways to find out about TypeCompose: |
||
− | * Read [http://darcs.haskell.org/packages/TypeCompose/doc/html the Haddock docs] (with source code, additional examples, and Comment/Talk links). |
||
+ | * Visit the [http://hackage.haskell.org/cgi-bin/hackage-scripts/package/TypeCompose Hackage page] for library documentation and to download & install. |
||
− | * Get the code repository: '''<tt>darcs get http://darcs.haskell.org/packages/TypeCompose</tt>''', or |
||
+ | * Or install with <tt>cabal install TypeCompose</tt>. |
||
− | * Grab a [http://darcs.haskell.org/packages/TypeCompose/dist distribution tarball]. |
||
− | * |
+ | * Get the code repository: <tt>git clone git@github.com:conal/TypeCompose.git</tt>. |
+ | <!--* See the [[TypeCompose/Versions| version history]].--> |
||
− | |||
− | TypeCompose is used in [[Phooey]], a functional GUI library. |
||
== Type composition == |
== Type composition == |
||
+ | The <hask>Control.Compose</hask> module includes |
||
− | == Data-driven computation == |
||
+ | * Various type compositions (unary/unary, binary/unary, etc). Most are from [http://www.soi.city.ac.uk/~ross/papers/Applicative.html Applicative Programming with Effects]. In particular, <hask>g `O` f</hask> composes functors in to functors and applicative functors (AFs) into AFs. (In contrast, monads do not in general compose.) Composition makes AF-based programming simple and elegant, partly because we don't need an AF counterpart to monad transformers. |
||
+ | * Cofunctors (contravariant functors). Great for "consumer" types, just as functors suit "producer" (container) types. There are several composition options. |
||
+ | * Type argument flip. Handy for cofunctors: use <hask>Flip (->) o</hask>, for <hask>(-> o)</hask>. |
||
+ | * Constructor in pairs: <hask>(f a, g a)</hask>. |
||
+ | * Constructor in arrows/functions: <hask>f a ~> g a</hask>. |
||
+ | |||
+ | == Other features == |
||
+ | |||
+ | === Composable bijections === |
||
+ | |||
+ | Given all the type constructors and compositions of them, I found myself writing some pretty awkward code to wrap & unwrap through multiple layers. Composable bijections help a lot. |
||
+ | |||
+ | The <hask>Data.Bijection</hask> module is inspired by [http://citeseer.ist.psu.edu/alimarine05there.html There and Back Again: Arrows for Invertible Programming], though done here in a less general setting. |
||
+ | |||
+ | === Pair- & function-like types === |
||
+ | |||
+ | The <hask>Data.Zip</hask> and <hask>Data.Lambda</hask> patterns emerged while working on [[DeepArrow]] and [[Eros]]. <hask>Data.Zip</hask> generalizes <hask>zip</hask> and <hask>unzip</hask> from <hask>[]</hask> to other functors. It also provides variants of type <hask>f a -> f (a,b)</hask> and <hask>f a -> f (a,b)</hask>. <hask>Data.Lambda</hask> is similar with classes for lambda-like constructions. |
||
+ | |||
+ | For example uses of <hask>Pair</hask> and <hask>Lambda</hask>, see [[TV]] and [[Eros]]. |
||
+ | |||
+ | === References === |
||
+ | |||
+ | Monads with references. Direct rip-off from [http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.23.145 Global Variables in Haskell]. |
||
+ | |||
+ | === Titling === |
||
+ | |||
+ | For giving titles to things. I know it sounds kind of random. More useful than I first thought. Used in [[Phooey]], [[TV]], and [[Eros]]. |
||
+ | |||
+ | === Partial values === |
||
+ | |||
+ | A monoid of partial values. See the [http://conal.net/blog/posts/a-type-for-partial-values/ teaser] and [http://conal.net/blog/posts/implementing-a-type-for-partial-values/ solution] blog |
||
+ | posts. |
||
+ | |||
+ | === Context-dependent monoids === |
||
+ | |||
+ | Bit of an oddball also. <hask>Data.CxMonoid</hask> defines a sort of meta-monoid, that can be supplied dynamically with choices of <hask>mempty</hask> and <hask>mappend</hask>. Used in [[Phooey]] (starting with version 1.3) so that layout could be a monoid but still vary in style. |
Latest revision as of 22:44, 29 June 2021
Abstract
TypeCompose provides some classes & instances for forms of type composition, as well as some modules that haven't found another home.
Besides this wiki page, here are more ways to find out about TypeCompose:
- Visit the Hackage page for library documentation and to download & install.
- Or install with cabal install TypeCompose.
- Get the code repository: git clone git@github.com:conal/TypeCompose.git.
Type composition
The Control.Compose
module includes
- Various type compositions (unary/unary, binary/unary, etc). Most are from Applicative Programming with Effects. In particular,
g `O` f
composes functors in to functors and applicative functors (AFs) into AFs. (In contrast, monads do not in general compose.) Composition makes AF-based programming simple and elegant, partly because we don't need an AF counterpart to monad transformers. - Cofunctors (contravariant functors). Great for "consumer" types, just as functors suit "producer" (container) types. There are several composition options.
- Type argument flip. Handy for cofunctors: use
Flip (->) o
, for(-> o)
. - Constructor in pairs:
(f a, g a)
. - Constructor in arrows/functions:
f a ~> g a
.
Other features
Composable bijections
Given all the type constructors and compositions of them, I found myself writing some pretty awkward code to wrap & unwrap through multiple layers. Composable bijections help a lot.
The Data.Bijection
module is inspired by There and Back Again: Arrows for Invertible Programming, though done here in a less general setting.
Pair- & function-like types
The Data.Zip
and Data.Lambda
patterns emerged while working on DeepArrow and Eros. Data.Zip
generalizes zip
and unzip
from []
to other functors. It also provides variants of type f a -> f (a,b)
and f a -> f (a,b)
. Data.Lambda
is similar with classes for lambda-like constructions.
For example uses of Pair
and Lambda
, see TV and Eros.
References
Monads with references. Direct rip-off from Global Variables in Haskell.
Titling
For giving titles to things. I know it sounds kind of random. More useful than I first thought. Used in Phooey, TV, and Eros.
Partial values
A monoid of partial values. See the teaser and solution blog posts.
Context-dependent monoids
Bit of an oddball also. Data.CxMonoid
defines a sort of meta-monoid, that can be supplied dynamically with choices of mempty
and mappend
. Used in Phooey (starting with version 1.3) so that layout could be a monoid but still vary in style.