timhwang21/combinators.js

## combinators.js
const I = x => x;
const K = x => y => x;
const A = f => x => f(x);
const T = x => f => f(x);
const W = f => x => f(x)(x);
const C = f => y => x => f(x)(y);
const B = f => g => x => f(g(x));
const S = f => g => x => f(x)(g(x));
const P = f => g => x => y => f(g(x))(g(y));
const Y = f => (g => g(g))(g => f(x => g(g)(x)));

## combinators.md

      
    Raw
  

              combinators.md
            
          
Name
#
Haskell
Ramda
Sanctuary
Signature


identity
I
id
identity
I
a → a


constant
K
const
always
K
a → b → a


apply¹
A
($)
call

(a → b) → a → b


thrush
T
(&)
applyTo
T
a → (a → b) → b


duplication
W
join²
unnest²
join²
(a → a → b) → a → b


flip
C
flip
flip
flip
(a → b → c) → b → a → c


compose
B
(.), fmap²
map²
compose, map²
(b → c) → (a → b) → a → c


substitution
S
ap²
ap²
ap²
(a → b → c) → (a → b) → a → c


psi
P
on

on
(b → b → c) → (a → b) → a → a → c


fix-point³
Y
fix


(a → a) → a


¹) The A-combinator can be implemented as an alias of the I-combinator.
Its implementation in Haskell exists because the infix nature gives it
some utility. Its implementation in Ramda exists because it is
overloaded with additional functionality.
²) Algebras like ap have different implementations for different types.
They work like Function combinators only for Function inputs.
³) In JavaScript and other non-lazy languages, it is impossible to implement the
Y-combinator. Instead a variant known as the applicative or strict
fix-point combinator is implemented. This variant is sometimes rererred to as
the Z-combinator.

  
## references.md

      
    Raw
  

              references.md
            
          
    Note that when I use the word "combinator" in this context, it implies "function combinator in the untyped lambda calculus".

To Mock a Mocking Bird (book of combinatory puzzles and examples)
Combinator Birds (summary of all combinators named by the book)
CombinatorsJS (implementation of all the same combinators in JavaScripts)
Fantasy Combinators (implementation of common combinators in JavaScript)
Collected Lambdas (collection of noteworthy combinators)
Programming With Nothing (talk)
Church Encoding (wikipedia)
Fixed-point combinator (wikipedia)
Lambda calculus (wikipedia)
SKI combinator calculus (wikipedia)
BCKW combinator calculus (wikipedia)
	const I = x => x;
	const K = x => y => x;
	const A = f => x => f(x);
	const T = x => f => f(x);
	const W = f => x => f(x)(x);
	const C = f => y => x => f(x)(y);
	const B = f => g => x => f(g(x));
	const S = f => g => x => f(x)(g(x));
	const P = f => g => x => y => f(g(x))(g(y));
	const Y = f => (g => g(g))(g => f(x => g(g)(x)));
Name	#	Haskell	Ramda	Sanctuary	Signature
identity	I	`id`	`identity`	`I`	`a → a`
constant	K	`const`	`always`	`K`	`a → b → a`
apply¹	A	`($)`	`call`		`(a → b) → a → b`
thrush	T	`(&)`	`applyTo`	`T`	`a → (a → b) → b`
duplication	W	`join`²	`unnest`²	`join`²	`(a → a → b) → a → b`
flip	C	`flip`	`flip`	`flip`	`(a → b → c) → b → a → c`
compose	B	`(.)`, `fmap`²	`map`²	`compose`, `map`²	`(b → c) → (a → b) → a → c`
substitution	S	`ap`²	`ap`²	`ap`²	`(a → b → c) → (a → b) → a → c`
psi	P	`on`		`on`	`(b → b → c) → (a → b) → a → a → c`
fix-point³	Y	`fix`			`(a → a) → a`